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TÔHOKU MATHEMATICAL JOURNAL
— SECOND SERIES —
GENERAL INDEX
VOL. 1 (1949/50) – VOL. 51 (1999)
PUBLISHED BY THE
MATHEMATICAL INSTITUTE OF TÔHOKU UNIVERSITY
GENERAL INDEX
ABE, Ei-ichi: Dualité de Tannaka des groupes algébriques................. . . . . 12 (1960), 327–332
ABE, Eiichi and KANNO, Tsuneo: Some remarks on algebraic groups... . . . . 11 (1959), 376–384
ABE, Eiichi: Groupes simples de Chevalley.................................. . . . . 13 (1961), 253–267
ABE, Eiichi: Geometry in certain simple groups............................. . . . . 14 (1962), 64– 72
ABE, Eiichi: On simple groups associated with the real simple Lie alge-bras.............................................................................. . . . . 14 (1962), 244–262
ABE, Eiichi: Finite groups admitting Bruhat decompositions of type(An) . . . . 16 (1964), 130–141
ABE, Eiichi: Generation of some discrete subgroups of simple algebraicgroups........................................................................... . . . . 17 (1965), 178–184
ABE, Eiichi: Chevalley groups over local rings.............................. . . . . 21 (1969), 474–494
ABE, Eiichi and SUZUKI , Kazuo: On normal subgroups of Chevalleygroups over commutative rings.............................................. . . . . 28 (1976), 185–198
ABE, Kinetsu: A characterization of totally geodesic submanifolds inSN
andCPN by an inequality................................................... . . . . 23 (1971), 219–244
ABE, Kinetsu: Application of a Riccati type differential equation to Rie-mannian manifolds with totally geodesic distributions.................. . . . . 25 (1973), 425–444
ABE, Kinetsu: Some examples of non-regular almost contact structureson exotic spheres............................................................... . . . . 28 (1976), 429–435
ABE, Kinetsu: On a generalization of the Hopf fibration, I................. . . . . 29 (1977), 335–374
ABE, Kinetsu: On a generalization of the Hopf fibration, II................ . . . . 30 (1978), 177–210
ABRAMOVICH, Dan, MATSUKI, Kenji and RASHID, Suliman: A note onthe factorization theorem of toric birational maps after Morelli and itstoroidal extension.............................................................. . . . . 51 (1999), 489–537
A’C AMPO-NEUEN, Annette and HAUSEN, Jürgen: Quotients of toric va-rieties by the action of a subtorus........................................... . . . . 51 (1999), 1– 12
ADATI , Tyûzi: On subprojective spaces, II.................................... . . . . . 3 (1951), 330–342
ADATI , Tyûzi: On subprojective spaces, III................................... . . . . . 3 (1951), 343–358
ADATI , Tyuzi: On subprojective spaces, I..................................... . . . . . 3 (1951), 159–173
AGAOKA, Yoshio and KANEDA, Eiji: On local isometric immersions ofRiemannian symmetric spaces............................................... . . . . 36 (1984), 107–140
AGARWAL, Ravi P.: Sharp Opial-type inequalities involvingr-derivativesand their applications......................................................... . . . . 47 (1995), 567–593
AGARWAL, Ravi P. and O’REGAN, Donal: Boundary value problems ofnonsingular type on the semi-infinite interval............................. . . . . 51 (1999), 391–397
AGNEW, Ralph Palmer: Riemann methods for evaluation of series....... . . . . 11 (1959), 385–405
2 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
AGUZZOLI, Stefano and MUNDICI, Daniele: An algorithmic desingular-ization of 3-dimensional toric varieties..................................... . . . . 46 (1994), 557–572
AHMAD, Z. U.: see PATI , Tribikram and AHMAD, Z. U., 12 (1960), 222–232
AIHARA, Yoshihiro: The uniqueness problem of meromorphic mappingswith deficiencies............................................................... . . . . 51 (1999), 315–328
AKAZA , Tohru: Ahlfors’s conjecture on the singular set of some Kleiniangroup............................................................................ . . . . 22 (1970), 1– 13
AKAZA , Tohru: Local property of the singular sets of some Kleiniangroups........................................................................... . . . . 25 (1973), 1– 22
AKAZA , Tohru and SHIMAZAKI , Toshio: The Hausdorff dimension ofthe singular sets of combination groups.................................... . . . . 25 (1973), 61– 68
AKAZA , Tohru and FURUSAWA, Harushi: The exponent of convergenceof Poincaré series on some Kleinian groups............................... . . . . 32 (1980), 447–452
AKAZA , Yohru and INOUE, Katsumi: Limit sets of geometrically finitefree Kleinian groups........................................................... . . . . 36 (1984), 1– 16
AKO, Mitsue:see YANO, Kentaro and AKO, Mitsue, 13 (1961), 24–45
AKO, Mitsue:see YANO, Kentaro and AKO, Mitsue, 19 (1967), 187–197AKUTAGAWA , Kazuo and NISHIKAWA , Seiki: The Gauss map and space-
like surfaces with prescribed mean curvature in Minkowski 3-space. . . . . . 42 (1990), 67– 82
ALEXEEV, Valery and NAKAMURA , Iku: On Mumford’s construction ofdegenerating abelian varieties............................................... . . . . 51 (1999), 399–420
ALEXOPOULOS, Georgios: Oscillating multipliers on Lie groups andRiemannian manifolds........................................................ . . . . 46 (1994), 457–468
ALÍAS, Luis J., ROMERO, Alfonso and SÁNCHEZ, Miguel: Spacelikehypersurfaces of constant mean curvature and Calabi-Bernstein typeproblems........................................................................ . . . . 49 (1997), 337–345
ALÍAS, Luis J., LÓPEZ, Rafael and PASTOR, José A.: Compact spacelikesurfaces with constant mean curvature in the Lorentz-Minkowski 3-space............................................................................. . . . . 50 (1998), 491–501
ALMEIDA , Rui and MOLINO, Pierre: Flots riemanniens sur les 4-variétéscompactes....................................................................... . . . . 38 (1986), 313–326
ALTMANN , Klaus: Minkowski sums and homogeneous deformations oftoric varieties................................................................... . . . . 47 (1995), 151–184
AMAYO, R. K.: Lie algebras in which every finitely generated subalgebrais a subideal..................................................................... . . . . 26 (1974), 1– 9
AMOU, Masaaki: On algebraic independence of special values of gapseries............................................................................. . . . . 37 (1985), 385–393
ANASTASIO, S.: Non-normal Abelian subalgebras.......................... . . . . 20 (1968), 26– 37
ANDERSON, G. D. and VAMANAMURTHY , M. K.: Rotation of plane qua-siconformal mappings......................................................... . . . . 23 (1971), 605–620
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 3
ANDERSON, Gerald A.: Resolutions of generalized polyhedral manifolds. . . . 31 (1979), 495–517
ANDERSON, Glen D. and VAMANAMURTHY , Mavina K.: Estimates forthe asymptotic order of Grötzsch ring constant........................... . . . . 34 (1982), 133–139
ANDERSON, Glen D. and VAMANAMURTHY , Mavina K.: Asymptoticestimates for moduli of extremal rings..................................... . . . . 37 (1985), 533–540
ANDERSON, Glen D. and VAMANAMURTHY , Mavina K.: The transfinitemoduli of condensers in space............................................... . . . . 40 (1988), 1– 25
ANDO, Hideo, KAMAGATA , Toshio and FUKUHARA, Kenzo: On modCexcision theorems.............................................................. . . . . 25 (1973), 541–551
ANDO, Hideo: A note on Eilenberg-MacLane invariant.................... . . . . . 9 (1957), 96–104
ANDO, Hideo: Excision theorems on the pair of maps...................... . . . . 20 (1968), 296–312
ANDO, Hideo: On the generalized Whitehead product and the generalizedHoph invariant of a composition element.................................. . . . . 20 (1968), 516–553
ANDO, Tsuyoshi and NISHIO, Katsuyoshi: Positive selfadjoint exten-sions of positive symmetric operators...................................... . . . . 22 (1970), 65– 75
ANDRÉ, Michel: Cohomologie des algèbres différentielles où opère unealgèbre de Lie.................................................................. . . . . 14 (1962), 263–311
ANDRUSKIEWITSCH, Nicolás: The representation theory of inner almostcompact forms of Kac-Moody algebras.................................... . . . . 43 (1991), 425–445
AOKI, Kiyoshi: On maps of a(2n − 1)-dimensional sphere into ann-dimensional sphere............................................................ . . . . . 4 (1952), 178–186
AOKI, Kiyoshi: On some invariants of mappings............................ . . . . . 5 (1954), 220–237
AOKI, Kiyoshi: On cohomotopy groups of s. s. triad........................ . . . . 12 (1960), 263–280
AOMOTO, Kazuhiko: Finiteness of a cohomology associated with certainJackson integrals............................................................... . . . . 43 (1991), 75–101
APÉRY, François: An algebraic halfway model for the eversion of thesphere (with an Appendix by Bernard Morin)............................. . . . . 44 (1992), 103–150
ARAI, Hitoshi: Bounded projections onto holomorphic Hardy spaces onplanar domains................................................................. . . . . 39 (1987), 533–542
ARAI, Hitoshi: Boundary behavior of functions on complete manifoldsof negative curvature.......................................................... . . . . 41 (1989), 307–319
ARAI, Hitoshi: Area integrals for Riesz measures on the Siegel upper halfspace of type II................................................................. . . . . 44 (1992), 613–622
ARAI, Hitoshi: Degenerate elliptic operators, Hardy spaces and diffu-sions on strongly pseudoconvex domains.................................. . . . . 46 (1994), 469–498
ARAKAWA , Tatsuya: Bounds for the order of automorphism groups ofhyperelliptic fibrations........................................................ . . . . 50 (1998), 317–323
ARAKAWA , Tsuneo: Dirichlet series corresponding to Siegel’s modularforms of degreen with levelN .............................................. . . . . 42 (1990), 261–286
4 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
ARENS, Richard: Cauchy integral for functions of several variables...... . . . . . 8 (1956), 268–272
ARMITAGE, David H. and GOLDSTEIN, Myron: Some remarks on mean-values of subharmonic functions............................................ . . . . 38 (1986), 231–243
ARSENE, Grigore and CEAUSESCU, Zoia: On intertwining dilations IV. . . . . 30 (1978), 423–438
ASHIKAGA, Tadashi: The deformation behaviour of the Kodaira dimen-sion of algebraic manifolds (with an appendix by K. Ueno)............ . . . . 33 (1981), 193–214
ASHIKAGA, Tadashi and KONNO, Kazuhiro: Algebraic surfaces of gen-eral type withc2
1 = 3pg − 7 ................................................. . . . . 42 (1990), 517–536
ASHIKAGA, Tadashi: Normal two-dimensional hypersurface triple pointsand the Horikawa type resolution........................................... . . . . 44 (1992), 177–200
ASHKENAZI, Max and CHOW, Shui-Nee: Existence of periodic solutionsat resonance for functional differential equations......................... . . . . 32 (1980), 235–254
ASKEY, Richard: Positive Jacobi polynomial sums......................... . . . . 24 (1972), 109–119
AUSLANDER, Joseph and YORKE, James A.: Interval maps, factors ofmaps, and chaos................................................................ . . . . 32 (1980), 177–188
AZUKAWA , Kazuo: Hyperbolicity of circular domains..................... . . . . 35 (1983), 403–413
AZUKAWA , Kazuo: Square-integrable holomorphic functions on a circu-lar domain inCn ............................................................... . . . . 37 (1985), 15– 26
AZUKAWA , Kazuo: Curvature operator of the Bergman metric on a ho-mogeneous bounded domain................................................. . . . . 37 (1985), 197–223
AZUKAWA , Kazuo: Negativity of the curvature operator of a boundeddomain.......................................................................... . . . . 39 (1987), 281–285
AZUKAWA , Kazuo: Criteria for quasi-symmetricity and the holomorphicsectional curvature of a homogeneous bounded domain................. . . . . 41 (1989), 489–506
AZUKAWA , Kazuo and MORIMOTO, Shigeru: Second Ricci curvature ofhomogeneous bounded domains............................................ . . . . 44 (1992), 69– 81
AZUMA, Kazuoki: Weighted sums of certain dependent random vari-ables............................................................................. . . . . 19 (1967), 357–367
BAGEMIHL, Frederick: Maximal sets of ambiguous points................ . . . . 24 (1972), 469–472
BAI , Yuan-huai, WANG, Jian-pan and WEN, Ke-xin: Translation and can-cellation of socle series patterns............................................. . . . . 40 (1988), 633–643
BAIK , Yong-Bai: see TANNO, Shûkichi and BAIK , Yong-Bai, 22 (1970),184–190
BALACHANDRAN , V. K.: Automorphisms ofL∗-algebras................. . . . . 22 (1970), 163–173
BANDO, Shigetoshi and URAKAWA , Hajime: Generic properties of theeigenvalue of the Laplacian for compact Riemannian manifolds....... . . . . 35 (1983), 155–172
BANDO, Shigetoshi: The K-energy map, almost Einstein Kähler metricsand an inequality of the Miyaoka-Yau type................................ . . . . 39 (1987), 231–235
BANDO, Shigetoshi: Bubbling out of Einstein manifolds................... . . . . 42 (1990), 205–216
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 5
BANDO, Shigetoshi: Correction and Addition: Bubbling out of Einsteinmanifolds....................................................................... . . . . 42 (1990), 587–588
BANDO, Shigetoshi: Removable singularities for holomorphic vectorbundles.......................................................................... . . . . 43 (1991), 61– 67
BARROS, Manuel, GARAY, Oscar J. and SINGER, David A.: Elasticaewith constant slant in the complex projective plane and new examplesof Willmore tori in five spheres.............................................. . . . . 51 (1999), 177–192
BARROS, Manuel and URBANO, Francisco: Spectral geometry of mini-mal surfaces in the sphere.................................................... . . . . 39 (1987), 575–588
BARTHEL, Gottfried, BRASSELET, Jean-Paul, FIESELER, Karl-Heinzand KAUP, Ludger: Diviseurs invariants et homomorphisme dePoincaré de variétés toriques complexes................................... . . . . 48 (1996), 363–390
BATYREV, Victor V.: On the classification of smooth projective toric va-rieties............................................................................ . . . . 43 (1991), 569–585
BAVINCK , Herman: On positive convolution operators for Jacobi series. . . . . 24 (1972), 55– 69
BEARDON, Alan F. and STEPHENSON, Kenneth: Circle packings in dif-ferent geometries.............................................................. . . . . 43 (1991), 27– 36
BEDFORD, Eric and FEDERBUSH, Paul: Pluriharmonic boundary values. . . . 26 (1974), 505–511
BEHNCKE, Horst: Automorphisms of crossed products.................... . . . . 21 (1969), 580–600
BEHNCKE, Horst: Perojections in Hilbert space............................. . . . . 22 (1970), 181–183
BEHNCKE, Horst: Generators ofW ∗-algebras................................ . . . . 22 (1970), 541–546
BEHNCKE, Horst: Projections in Hilbert space II............................ . . . . 23 (1971), 349–352
BEHNCKE, Horst: Generators ofW ∗-algebras II............................. . . . . 24 (1972), 371–381
BEHNCKE, Horst: Generators ofW ∗-algebras III............................ . . . . 24 (1972), 383–388
BEHNCKE, Horst: Generators of finiteW ∗-algebras......................... . . . . 24 (1972), 401–408
BELL, R. A. and SHAH, S. M.: Approximation by oscillating generalizedpolynomials..................................................................... . . . . 27 (1975), 197–206
BERBERIAN, S. K.: A note on the algebra of measurable operators of anAW ∗-algebra................................................................... . . . . 22 (1970), 613–618
BERBERIAN, S. K.: Normal derivations in operator algebras.............. . . . . 30 (1978), 613–621
BERENS, Hubert and GÖRLICH, Ernst: Über einen Darstellungssatz fürFunktionen in der Fourieranalysis........................................... . . . . 18 (1966), 429–453
BERENS, Hubert: On pointwise approximation of Fourier series by typi-cal means....................................................................... . . . . 23 (1971), 147–153
BERNFELD, Stephen R. and LAKSHMIKANTHAM , V.: Practical stabilityand Liapunov functions....................................................... . . . . 32 (1980), 607–613
BHATT, Shri Nivas: An aspect of local property of|R, logn,1| summa-bility of Fourier series......................................................... . . . . 11 (1959), 13– 19
6 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
BIEGERT, Wolfgang: Tauber-Konstanten bei den Hausdorff-Verfahren. . . . . . 20 (1968), 431–442
BILLIG , Yuly and PIANZOLA , Arturo: Root strings with two consecutivereal roots........................................................................ . . . . 47 (1995), 391–403
BINDSCHADLER, David, BRENTON, Lawrence and DRUCKER, Daniel:Rational mappings of Del Pezzo surfaces, and singular compactifica-tions of two-dimensional affine varieties................................... . . . . 36 (1984), 591–609
BISHOP, R. L. and GOLDBERG, S. I.: On the topology of positivelycurved Kaehler manifolds II................................................. . . . . 17 (1965), 310–318
BISHOP, Richard L. and GOLDBERG, Samuel I.: On the topology of pos-itively curved Kaehler manifolds............................................ . . . . 15 (1963), 359–364
BISWAS, Indranil: A correspondence between the moduli spaces of vectorbundles over a curve........................................................... . . . . 51 (1999), 163–176
BLAIR , D. E. and LUDDEN, G. D.: Hypersurfaces in almost contact man-ifolds ............................................................................. . . . . 21 (1969), 354–362
BLAIR , David and VANHECKE, Lieven: Symmetries andvarphi-symmetric spaces.............................................................. . . . . 39 (1987), 373–383
BLAIR , David E.: On the non-existence of flat contact metric structures. . . . . 28 (1976), 373–379
BLAIR , David E.: Two remarks on contact metric structures............... . . . . 29 (1977), 319–324
BLUMENTHAL , Robert A. and HEBDA, James J.: An analogue of theholonomy bundle for a foliated manifold.................................. . . . . 40 (1988), 189–197
BLYTH, William F.: see SLOSS, Bruce G. and BLYTH, William F., 45(1993), 555–563
BOAS, R. P., Jr.: Integrability of non-negative trigonometric series. II. . . . . . . 16 (1964), 368–373
BOAS, R. P., Jr.: Summation formulas and band-limited signals........... . . . . 24 (1972), 121–125
BOAS, Ralph Philip, Jr.: Integrability of nonnegative trigonometric series. . . . 14 (1962), 363–368
BOFFI, Giandomenico and VARAGNOLO, Michela: A Littlewood-Richardson filtration at roots of 1 for quantum deformations of skewSchur modules................................................................. . . . . 48 (1996), 303–316
BOKAN, Neda, NOMIZU, Katsumi and SIMON, Udo: Affine hypersur-faces with parallel cubic forms.............................................. . . . . 42 (1990), 101–108
BORDEMANN, Martin, MEDINA, Alberto and OUADFEL, Ali: Le groupeaffine comme variete symplectique......................................... . . . . 45 (1993), 423–436
BOREL, A. and SPRINGER, T. A.: Rationality properties of linear alge-braic groups II.................................................................. . . . . 20 (1968), 443–497
BOREL, Armand: Sous-groupes commutatifs et torsion des groupes deLie compacts connexes....................................................... . . . . 13 (1961), 216–240
BORWEIN, D.: On a generalized Cesàro summability method of integralorder............................................................................. . . . . 18 (1966), 71– 73
BORWEIN, David and SHAWYER, Bruce Lockhart Robertson: On Borel-type methods................................................................... . . . . 18 (1966), 283–298
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 7
BORWEIN, David and SHAWYER, Bruce L. R.: On Borel-type methodsII ................................................................................. . . . . 19 (1967), 232–237
BORWEIN, David and SHAWYER, Bruce L. R.: Correction: On Borel-type methods................................................................... . . . . 19 (1967), 244
BOULDIN, Richard: The product of operators with closed range.......... . . . . 25 (1973), 359–363
BOUVIER, Catherine and GONZALEZ-SPRINBERG, Gérard: Systèmegénérateur minimal, diviseurs essentiels etG-désingularisations devariétés toriques................................................................ . . . . 47 (1995), 125–149
BRADLOW, Steven B., GLAZEBROOK, James F. and KAMBER, FranzW.: Reduction of the Hermitian-Einstein equation on Kählerian fiberbundles.......................................................................... . . . . 51 (1999), 81–123
BRADY, Thomas: Free resolutions for semi-direct products............... . . . . 45 (1993), 535–537
BRANDOLINI , Luca and TRAVAGLINI , Giancarlo: Pointwise conver-gence of Fejer type means.................................................... . . . . 49 (1997), 323–336
BRASSELET, Jean-Paul:see BARTHEL, Gottfried, BRASSELET, Jean-Paul, FIESELER, Karl-Heinz and KAUP, Ludger, 48 (1996), 363–390
BRATTELI, Ola, ELLIOTT, George A., EVANS, David E. and KISHI-MOTO, Akitaka: Quasi-product actions of a compact abelian groupon aC∗-algebra................................................................ . . . . 41 (1989), 133–161
BRENTON, Lawrence: see BINDSCHADLER, David, BRENTON,Lawrence and DRUCKER, Daniel, 36 (1984), 591–609
BRENTON, Lawrence and DRUCKER, Daniel: Perfect graphs and com-plex surface singularities with perfect local fundamental group........ . . . . 41 (1989), 507–525
BRION, Michel: The structure of the polytope algebra...................... . . . . 49 (1997), 1– 32
BRITO, Fabiano: A remark on minimal foliations of codimension two... . . . . 36 (1984), 341–350
BROWDER, W. and LIVESAY, G. R.: Fixed point free involutions on ho-motopy spheres................................................................ . . . . 25 (1973), 69– 88
BROWN, Gavin, DOOLEY, Anthony H. and LAKE, Jane: On the Krieger-Araki-Woods ratio set......................................................... . . . . 47 (1995), 1– 13
BROWNE, Henrique: Codimension one totally geodesic foliations ofHn .. . . 36 (1984), 315–340
BUCH, Anders, THOMSEN, Jesper F., LAURITZEN, Niels and MEHTA,Vikram: The Frobenius morphism on a toric variety..................... . . . . 49 (1997), 355–366
BULLEN, P. S.: A constructive definition of an integral..................... . . . . 22 (1970), 597–603
BURTON, Theodore and HATVANI , László: Stability theorems for nonau-tonomous functional differential equations by Liapunov functionals. . . . . . 41 (1989), 65–104
BURTON, Theodore A.: Liapunov functionals and periodicity in integralequations........................................................................ . . . . 46 (1994), 207–220
BURTON, Theodore Allen and MAHFOUD, Wadi Elias: Stability by de-compositions for Volterra equations........................................ . . . . 37 (1985), 489–511
8 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
BURTON, Theodore Allen and ZHANG, Bo: Uniform ultimate bounded-ness and periodicity in functional differential equations................. . . . . 42 (1990), 93–100
BUSEMANN, Herbert: Similarities and differentiability..................... . . . . . 9 (1957), 56– 67
BUTZER, P. L., NESSEL, R. J. and TREBELS, W.: On summation pro-cesses of Fourier expansions in Banach spaces. I: Comparison theo-rems.............................................................................. . . . . 24 (1972), 127–140
BUTZER, P. L., NESSEL, R. J. and TREBELS, W.: On summation pro-cesses of Fourier expansions in Banach spaces. II: Saturation theo-rems.............................................................................. . . . . 24 (1972), 551–569
BUTZER, P. L., NESSEL, R. J. and TREBELS, W.: On summation pro-cesses of Fourier expansions in Banaeh spaces. III: Jackson- andZamansky-type inequalities for Abel-bounded expansions.............. . . . . 27 (1975), 213–223
BUTZER, P. L. and GÖRLICH, E.: Zur Charakterisierung von Satura-tionsklassen in der Theorie der Fourierreihen............................. . . . . 17 (1965), 29– 54
CÁC, Nguyen Phuong: Spaces of mappings as sequence spaces........... . . . . 22 (1970), 379–393
CAIRNS, Grant: A general description of totally geodesic foliations. . . . . . . . . 38 (1986), 37– 55
CALVERT, Bruce: Perturbation of nonlinear hypercontractive semi-groups........................................................................... . . . . 29 (1977), 463–471
CANTWELL, John: Topological non-degenerate functions................. . . . . 20 (1968), 120–125
CANTWELL, John and CONLON, Lawrence: Smoothing fractionalgrowth........................................................................... . . . . 33 (1981), 249–262
CANTWELL, John and CONLON, Lawrence: Foliations and subshifts.... . . . . 40 (1988), 165–187
CARBERY, Anthony, HERNÁNDEZ, Eugenio and SORIA, Fernando: Thebehaviour on radial functions of maximal operators along arbitrary di-rections and the Kakeya maximal operator................................ . . . . 41 (1989), 647–656
CARBERY, Anthony, HERNÁNDEZ, Eugenio and SORIA, Fernando: Er-ratum: The behavior on radial functions of maximal operators alongarbitrary directions and the Kakeya maximal operator................... . . . . 42 (1990), 287
CARLITZ , L.: Hankel determinants and Bernoulli numbers................ . . . . . 5 (1954), 272–276
CARLITZ , L.: Some partition formulas........................................ . . . . . 6 (1954), 149–154
CARMO, Manfredo P. do and DAJCZER, Marcos: Helicoidal surfaces withconstant mean curvature...................................................... . . . . 34 (1982), 425–435
CARVALHO, Luis Antonio Viera, INFANTE, Ettore Ferrari and WALKER,John Andrew: On the existence of simple Liapunov functions for linearretarded difference differential equations.................................. . . . . 32 (1980), 283–297
CASTRO, Ildefonso and URBANO, Francisco: Lagrangian surfaces in thecomplex Euclidean plane with conformal Maslov form................. . . . . 45 (1993), 565–582
CAZZANIGA , Franco and MEANEY, Christopher: A local property ofabsolutely convergent Jacobi polynomial series.......................... . . . . 34 (1982), 389–406
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 9
CEAUSESCU, Zoia: see ARSENE, Grigore and CEAUSESCU, Zoia, 30(1978), 423–438
CECIL, Thomas E.: A characterization of metric spheres in hyperbolicspace by Morse theory........................................................ . . . . 26 (1974), 341–351
CHABROWSKI, Jan: On positive solutions for a class of elliptic boundaryvalue problems................................................................. . . . . 38 (1986), 343–350
CHAHAL , Jasbir Singh: The Mordell-Weil rank of elliptic curves......... . . . . 39 (1987), 101–103
CHALK , J. H. H.: Generators of Fuchsian groups............................ . . . . 26 (1974), 203–218
CHANG, Tsu-Kung: see LAI , Hang-Chin and CHANG, Tsu-Kung, 41(1989), 31–41
CHAVEL, Isaac: On non-Riemannian sectional curvature in Riemannianhomogeneous spaces.......................................................... . . . . 23 (1971), 169–172
CHEN, Bang-yen and YANO, Kentaro: Special conformally flat spacesand canal hypersurfaces...................................................... . . . . 25 (1973), 177–184
CHEN, Bang-Yen, DILLEN, Franki, VERSTRAELEN, Leopold andVRANCKEN, Luc: Characterizing a class of totally real submanifoldsof S6 by their sectional curvatures.......................................... . . . . 47 (1995), 185–198
CHEN, Bang-yen: Complex extensors and Lagrangian submanifolds incomplex Euclidean spaces.................................................... . . . . 49 (1997), 277–297
CHEN, Bang-Yen: Representation of flat LagrangianH -umbilical sub-manifolds in complex Euclidean spaces.................................... . . . . 51 (1999), 13– 20
CHEN, Chang-Pao and CHEN, Yu-Ying: On the integrals of Riemann-Lebesgue type.................................................................. . . . . 49 (1997), 347–353
CHEN, Jingyi and LI, Song-Ying: Holomorphic extensions of maps fromthe boundary of Kähler manifolds.......................................... . . . . 49 (1997), 585–597
CHEN, Lu-San: On the behavior of solutions for large|x| of parabolicequations with unbounded coefficients..................................... . . . . 20 (1968), 589–595
CHEN, Lu-San: Remark on behavior of solutions of some parabolic equa-tions.............................................................................. . . . . 22 (1970), 511–516
CHEN, Yu: Automorphisms of simple Chevalley groups overQ-algebras. . . . 47 (1995), 81– 97
CHEN, Yu-Ying: see CHEN, Chang-Pao and CHEN, Yu-Ying, 49 (1997),347–353
CHEN, Zhi-Jie: Bounds of automorphism groups of genus 2 fibrations. . . . . . 46 (1994), 499–521
CHEN, Zhi-Jie: Best bounds of automorphism groups of hyperelliptic fi-brations.......................................................................... . . . . 50 (1998), 469–489
CHEVALET, Claude, GILLOIS, Michel and MICALI , Artibano: On a dy-namical system relevant in genetics......................................... . . . . 31 (1979), 127–138
CHEVALLEY , C.: Sur certains groupes simples.............................. . . . . . 7 (1955), 14– 66
CHI, Quo-Shin: Rigidity of superminimal immersions of compact Rie-mann surfaces intoCP 2 ...................................................... . . . . 42 (1990), 439–455
10 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
CHI, Quo-Shin and MO, Xiaokang: Rigidity of superminimal surfaces incomplex projective spaces.................................................... . . . . 44 (1992), 83–101
CHO, Sanghyun: A mapping property of the Bergman projection on cer-tain pseudoconvex domains.................................................. . . . . 48 (1996), 533–542
CHODA, Hisashi: A Galois correspondence in a von Neumann algebra. . . . . . 30 (1978), 491–504
CHODA, Marie: The fixed algebra of a von Neumann algebra under anautomorphism group.......................................................... . . . . 28 (1976), 227–234
CHOI, Hyeong In, KIM, Seok Woo and LEE, Yong Hah: Rough isometryand the asymptotic Dirichlet problem...................................... . . . . 50 (1998), 333–348
CHOI, Hyeong In, LEE, Doo Seok and YOON, Joung-Hahn: Cut locus ofa separating fractal set in a Riemannian manifold........................ . . . . 50 (1998), 455–467
CHOW, Shui-Nee: see ASHKENAZI, Max and CHOW, Shui-Nee, 32(1980), 235–254
CHOW, Yuah Shih: On the Cesàro summability of double Fourier series. . . . . 5 (1954), 277–283
CHRISTIAN, Ulrich: Über die analytische Fortsetzung gewisserPoincaré’scher Reihen zu elliptischen Modulgruppen................... . . . . 40 (1988), 549–590
CHRISTIAN, Ulrich: Über “Primzahlsätze” für hyperbolische Klassenund die Konvergenzabszisse der logarithmischen Ableitung einer Sel-berg’schen Zetafunktion für elliptische Modulgruppen.................. . . . . 43 (1991), 301–326
CHU, Wenchang:see HSU, Leetsch C. and CHU, Wenchang, 43 (1991),235–242
CHUNG, Lung Ock and SARIO, Leo: Harmonic and quasiharmonic de-generacy of Riemannian manifolds......................................... . . . . 27 (1975), 487–496
CHUNG, Lung Ock, SARIO, Leo and WANG, Cecilia: QuasiharmonicLp
functions and biharmonic degeneracy...................................... . . . . 32 (1980), 439–445
CIORANESCU, Ioana and ZSIDÓ, László: Analytic generators for one-parameter groups.............................................................. . . . . 28 (1976), 327–362
CLARK, R. S. and GOEL, D. S.: Almost tangent manifolds of secondorder............................................................................. . . . . 24 (1972), 79– 92
CLINE, Edward, PARSHALL, Brian and SCOTT, Leonard: AbstractKazhdan-Lusztig theories.................................................... . . . . 45 (1993), 511–534
COIFMAN, Ronald R. and MURAI, Takafumi: Commutators on thepotential-theoretic energy spaces............................................ . . . . 40 (1988), 397–407
CONLON, Lawrence:see CANTWELL, John and CONLON, Lawrence, 33(1981), 249–262
CONLON, Lawrence:see CANTWELL, John and CONLON, Lawrence, 40(1988), 165–187
CONNES, Alain and TAKESAKI , Masamichi: The flow of weights on fac-tors of type III.................................................................. . . . . 29 (1977), 473–575
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 11
CONNES, Alain and TAKESAKI , Masamichi: Errata: The flow of weightson factors of type III.......................................................... . . . . 30 (1978), 653–655
CONSTANTINESCU, Corneliu and CORNEA, Aurel: Nuclearity on har-monic spaces................................................................... . . . . 21 (1969), 558–572
CONTI, Roberto: On a class of asymptotically stable linear differentialequations........................................................................ . . . . 32 (1980), 279–282
CORDUNEANU, Constantin: Bounded and almost periodic solutions ofcertain nonlinear elliptic equations.......................................... . . . . 32 (1980), 265–278
CORNEA, Aurel: see CONSTANTINESCU, Corneliu and CORNEA, Aurel,21 (1969), 558–572
COSSART, Vincent: Desingularization of embedded excellent surfaces. . . . . . 33 (1981), 25– 33
COULTON, Patrick: Submanifolds of the Grassmann manifold with van-ishing Chern forms............................................................ . . . . 37 (1985), 271–285
COWLING, V. F.: On the Euler summability of a class of Dirichlet series. . . . . 7 (1955), 240–242
COX, David A.: The functor of a smooth toric variety...................... . . . . 47 (1995), 251–262
CSÖRGÓ, M. and FISCHLER, R.: On mixing and the central limit theo-rem............................................................................... . . . . 23 (1971), 139–145
CURRÁS-BOSCH, Carlos: The geometry of totally geodesic foliationsadmitting Killing field ........................................................ . . . . 40 (1988), 535–548
DAJCZER, Marcos:see CARMO, Manfredo P. do and DAJCZER, Marcos,34 (1982), 425–435
DAJCZER, Marcos and TOJEIRO, Ruy: Submanifolds of constant sec-tional curvature with parallel or constant mean curvature............... . . . . 45 (1993), 43– 49
DAJCZER, Marcos and TOJEIRO, Ruy: Flat totally real submanifolds ofCPn and the symmetric generalized wave equation..................... . . . . 47 (1995), 117–123
DANCER, E. Norman and GUO, Zongming: Some remarks on the stabilityof sign changing solutions.................................................... . . . . 47 (1995), 199–225
DECHEVSKY, Ljubomir T. and PERSSON, Lars-Erik: On sharpness, ap-plications and generalizations of some Carleman type inequalities.. .. . . . . 48 (1996), 1– 22
DESZCZ, Ryszard, DILLEN, Franki, VERSTRAELEN, Leopold andVRANCKEN, Luc: Quasi-Einstein totally real submanifolds of thenearly Kaehler 6-sphere...................................................... . . . . 51 (1999), 461–478
DEVORE, Ronald A.: On a saturation theorem of Tureckii................. . . . . 23 (1971), 353–362
DEVORE, Ronald A.: On the direct theorem of saturation.................. . . . . 23 (1971), 363–370
DIBAG, Ibrahim: Degree theory for spherical fibrations.................... . . . . 34 (1982), 161–177
DILLEN, Franki: see CHEN, Bang-Yen, DILLEN, Franki, VERSTRAE-LEN, Leopold and VRANCKEN, Luc, 47 (1995), 185–198
DILLEN, Franki: see DESZCZ, Ryszard, DILLEN, Franki, VERSTRAE-LEN, Leopold and VRANCKEN, Luc, 51 (1999), 461–478
12 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
DING, Yong and LU, Shanzhen: WeightedLp-boundedness for higherorder commutators of oscillatory singular integrals...................... . . . . 48 (1996), 437–449
DITZIAN , Z. and JAKIMOVSKI , A.: A remark on a class of convolutiontransforms....................................................................... . . . . 20 (1968), 170–174
DITZIAN , Z. and JAKIMOVSKI , A.: Properties of kernels for a class ofconvolution-transforms....................................................... . . . . 20 (1968), 175–198
DITZIAN , Z. and JAKIMOVSKI , A.: Convergence and inversion results fora class of convolution transforms............................................ . . . . 21 (1969), 195–220
DITZIAN , Z. and MAY, C. P.: A saturation result for combinations ofBernstein polynomials........................................................ . . . . 28 (1976), 363–372
DJOKOVIC, Dragomir Ž.: Three notes on real analytic groups............. . . . . 28 (1976), 381–387
DOOLEY, Anthony H.: see BROWN, Gavin, DOOLEY, Anthony H. andLAKE, Jane, 47 (1995), 1–13
DORFMEISTER, Josef and NEHER, Erhard: An algebraic approach toisoparametric hypersurfaces in spheres I................................... . . . . 35 (1983), 187–224
DORFMEISTER, Josef and NEHER, Erhard: An algebraic approach toisoparametric hypersurfaces in spheres II.................................. . . . . 35 (1983), 225–247
DORFMEISTER, Josef and HAAK , Guido: On symmetries of constantmean curvature surfaces, Part I: General theory.......................... . . . . 50 (1998), 437–454
DRESELER, Bernd and SCHEMPP, Walter: Central approximation pro-cesses............................................................................ . . . . 27 (1975), 153–173
DRUCKER, Daniel: see BINDSCHADLER, David, BRENTON, Lawrenceand DRUCKER, Daniel, 36 (1984), 591–609
DRUCKER, Daniel: see BRENTON, Lawrence and DRUCKER, Daniel, 41(1989), 507–525
D’SOUZA, Harry and FANIA , Maria Lucia: Varieties whose surface sec-tions are elliptic................................................................ . . . . 42 (1990), 457–474
DU, Jie: Cells in certain sets of matrices...................................... . . . . 48 (1996), 417–427
DUBE, L. S. and PANDEY, J. N.: On the Hankel transform of distributions. . . . 27 (1975), 337–354
DUBE, L. S. and PANDEY, J. N.: An inversion of the Hankel potentialtransform of generalized functions.......................................... . . . . 29 (1977), 189–201
EARLE, Clifford J. and KRA, Irwin: Positive divisors and Poincaré serieson variable Riemann surfaces................................................ . . . . 39 (1987), 429–436
EDWARDS, Robert E.: An approximation problem proposed by K. ITÔ. . . . . 11 (1959), 406–408
ELLIOTT, George A.: On derivations ofAW ∗-algebras..................... . . . . 30 (1978), 263–276
ELLIOTT, George A.:see BRATTELI, Ola, ELLIOTT, George A., EVANS,David E. and KISHIMOTO, Akitaka, 41 (1989), 133–161
ELLIS, David: Notes on abstract distance geometry I. The algebraic de-scription of ground spaces.................................................... . . . . . 3 (1951), 270–272
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 13
ELOE, Paul and ISLAM, Muhammad: Stability properties and integrabil-ity of the resolvent of linear Volterra equations........................... . . . . 47 (1995), 263–269
EMARA, Salah A. A.: Estimates for operators in weightedLp,q-spaces. . . . . 44 (1992), 201–210
ENDOW, Yasushi: Analysis of dyadic stationary processes using the gen-eralized Walsh functions...................................................... . . . . 36 (1984), 485–503
ENDOW, Yasushi: The Walsh series of a dyadic stationary process....... . . . . 38 (1986), 501–512
ENOKI, Ichiro: Surfaces of Class VII0 with curves.......................... . . . . 33 (1981), 453–492
ERDELYI, Ivan: see WANG, Shengwang and ERDELYI, Ivan, 41 (1989),657–672
ERDELYI, Ivan: see WANG, Shengwang and ERDELYI, Ivan, 45 (1993),539–554
ERNEST, John: Notes on the duality theorem of non-commutative non-compact topological groups.................................................. . . . . 16 (1964), 291–296
ERNEST, John: Operators withα-closed range............................... . . . . 24 (1972), 45– 49
ERNEST, John: Left invertibility of closed operators modulo anα-compact operator.............................................................. . . . . 24 (1972), 529–537
EVANS, David E.: see BRATTELI, Ola, ELLIOTT, George A., EVANS,David E. and KISHIMOTO, Akitaka, 41 (1989), 133–161
FAN, Dashan, PAN, Yibiao and YANG, Dachun: A weighted norm in-equality for rough singular integrals........................................ . . . . 51 (1999), 141–161
FANIA , Maria Lucia:see D’SOUZA, Harry and FANIA , Maria Lucia, 42(1990), 457–474
FARAUT, J.: see SATAKE, I. and FARAUT, J., 36 (1984), 469–482
FEDERBUSH, Paul: see BEDFORD, Eric and FEDERBUSH, Paul, 26(1974), 505–511
FELLER, Edmund H.: Noetherian modules and Noetherian injective rings. . . . 17 (1965), 130–138
FERNÁNDEZ, Marisa: A family of compact solvableG2-calibrated man-ifolds ............................................................................. . . . . 39 (1987), 287–289
FIESELER, Karl-Heinz: see BARTHEL, Gottfried, BRASSELET, Jean-Paul, FIESELER, Karl-Heinz and KAUP, Ludger, 48 (1996), 363–390
FINE, N. J.: On a system of modular functions connected with the Ra-manujan identities............................................................. . . . . . 8 (1956), 149–164
FINK, A. M.: Almost automorphic and almost periodic solutions whichminimize functionals.......................................................... . . . . 20 (1968), 323–332
FINK, A. M.: Pointwise inequalities and continuation of solutions of annth order equation.............................................................. . . . . 32 (1980), 169–175
FISCHER, Hans R. and WILLIAMS , Floyd L.: Borel-Le Potier diagrams— Calculus of their cohomology bundles.................................. . . . . 36 (1984), 233–251
FISCHLER, R.: see CSÖRGÓ, M. and FISCHLER, R., 23 (1971), 139–145
14 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
FLAHERTY, F. J.: Spheres and cells in negatively curved spaces.......... . . . . 19 (1967), 406–410
FLASCHKA, Hermann: Towards an algebro-geometric interpretation ofthe Neumann system.......................................................... . . . . 36 (1984), 407–426
FLETT, T. M.: On a theorem of Lindelöf concerning prime ends.......... . . . . . 8 (1956), 273–274
FLETT, T. M.: Mean value theorems for vector-valued functions. . . . . . . . . . . . . 24 (1972), 141–151
FLETT, Thomas Muirhead: A note on a maximal function................. . . . . 12 (1960), 34– 46
FOURNIER, John J. F.: Local and global properties of functions and theirFourier transforms............................................................. . . . . 49 (1997), 115–131
FRINK, Aline H.: Special variations............................................ . . . . 12 (1960), 203–207
FUJII, Akio: A remark on the zeros of someL-functions................... . . . . 29 (1977), 417–426
FUJIKI, Akira: Kählerian normal complex surfaces......................... . . . . 35 (1983), 101–117
FUJIMORI, Masami: On the solutions of Thue equations................... . . . . 46 (1994), 523–539
FUJIMOTO, Hirotaka: Extensions of the big Picard’s theorem............. . . . . 24 (1972), 415–422
FUJIMOTO, Hirotaka: The defect relations for the derived curves of aholomorphic curve inPn(C) ................................................ . . . . 34 (1982), 141–160
FUJIMOTO, Hirotaka: A unicity theorem for meromorphic maps of acomplete Kähler manifold intoPN(C) ..................................... . . . . 38 (1986), 327–341
FUJIOKA, Atsushi: Harmonic maps and associated maps from simplyconnected Riemann surfaces into the 3-dimensional space forms...... . . . . 47 (1995), 431–439
FUJITA, Keiko: Hilbert spaces related to harmonic functions.............. . . . . 48 (1996), 149–163
FUJITA, Takao: On polarized varieties of small∆-genera.................. . . . . 34 (1982), 319–341
FUJITA, Takao: On hyperelliptic polarized varieties......................... . . . . 35 (1983), 1– 44
FUJITA, Yasuhiro: Nonlinear semigroup for the unnormalized conditionaldensity........................................................................... . . . . 37 (1985), 251–263
FUJITANI, Tamehiro: Complex-valued differential forms on normal con-tact Riemannian manifolds................................................... . . . . 18 (1966), 349–361
FUJIWARA, Koji: Growth and the spectrum of the Laplacian of an infinitegraph............................................................................. . . . . 48 (1996), 293–302
FUJIWARA, M.: Supplementary list of Mathematical Publications byProf. M. Fujiwara.............................................................. . . . . . 4 (1952), 316–317
FUKAMI , Tetsuzo and ISHIHARA, Shigeru: Almost Hermitian structureonS6 ............................................................................. . . . . . 7 (1955), 151–156
FUKAMI , Tetsuzo: Invariant tensors under the real representation of sym-plectic group and their applications......................................... . . . . 10 (1958), 81– 90
FUKAMI , Tetsuzo: Affine connections in almost product manifolds withsome structures................................................................. . . . . 11 (1959), 430–446
FUKAMIYA , M., MISONOU, Y. and TAKEDA, Z.: On order and commu-tativity of B∗-algebras........................................................ . . . . . 6 (1954), 89– 93
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 15
FUKAMIYA , Masanori: Topological method for Tauberian theorem. . . . . . . . . . . 1 (1949), 77– 87
FUKAMIYA , Masanori: Obituary Note Yoshitomo Okada.................. . . . . 10 (1958), 1– 2
FUKUHARA, Kenzo: see ANDO, Hideo, KAMAGATA , Toshio andFUKUHARA, Kenzo, 25 (1973), 541–551
FUKUMA , Seiji and MURAMATU, Tosinobu:Lp and Besov maximal es-timates for solutions to the Schrödinger equation........................ . . . . 51 (1999), 193–203
FULLER, K. R. and SHUTTERS, W. A.: Projectie modules over non-commutative semilocal rings................................................. . . . . 27 (1975), 303–311
FUNAKOSI, Shunsuke: On representations of non-type I groups.......... . . . . 31 (1979), 139–150
FUNAYAMA , Nenosuke: Imbedding partly ordered sets into infinitely dis-tributive complete lattices.................................................... . . . . . 8 (1956), 54– 62
FURUMOCHI, Tetsuo: On the converse theorem for integral stability infunctional differential equations............................................. . . . . 27 (1975), 461–477
FURUMOCHI, Tetsuo: Existence of periodic solutions of one-dimensionaldifferential-delay equations.................................................. . . . . 30 (1978), 13– 35
FURUMOCHI, Tetsuo: Existence of periodic solutions of periodic nonlin-ear functional differential equations........................................ . . . . 32 (1980), 531–538
FURUSAWA, Harushi: see AKAZA , Tohru and FURUSAWA, Harushi, 32(1980), 447–452
FURUSAWA, Harushi: The Hausdorff dimension of limit sets of someFuchsian group................................................................. . . . . 33 (1981), 409–412
FURUSAWA, Harushi: The limit set of deformations of some Fuchsiangroups........................................................................... . . . . 35 (1983), 573–581
FURUSAWA, Harushi: A remark on the hyperbolic collar lemma.......... . . . . 39 (1987), 291–298
FURUSAWA, Harushi: The exponent of convergence of Poincaré series ofcombination groups........................................................... . . . . 43 (1991), 1– 7
FURUSHIMA, Mikio: Finite groups of polynomial automorphisms inCn . . . . 35 (1983), 415–424
FURUSHIMA, Mikio and NAKAYAMA , Noboru: A new construction of acompactification ofC3 ........................................................ . . . . 41 (1989), 543–560
FURUYA, Hisako: On divisibility by 2 of the relative class numbers ofimaginary number fields...................................................... . . . . 23 (1971), 207–218
FURUYA, Kiyoko and KOMURA, Yukio: Linear evolution equations ofnon-parabolic type with variable domains................................. . . . . 37 (1985), 125–149
FUTAKI , Akito: The Ricci curvature of symplectic quotients of Fano man-ifolds ............................................................................. . . . . 39 (1987), 329–339
GAMST, J. and HOECHSMANN, K.: Products in sheaf-cohomology...... . . . . 22 (1970), 143–162
GAMST, J. and HOECHSMANN, K.: Ext-products and edge-morphisms. . . . . 23 (1971), 581–588
GAO, Wenjie: see WANG, Junyu, GAO, Wenjie and LIN, Zhenghua, 47(1995), 327–344
16 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
GAO, Wenjie:see WANG, Junyu and GAO, Wenjie, 51 (1999), 539–553
GARAY, Oscar J.:see BARROS, Manuel, GARAY, Oscar J. and SINGER,David A., 51 (1999), 177–192
GAUCHMAN, H. and GOLDBERG, S. I.: Spectral rigidity of compactKaehler and contact manifolds.............................................. . . . . 38 (1986), 563–573
GAUCHMAN, Hillel: Pinching theorems for totally real minimal subman-ifolds of CPn(c) ............................................................... . . . . 41 (1989), 249–257
GAUDRY, Garth, GIULINI , Saverio and MANTERO, Anna Maria: Asym-metry of maximal functions on the affine group of the line............. . . . . 42 (1990), 195–203
GAUDRY, Garth I.: Spectral Littlewood-Paley decompositions............ . . . . 32 (1980), 363–373
GAVEAU, Bernard, OKADA , Masami and OKADA , Tatsuya: Second orderdifferential operators and Dirichlet integrals with singular coefficients:I. Functional calculus of one-dimensional operators..................... . . . . 39 (1987), 465–504
GEETHA, P. K.: see UNNI, K. R. and GEETHA, P. K., 23 (1971), 155–168
GEIGES, Hansjörg: Normal contact structures on 3-manifolds............ . . . . 49 (1997), 415–422
GILLOIS, Michel: see CHEVALET, Claude, GILLOIS, Michel and MI-CALI , Artibano, 31 (1979), 127–138
GIULINI , Saverio: see GAUDRY, Garth, GIULINI , Saverio and MAN-TERO, Anna Maria, 42 (1990), 195–203
GLASNER, Moses and NAKAI , Mitsuru: A note on images of reductionoperators........................................................................ . . . . 33 (1981), 91–101
GLAZEBROOK, James F.:see BRADLOW, Steven B., GLAZEBROOK,James F. and KAMBER, Franz W., 51 (1999), 81–123
GLUCK, Lawrence: On the averages of Fourier-Stieltjes coefficients..... . . . . 26 (1974), 371–384
GOEL, D. S.: see CLARK, R. S. and GOEL, D. S., 24 (1972), 79–92
GOEL, R. M.: The radius of univalence of certain analytic functions..... . . . . 18 (1966), 398–403
GOES, Günther: On a Tauberian theorem for sequences with gaps and onFourier series with gaps....................................................... . . . . 24 (1972), 153–165
GOES, Günther: Sommen vonFK-Räumen, Funktionale Abschnittskon-vergenz und Umkehrsätze.................................................... . . . . 26 (1974), 487–504
GOLDBERG, S. I.: see BISHOP, R. L. and GOLDBERG, S. I., 17 (1965),310–318
GOLDBERG, S. I.: On the topology of compact contact manifolds........ . . . . 20 (1968), 106–110
GOLDBERG, S. I.: see GAUCHMAN, H. and GOLDBERG, S. I., 38 (1986),563–573
GOLDBERG, Samuel I.: Conformal maps of almost Kaehlerian manifolds. . . . 13 (1961), 119–131
GOLDBERG, Samuel I.: see BISHOP, Richard L. and GOLDBERG,Samuel I., 15 (1963), 359–364
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 17
GOLDBERG, Samuel I. and YANO, Kentaro: On normal globally framedf -manifolds.................................................................... . . . . 22 (1970), 362–370
GOLDBERG, Samuel I. and TOTH, Gabor: Torsion and deformation ofcontact metric structures on 3-manifolds................................... . . . . 39 (1987), 365–372
GOLDBERG, Samuel I. and TOTH, Gabor: Addendum to Torsion and de-formation of contact metric structures on 3-manifolds................... . . . . 41 (1989), 259–262
GOLDSTEIN, Myron: see ARMITAGE, David H. and GOLDSTEIN, My-ron, 38 (1986), 231–243
GÓMEZ LÓPEZ, A. M. M.: The inversion formulae for some hypergeo-metric transforms.............................................................. . . . . 26 (1974), 315–323
GONZÁLEZ, Josep: Hasse-Witt matrices for the Fermat curves of primedegree........................................................................... . . . . 49 (1997), 149–163
GONZALEZ-SPRINBERG, Gérard: see BOUVIER, Catherine andGONZALEZ-SPRINBERG, Gérard, 47 (1995), 125–149
GOPALAN, R.: Approximation operators on Banach spaces of distribu-tions.............................................................................. . . . . 26 (1974), 285–303
GOPALSAMY, Kondalsamy: Global asymptotic stability in a periodic in-tegrodifferential system....................................................... . . . . 37 (1985), 323–332
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GÖRLICH, Ernst and PONTZEN, Dieter: Approximation of operator semi-groups of Oharu’s class(C(k)) ............................................... . . . . 34 (1982), 539–552
GOTÔ, Morikuni: see NOMIZU, Katsumi and GOTÔ, Morikuni, 2 (1950),47–50
GOTO, Morikuni: Analytic subgroups ofGL(n,R) ......................... . . . . 25 (1973), 197–199
GOTO, Shiro and NAKAMURA , Yukio: Cohen-Macaulay Rees algebrasof ideals having analytic deviation two..................................... . . . . 46 (1994), 573–586
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GRAY, Alfred: Kähler submanifolds of homogeneous almost Hermitianmanifolds....................................................................... . . . . 21 (1969), 190–194
GRAY, Alfred: Six dimensional almost complex manifolds defined bymeans of three-fold vector cross products................................. . . . . 21 (1969), 614–620
GRAY, Alfred: Curvature identities for Hermitian and almost Hermitianmanifolds....................................................................... . . . . 28 (1976), 601–612
18 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
GROSS, Fred and YANG, Chung-Chun: On pseudo-prime entire func-tions.............................................................................. . . . . 26 (1974), 65– 71
GROTHENDIECK, Alexandre: Sur quelques points d’algèbre ho-mologique....................................................................... . . . . . 9 (1957), 119–221
GUGGENHEIMER, H.: Opérateurs différentiels et suites exactes sur unevariété kählérienne............................................................ . . . . . 8 (1956), 308–323
GUGGENHEIMER, Heinrichi: Ueber Kählersche und symplektische Dif-ferentialalgebren............................................................... . . . . . 4 (1952), 157–171
GUO, Zongming: see DANCER, E. Norman and GUO, Zongming, 47(1995), 199–225
GUPTA, D. P.: On order of sum of the series of ultraspherical functions. . . . . 10 (1958), 42– 48
GUPTA, D. P.: Correction : On order of sum of the series of ultrasphericalfunctions........................................................................ . . . . 11 (1959), 489
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GUTIERREZ, Carlos and SOTOMAYOR, Jorge: Lines of principal curva-ture for mappings with Whitney umbrella singularities.................. . . . . 38 (1986), 551–559
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HADWIGER, Hugo: Üeber addierbare Intervallfunktionale................. . . . . . 4 (1952), 33– 37
HAGA, Yoshinori and TAKEDA, Zirô: Correspondence between sub-groups and subalgebras in a cross product von Neumann algebra. . . . . . . . . 24 (1972), 167–190
HAGA, Yoshinori: On subalgebras of a cross product von Neumann alge-bra................................................................................ . . . . 25 (1973), 291–305
HAGA, Yoshinori: On approximately finite algebras........................ . . . . 26 (1974), 325–332
HAGA, Yoshinori: Crossed products of von Neumann algebras by com-pact groups..................................................................... . . . . 28 (1976), 511–522
HAKEDA, Jôsuke: On propertyP of von Neumann algebras.............. . . . . 19 (1967), 238–242
HAKEDA, Jôsuke and TOMIYAMA , Jun: On some extension properties ofvon Neumann algebras........................................................ . . . . 19 (1967), 315–323
HALANAY , Aristide and RASVAN, Vladimir: Stabilization of a class ofbilinear control systems with applications to steam turbine regulation. . . . 32 (1980), 299–308
HALE, Jack K.:see OLIVEIRA , José C. Fernandes de and HALE, Jack K.,32 (1980), 577–592
HALE, Jack K. and SALAZAR , Domingo: Boundary layers in a semilinearparabolic problem............................................................. . . . . 51 (1999), 412–432
HALPERN, Herbert and KAFTAL, Victor: Compact operators in type IIIλand type III0 factors, II........................................................ . . . . 39 (1987), 153–173
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 19
HAMADA , Suguru: On a free resolution of a dihedral group............... . . . . 15 (1963), 212–219
HAMADA , Yûsaku: Une remarque sur le domaine d’existence de la solu-tion du problème de Cauchy pour l’opérateur différentiel à coefficientsdes fonctions entières......................................................... . . . . 50 (1998), 133–138
HAMANA , Masamichi: On linear topological properties of someC∗-algebras......................................................................... . . . . 29 (1977), 157–163
HAMANA , Masamichi: Injective envelopes of Banach modules........... . . . . 30 (1978), 439–453
HAMANA , Masamichi, OKAYASU, Takateru and SAITÔ, Kazuyuki: Ex-tensions of derivations and automorphisms fromC∗-algebras to theirinjective envelopes............................................................. . . . . 34 (1982), 277–287
HAMANA , Masamichi: Injective envelopes ofC∗-dynamieal systems. . . . . . . 37 (1985), 463–487
HAMAYA , Yoshihiro: Periodic solutions of nonlinear integrodifferentialequations........................................................................ . . . . 41 (1989), 105–116
HANAI , Sitiro: On the methods of summation of infinite series........... . . . . . 2 (1950), 64– 67
HANAI , Sitiro: On N. Matsuyama’s closure operators on general neigh-bourhood spaces............................................................... . . . . . 3 (1951), 45– 47
HANDEL, David: On products in the cohomology of the dihedral groups. . . . 45 (1993), 13– 42
HANO, Jun-ichi and NOMIZU, Katsumi: Surfaces of revolution with con-stant mean curvature in Lorentz-Minkowski space....................... . . . . 36 (1984), 427–437
HANZAWA , Ei-Ichi: Classical solutions of the Stefan problem............ . . . . 33 (1981), 297–335
HARA, Masaru and NAKAI , Mitsuru: Corona theorem with bounds forfinitely sheeted disks.......................................................... . . . . 37 (1985), 225–240
HARADA, Minoru: On Sasakian manifolds................................... . . . . 25 (1973), 103–109
HARAUX, Alain and YOUKANA, Amar: On a result of K. Masuda con-cerning reaction-diffusion equations........................................ . . . . 40 (1988), 159–163
HARDIE, K. A.: On the category of the double mapping cylinder......... . . . . 25 (1973), 355–358
HARRIS, Steven G.: Horizontal lifts of spacelike curves with non-differentiable endpoints....................................................... . . . . 39 (1987), 145–151
HASEGAWA, Shigeru, SATO, Ryotaro and TSURUMI, Shigeru: Vectorvalued ergodic theorems for a one-parameter semigroup of linear op-erators........................................................................... . . . . 30 (1978), 95–106
HASHIMOTO, Ki-ichiro and KOSEKI, Harutaka: Class numbers of defi-nite unimodular Hermitian forms over the rings of imaginary quadraticfields............................................................................. . . . . 41 (1989), 1– 30
HASHIMOTO, Ki-ichiro and KOSEKI, Harutaka: Class numbers of posi-tive definite binary and ternary unimodular Hermitian forms........... . . . . 41 (1989), 171–216
HASHIMOTO, Ki-ichiro and MURABAYASHI , Naoki: Shimura curvesas intersections of Humbert surfaces and defining equations of QM-curves of genus two........................................................... . . . . 47 (1995), 271–296
20 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
HASHIMOTO, Mitsuyasu and HAYASHI , Takahiro: Quantum multilinearalgebra........................................................................... . . . . 44 (1992), 471–521
HASUMI, Morisuke: The extension property of complex Banach spaces. . . . 10 (1958), 135–142
HASUMI, Morisuke: Note on then-dimensional tempered ultra-distributions.................................................................... . . . . 13 (1961), 94–104
HASUMI, Morisuke: Algebraic derivations of the field of Mikusinski’soperators........................................................................ . . . . 13 (1961), 481–484
HASUMI, Morisuke and MOCHIZUKI, Nozomu: Fejér-Riesz inequalityfor holomorphic functions of several complex variables................. . . . . 33 (1981), 493–501
HATAKEYAMA , Yoji: see SASAKI , Shigeo and HATAKEYAMA , Yoji, 13(1961), 281–294
HATAKEYAMA , Yoji: On the existence of Riemann metrics associatedwith a 2-form of rank 2r ...................................................... . . . . 14 (1962), 162–166
HATAKEYAMA , Yoji, OGAWA, Yosuke and TANNO, Shukichi: Someproperties of manifolds with contact metric structure.................... . . . . 15 (1963), 42– 48
HATAKEYAMA , Yoji: Some notes on differentiable manifolds with almostcontact structures.............................................................. . . . . 15 (1963), 176–181
HATAKEYAMA , Yoji: On the integrability of a structure defined by twosemi-simple 0-defomable vector 1-forms which commute with eachother............................................................................. . . . . 17 (1965), 171–177
HATAKEYAMA , Yoji: Some notes on the group of automorphisms of con-tact and symplectic structures................................................ . . . . 18 (1966), 338–347
HATORI, Osamu: Does a non-Lipschitz function operate on a non-trivialBanach function algebra?.................................................... . . . . 46 (1994), 253–260
HATORI, Osamu: Functions which operate on algebras of Fourier multi-pliers............................................................................. . . . . 47 (1995), 105–115
HATTORI, Akio: Equivariant characteristic numbers and integrality theo-rem for unitaryT n-manifolds................................................ . . . . 26 (1974), 461–482
HATTORI, Akira: Some arithmetical applications of groupsHq(R,G) . . . . . . 33 (1981), 35– 63
HATVANI , László: see BURTON, Theodore and HATVANI , László, 41(1989), 65–104
HAUSEN, Jürgen:see A’C AMPO-NEUEN, Annette and HAUSEN, Jürgen,51 (1999), 1–12
HAYASHI , Takahiro: see HASHIMOTO, Mitsuyasu and HAYASHI ,Takahiro, 44 (1992), 471–521
HAYASHI , Takahiro: Galois quantum groups of II1-subfactors............ . . . . 51 (1999), 365–389
HAZAMA , Fumio: Algebraic cycles on Abelian varieties with many realendomorphisms................................................................ . . . . 35 (1983), 303–308
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 21
HAZAMA , Fumio: Geometric analogue of the Mumford-Tate Conjecturefor stably non-degenerate abelian varieties (A note on Mustafin’s pa-per)............................................................................... . . . . 40 (1988), 87– 94
HAZAMA , Fumio: The Mordell-Weil group of certain abelian varietiesdefined over the rational function field..................................... . . . . 44 (1992), 335–344
HE, Xue-zhong: Almost periodic solutions of a competition system withdominated infinite delays..................................................... . . . . 50 (1998), 71– 89
HEBDA, James J.: The local homology of cut loci in Riemannian mani-folds ............................................................................. . . . . 35 (1983), 45– 52
HEBDA, James J.:see BLUMENTHAL , Robert A. and HEBDA, James J.,40 (1988), 189–197
HERNÁNDEZ, Eugenio:see CARBERY, Anthony, HERNÁNDEZ, Eugenioand SORIA, Fernando, 41 (1989), 647–656
HERNÁNDEZ, Eugenio:see CARBERY, Anthony, HERNÁNDEZ, Eugenioand SORIA, Fernando, 42 (1990), 287
HEYWOOD, John G.: Epochs of regularity for weak solutions of theNavier-Stokes equations in unbounded domains.......................... . . . . 40 (1988), 293–313
HIDALGO, Rubén A.: Homology coverings of Riemann surfaces......... . . . . 45 (1993), 499–503
HILL , J. D.: Almost-convergent double sequences........................... . . . . 17 (1965), 105–116
HINO, Yoshiyuki: Asymptotic behavior of solutions of some functionaldifferential equations.......................................................... . . . . 22 (1970), 98–108
HINO, Yoshiyuki: Continuous dependence for functional differentialequations........................................................................ . . . . 23 (1971), 565–571
HINO, Yoshiyuki: Stability and existence of almost periodic solutions ofsome functional differential equations...................................... . . . . 28 (1976), 389–409
HINO, Yoshiyuki: Favard’s separation theorem in functional differentialequations with infinite retardations......................................... . . . . 30 (1978), 1– 12
HINO, Yoshiyuki: Almost periodic solutions of functional differentialequations with infinite retardation, II....................................... . . . . 32 (1980), 525–530
HINO, Yoshiyuki: Stability properties for functional differential equa-tions with infinite delay....................................................... . . . . 35 (1983), 597–605
HINO, Yoshiyuki, MURAKAMI , Satoru and YOSHIZAWA, Taro: Exis-tence of almost periodic solutions of some functional differential equa-tions with infinite delay in a Banach space................................ . . . . 49 (1997), 133–147
HINOHARA, Yukitoshi: Projective modules over semilocal rings.. .. ... .. . . . . 14 (1962), 205–211
HIROKADO, Masayuki: A non-liftable Calabi-Yau threefold in character-istic 3 ............................................................................ . . . . 51 (1999), 479–487
HIROKAWA, Hiroshi and SUNOUCHI, Gen-ichirô: Two theorems on theRiemann summability......................................................... . . . . . 5 (1954), 261–267
22 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
HIROKAWA, Hiroshi: Uniform convergence of some trigonometrical se-ries............................................................................... . . . . . 6 (1954), 162–173
HIROKAWA, Hiroshi: Riemann-Cesàro methods of summability.......... . . . . . 7 (1955), 279–295
HIROKAWA, Hiroshi: Remarks and errata on the paper “Uniform con-vergence of some trigonometrical series” this Journal, Vol. 6(1954)162–173......................................................................... . . . . . 7 (1955), 296–297
HIROKAWA, Hiroshi: Riemann-Cesàro methods of summability II....... . . . . . 9 (1957), 13– 26
HIROKAWA, Hiroshi: Further remarks on the paper “Uniform conver-gence of some trigonometrical series”, Tôhoku Math. Journ., 6(1954),162–173......................................................................... . . . . . 9 (1957), 110–112
HIROKAWA, Hiroshi: Riemann-Cesàro methods of summability III...... . . . . 11 (1959), 130–145
HIROKAWA, Hiroshi: Riemann-Cesàro methods of summability IV...... . . . . 11 (1959), 271–286
HIROKAWA, Hiroshi: Riemann-Cesàro methods of summability V....... . . . . 12 (1960), 369–382
HIROKAWA, Hiroshi: On the(K, 1, α)methods of summability.......... . . . . 13 (1961), 18– 23
HIROKAWA, Hiroshi: (�, p, α)methods of summability................... . . . . 16 (1964), 374–383
HIROKAWA, Hiroshi: Tauberian theorems for(�, p, α) summability. . . . . . . . 24 (1972), 191–199
HIRONAKA, Yumiko: Spherical functions of hermitian and symmetricforms, III ........................................................................ . . . . 40 (1988), 651–671
HO, Yang: Commutants and derivation ranges............................... . . . . 27 (1975), 509–514
HOECHSMANN, K.: see GAMST, J. and HOECHSMANN, K., 22 (1970),143–162
HOECHSMANN, K.: see GAMST, J. and HOECHSMANN, K., 23 (1971),581–588
HOISCHEN, Lothar: An extension of an approximation problem proposedby K. Itô ......................................................................... . . . . 18 (1966), 50– 53
HORIKAWA, Eiji: Notes on canonical surfaces............................... . . . . 43 (1991), 141–148
HORNOR, William E.: Invariance principles and asymptotic constancy ofsolutions of precompact functional differential equations............... . . . . 42 (1990), 217–229
HORNOR, William E.: Correction: Invariance principles and asymptoticconstancy of solutions of precompact functional differential equations. . . . 43 (1991), 447
HOSTEN, Serkan: On the complexity of smooth projective toric varieties. . . . 50 (1998), 325–332
HOTTA, Ryoshi: On Joseph’s construction of Weyl group representations. . . . 36 (1984), 49– 74
HOUH, Chorng-shi: The integrability of a structure on a differentiablemanifold......................................................................... . . . . 17 (1965), 72– 75
HOUH, Chorng-Shi: see HSU, Chen-Jung and HOUH, Chorng-Shi, 18(1966), 368–377
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 23
HOUNIE, Jorge and MELO, Maria Eulalia Moraes: Uniqueness in theCauchy problem for a class of differential operators with double char-acteristics....................................................................... . . . . 35 (1983), 249–259
HOWARD, Alan: A remark on Kählerian pinching........................... . . . . 24 (1972), 11– 19
HSIANG, Wu-yi: On soap bubbles and isoperimetric regions in non-compact symmetric spaces, I................................................. . . . . 44 (1992), 151–175
HSU, C. J.: A note on the decomposition of Wille incidence geometry ofgraden .......................................................................... . . . . 25 (1973), 521–525
HSU, Chen-Jung: A remark on locally flat infinitesimal connections.. ... . . . . 11 (1959), 425–429
HSU, Chen-Jung: Note on the integrability of a certain structure on dif-ferentiable manifold........................................................... . . . . 12 (1960), 349–360
HSU, Chen-Jung: On some structures which are similar to the quaternionstructure......................................................................... . . . . 12 (1960), 403–428
HSU, Chen-Jung: On some properties ofπ -structures on differentiablemanifold......................................................................... . . . . 12 (1960), 429–454
HSU, Chen-Jung: Remark on automorphisms in certain compact almostHermitian spaces............................................................... . . . . 13 (1961), 186–192
HSU, Chen-Jung: Note on(φ, ξ, η)-structure................................. . . . . 13 (1961), 434–442
HSU, Chen-Jung:see SASAKI , Shigeo and HSU, Chen-Jung, 14 (1962),167–176
HSU, Chen-Jung: On Walker differentiation in differentiable manifoldswith r-π -structure............................................................. . . . . 14 (1962), 332–343
HSU, Chen-Jung and HOUH, Chorng-Shi: Note on the integrability con-ditions of(φ, ψ)-structures.................................................. . . . . 18 (1966), 368–377
HSU, Chen-Jung:see SASAKI , Shigeo and HSU, Chen-Jung, 28 (1976),67–78
HSU, Lee-tsch C.: A general approximation method of evaluating multi-ple integrals..................................................................... . . . . . 9 (1957), 45– 55
HSU, Lee-Tsch C.: Errata : A general approximation methods of evaluat-ing multiple integrals.......................................................... . . . . . 9 (1957), 340
HSU, Leetsch C. and CHU, Wenchang: A kind of asymptotic expansionusing partitions................................................................. . . . . 43 (1991), 235–242
HU, Guoen and LU, Shanzhen: The commutator of the Bochner-Rieszoperator......................................................................... . . . . 48 (1996), 259–266
HU, Guoen:see MA, Bolin and HU, Guoen, 50 (1998), 349–363
HU, Sze-Tsen: Fiberings of enveloping spaces II............................ . . . . 14 (1962), 104–120
HUA, Xin-hou: On a conjecture of Fuchs concerning factorization of en-tire functions................................................................... . . . . 44 (1992), 259–270
HUANG, Qichang and ZHANG, Bo: Liapunov functionals and asymptoticstability in infinite delay systems............................................ . . . . 49 (1997), 503–516
24 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
HUDSON, W. N.: see YEH, J. and HUDSON, W. N., 24 (1972), 423–433
HUGHES, Edward:see PANDEY, J. N. and HUGHES, Edward, 28 (1976),497–509
HUNTER, Robert P. and SWINGLE, Paul M.: Indecomposable trajectories. . . . 10 (1958), 3– 10
HURUYA, Tadasi: Fubini products ofC∗-algebras........................... . . . . 32 (1980), 63– 70
HWANG, Jun Shung: A problem on ordinary fine topology and normalfunction......................................................................... . . . . 34 (1982), 1– 5
HWANG, Jun Shung: On a problem of Doob about angular and fine clustervalues............................................................................ . . . . 37 (1985), 307–321
IBUKIYAMA , Tomoyoshi: On rational points of curves of genus 3 overfinite fields...................................................................... . . . . 45 (1993), 311–329
ICHIJYO, Yoshihiro: On almost contact metric manifolds admitting par-allel fields of null planes...................................................... . . . . 16 (1964), 123–129
ICHIMURA, Humio and SUMIDA , Hiroki: On the Iwasawa invariants ofcertain real abelian fields..................................................... . . . . 49 (1997), 203–215
ICHINOHE, Akira: Sur la Possibilité de Plonger un Espace à ConnexionConforme donné dans un Espace Conforme............................... . . . . . 2 (1951), 193–204
IGARI, Satoru: Some integrability theorems of trigonometric series andmonotone decreasing functions.............................................. . . . . 12 (1960), 139–146
IGARI, Satoru:see KINUKAWA , Masakiti and IGARI, Satoru, 13 (1961),274–280
IGARI, Satoru: Transformations of conjugate functions II.................. . . . . 14 (1962), 121–126
IGARI, Satoru: On the decomposition theorems of Fourier transformswith weighted norms.......................................................... . . . . 15 (1963), 6– 36
IGARI, Satoru: An extension of the interpolation theorem ofMarcinkiewicz II............................................................... . . . . 15 (1963), 343–358
IGARI, Satoru: Correction: On the decomposition theorems of Fouriertransforms with weighted norms (This Journal, vol. 15(1963) pp. 6–36) ............................................................................... . . . . 15 (1963), 399
IGARI, Satoru: Sur les fonctions qui opèrent sur l’anneau de DirichletD(G) ............................................................................ . . . . 17 (1965), 200–205
IGARI, Satoru: A note on the Littlewood-Paley functiong∗(f ) ............ . . . . 18 (1966), 232–235
IGARI, Satoru: Functions ofLp-multipliers.................................. . . . . 21 (1969), 304–320
IGARI, Satoru and UNO, Yoshikazu: Banach algebra related to the Jacobipolynomials..................................................................... . . . . 21 (1969), 668–673
IGARI, Satoru and UNO, Yoshikazu: Correction : Banach algebra relatedto the Jacobi polynomials.................................................... . . . . 22 (1970), 142
IGARI, Satoru: Saturation of the approximation by eigenfunction expan-sions associated with the Laplace operator................................ . . . . 22 (1970), 231–239
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 25
IGARI, Satoru: On the multipliers of Hankel transform..................... . . . . 24 (1972), 201–206
IGARI, Satoru: Function ofLp-multipliers II ................................. . . . . 26 (1974), 555–561
IGARI, Satoru: Decomposition theorem and lacunary convergence ofRiesz-Bochner means of Fourier transforms of two variables.......... . . . . 33 (1981), 413–419
IGARI, Satoru: Interpolation of operators in Lebesgue spaces with mixednorm and its applications to Fourier analysis.............................. . . . . 38 (1986), 469–490
IGARI, Satoru and SATO, Enji: Operating functions on Fourier multipli-ers................................................................................ . . . . 46 (1994), 357–366
I I, Kiyotaka: Minimal submanifolds and convex functions................. . . . . 24 (1972), 571–579
I I, Kiyotaka: Curvature and spectrum of Riemannian manifold........... . . . . 25 (1973), 557–567
I I, Kiyotaka: On the isometric structure of Riemannian manifolds of non-negative Ricci curvature containing a compact hypersurface withoutfocal point...................................................................... . . . . 29 (1977), 1– 8
I I, Kiyotaka: On the multiplicities of the spectrum for quasi-classical me-chanics on spheres............................................................. . . . . 30 (1978), 517–524
I I, Kiyotaka: Geometric quantization for the mechanics on spheres. . . . . . . . . . 33 (1981), 289–295
I I, Kiyotaka: On a Bargmann-type transform and a Hilbert space of holo-morphic functions............................................................. . . . . 38 (1986), 57– 69
I ITAKA , Shigeru: The virtual singularity theorem and the logarithmic bi-genus theorem.................................................................. . . . . 32 (1980), 337–351
I IZUKA , Kenzo: On the Jacobson radical of a semiring..................... . . . . 11 (1959), 409–421
IKAI , Hisatoshi: Some prehomogeneous representations defined by cubicforms............................................................................ . . . . 50 (1998), 365–388
IKENO, Kyuhei: Summability methods of Borel type and Tauberian se-ries............................................................................... . . . . 16 (1964), 209–225
IKENO, Kyuhei: Lebesgue constants for a family of summability meth-ods............................................................................... . . . . 17 (1965), 250–265
IKENO, Kyuhei: Gibbs’ phenomenon for a family of summability meth-ods............................................................................... . . . . 18 (1966), 103–113
IKENO, Kyuhei: Correction : Summability methods of Borel type andTauberian series................................................................ . . . . 19 (1967), 101
IKENO, Kyuhei and SUZUKI , Yoshiya: Some remarks on saturation prob-lem in the local approximation.............................................. . . . . 20 (1968), 214–233
IKOMA, Kazuo: On Ahlfors’discs theorem and its application............. . . . . . 8 (1956), 101–107
IKOMA, Kazuo: Correction to my paper : “On Ahlfors’ discs theorem andits application” This Journal, Vol. 8(1956), 101–107.................... . . . . . 9 (1957), 118
IKOMA, Kazuo and SHIBATA , Kêichi: On the distortions in certain qua-siconformal mappings......................................................... . . . . 13 (1961), 241–247
26 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
IKOMA, Kazuo: Supplements to my former paper : “On Ahlfors discstheorem and its application” (This Journal, vol. 8(1956), 101–107). . . . . . . 13 (1961), 371–372
IKOMA, Kazuo: Modulus of rings in space................................... . . . . 15 (1963), 220–226
IKOMA, Kazuo: A distortion theorem inK-quasiconformal mappings ofthen-ball ........................................................................ . . . . 28 (1976), 553–561
IKOMA, Kazuo: On the unique existence of the extremal mapping inSchwarzi’s lemma for quasiregular mappings............................. . . . . 31 (1979), 23– 30
IKOMA, Kazuo: A modification of Teichmüller’s module theorem and itsapplication to a distortion problem inn-space............................ . . . . 32 (1980), 393–398
IMAI , Hideo: Values ofp-adicL-functions at positive integers andp-adiclog multiple gamma functions............................................... . . . . 45 (1993), 505–510
IMAYOSHI, Yôichi: A theorem on uniformity of prime surfaces of anentire function of two complex variables.................................. . . . . 27 (1975), 285–290
IMAYOSHI, Yoichi: Holomorphic families of Riemann surfaces and Te-ichmüller spaces II............................................................ . . . . 31 (1979), 469–489
IMAYOSHI, Yoichi: Holomorphic families of Riemann surfaces and Te-ichmüller spaces III........................................................... . . . . 33 (1981), 227–247
INABA, Takashi: Resilient leaves in transversely affine foliations......... . . . . 41 (1989), 625–631
INFANTE, Ettore Ferrari:see CARVALHO, Luis Antonio Viera, INFANTE,Ettore Ferrari and WALKER, John Andrew, 32 (1980), 283–297
INOUE, Atsushi: On Yamabe’s problem —by a modified direct method—. . . . 34 (1982), 499–507
INOUE, Atsushi: Strong and classical solutions of the Hopf equation —an example of Functional Derivative Equation of second order..... ... . . . . 39 (1987), 115–144
INOUE, Atsushi: On a construction of the fundamental solution for thefree Weyl equation by Hamiltonian path-integral method —an exactlysolvable case with “odd variable coefficients”............................ . . . . 50 (1998), 91–118
INOUE, Katsumi: Remarks on the limit sets of Kleinian groups........... . . . . 32 (1980), 419–425
INOUE, Katsumi: see AKAZA , Yohru and INOUE, Katsumi, 36 (1984),1–16
INOUE, Katsumi: Poincaré series for discrete Moebius groups acting onthe upper half space........................................................... . . . . 44 (1992), 35– 44
IRWIN, Ronald L.: Correction : Absolute summability factors I........... . . . . 19 (1967), 243
IRWIN, Ronald Lee: Absolute summability factors I........................ . . . . 18 (1966), 247–254
IRWIN, Ronald Lee: Correction : Absolute summability factors I......... . . . . 20 (1968), 111
ISBELL, J. R.: Zero-dimensional spaces....................................... . . . . . 7 (1955), 1– 8
ISHIDA, Masa-Nori: Torus embeddings and dualizing complexes......... . . . . 32 (1980), 111–146
ISHIDA, Masa-Nori and ODA, Tadao: Torus embeddings and tangentcomplexes....................................................................... . . . . 33 (1981), 337–381
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 27
ISHIDA, Masa-Nori: Tsuchihashi’s cusp singularities are Buchsbaum sin-gularities........................................................................ . . . . 36 (1984), 191–201
ISHIDA, Masa-Nori: An elliptic surface covered by Mumford’s fake pro-jective plane.................................................................... . . . . 40 (1988), 367–396
ISHIDA, Masa-Nori and KATO, Fumiharu: The strong rigidity theoremfor non-Archimedean uniformization....................................... . . . . 50 (1998), 537–555
ISHIGURO, Kazuo: Sur le problème de l’équation fonctionnelle... ... .... . . . . . 6 (1954), 1– 4
ISHIHARA, Shigeru: Fibred Riemannian spaces with isometric parallelfibres............................................................................. . . . . . 6 (1954), 243–252
ISHIHARA, Shigeru and OBATA, Morio: Affine transformations in a Rie-mannian manifold............................................................. . . . . . 7 (1955), 146–150
ISHIHARA, Shigeru: see FUKAMI , Tetsuzo and ISHIHARA, Shigeru, 7(1955), 151–156
ISHIHARA, Shigeru: Correction : Fibred Riemannian spaces with isomet-ric parallel fibres (This Journal, Vol. 6, pp. 243–252).................... . . . . . 8 (1956), 333
ISHIHARA, Shigeru: Holomorphically projective changes and theirgroups in an almost complex manifold..................................... . . . . . 9 (1957), 273–297
ISHIHARA, Shigeru: see TACHIBANA , Shun-ichi and ISHIHARA,Shigeru, 12 (1960), 77–101
ISHIHARA, Shigeru and TACHIBANA , Shun-ichi: A note on holomorh-pically projective transformations of a Kählerian space with parallelRicci tensor..................................................................... . . . . 13 (1961), 193–200
ISHIHARA, Shigeru: On a tensor fieldφhi satisfyingφp = ±I ............ . . . . 13 (1961), 443–454
ISHIHARA, Shigeru:see YANO, Kentaro, ISHIHARA, Shigeru and KON-ISHI, Mariko, 25 (1973), 167–175
ISHIHARA, Toru: Harmonic maps of nonorientable surfaces to four-dimensional manifolds........................................................ . . . . 45 (1993), 1– 12
ISHII, Hitoshi and SOUGANIDIS, Panagiotis: Generalized motion of non-compact hypersurfaces with velocity having arbitrary growth on thecurvature tensor................................................................ . . . . 47 (1995), 227–250
ISHII, Shihoko and WATANABE, Kimio: A geometric characterization ofa simpleK3-singularity...................................................... . . . . 44 (1992), 19– 24
ISHII, Shihoko: The minimal model theorem for divisors of toric varieties. . . . 51 (1999), 213–226
ISHIKAWA, Hiroshi, TOMIYAMA , Jun and WADA, Junzô: On the localbehavior of function algebras................................................ . . . . 22 (1970), 48– 55
ISHIKAWA, Yasushi: Asymptotic behavior of the transition density forjump type processes in small time.......................................... . . . . 46 (1994), 443–456
ISHIMURA, Naoyuki: Shape of spirals......................................... . . . . 50 (1998), 197–202
ISHIZAKI , Katsuya: Admissible solutions of second order differentialequations........................................................................ . . . . 44 (1992), 305–325
28 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
ISLAM, Muhammad:see ELOE, Paul and ISLAM, Muhammad, 47 (1995),263–269
ISTRAT, Vasile, SAITÔ, Teishirô and YOSHINO, Takashi: On a class ofoperators........................................................................ . . . . 18 (1966), 410–413
ITAGAKI , Yoshio: Note on the re-topologization of a space by a set ofoperators........................................................................ . . . . 21 (1969), 448–450
ITAGAKI , Yoshio: The eigenfunction expansion of the symmetric opera-tors associated with Gelfard triplet.......................................... . . . . 23 (1971), 259–271
ITO, Hidekazu: Integrable symplectic maps and their Birkhoff normalforms............................................................................ . . . . 49 (1997), 73–114
ITO, Hiroyuki: The Mordell-Weil groups of unirational quasi-elliptic sur-faces in characteristic 2....................................................... . . . . 46 (1994), 221–251
ITO, Kentaro: Iso-length-spectral problem for complete hyperbolic sur-faces of finite type............................................................. . . . . 48 (1996), 561–573
ITÔ, Noboru: On-structures of finite groups............................... . . . . . 4 (1952), 172–177
ITOH, Jin-ichi and TANAKA , Minoru: The dimension of a cut locus on asmooth Riemannian manifold................................................ . . . . 50 (1998), 571–575
ITOH, Matsuhiro: On Kaehler metrics on a compact homogeneous com-plex manifold................................................................... . . . . 28 (1976), 1– 5
ITOH, Takehiro and NAKAGAWA , Hisao: On certain hypersurfaces in areal space form................................................................. . . . . 25 (1973), 445–450
IWAMOTO, Hideyuki: On the structure of Riemannian spaces whose ho-lonomy groups fix a null-system............................................ . . . . . 1 (1950), 109–135
IWAMOTO, Hideyuki: On the relation between homological structure ofRiemannian spaces and exact differential forms which are invariantunder holonomy groups. I.................................................... . . . . . 3 (1951), 59– 70
IWAMOTO, Masayuki: General multi-canonical divisors on two-dimensional smoothable semi-log-terminal singularities................ . . . . 50 (1998), 211–228
IWANO, Masahiro: On a general solution of a nonlinear 2-system of theform x2dw/dx = w + xh(x,w) with a constant diagonal matrixof signature(1, 1) .............................................................. . . . . 32 (1980), 453–486
IWANO, Masahiro: New study on the convergence of a formal transfor-mation, II........................................................................ . . . . 47 (1995), 475–497
IWASAKI , Keiko and OGITSU, Noriko: On the mean curvature for anti-holomorphicp-plane in Kählerian spaces................................. . . . . 27 (1975), 313–317
IWASAWA, Kenkichi: Riemann-Hurwitz formula andp-adic Galois rep-resentations for number fields............................................... . . . . 33 (1981), 263–288
IWATA, Kôichi: Note on Postnikov invariants of a loop space............. . . . . . 8 (1956), 329–332
IWATA, Kôichi and MIYAZAKI , Hiroshi: Remarks on the realizability ofWhitehead product............................................................ . . . . 12 (1960), 130–138
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 29
IWATA, Koichi: On the realizability of Whitehead products................ . . . . 16 (1964), 203–208
IWATA, Koichi and ÔIKE, Hiroshi: The operationsρkR on the groupKR(CP
n) ....................................................................... . . . . 20 (1968), 582–588
IWATA, Koichi: Compact transformation groups on rational cohomologyCayley projective planes...................................................... . . . . 33 (1981), 429–442
IYANAGA , Kenichi: Cusps associated to lattices in Hermitian vectorspaces of dimension 2......................................................... . . . . 34 (1982), 373–388
IZEKI, Hiroyasu: On compact conformally flat 4-manifolds............... . . . . 44 (1992), 299–304
IZUCHI, Keiji and SHIMIZU , Tetsuhiro: Topologies on groups and a cer-tainL-ideal of measure algebras............................................ . . . . 25 (1973), 53– 60
IZUMI , Masako, IZUMI , Shin-ichi and PETERSEN, Gordon M.: OnHardy’s inequality and its generalization.................................. . . . . 21 (1969), 601–613
IZUMI , S., MATSUYAMA , N. and TSUCHIKURA, T.: Notes on FourierAnaysis (XLIX): Some negative examples................................ . . . . . 5 (1953), 43– 51
IZUMI , Shin-ichi: Notes on Fourier Analysis (VIII); Local properties ofFourier series................................................................... . . . . . 1 (1950), 136–143
IZUMI , Shin-ichi: Notes on Fourier Analysis (XVI)......................... . . . . . 1 (1950), 144–166
IZUMI , Shin-ichi: Notes on Fourier analysis (XXXV)...................... . . . . . 1 (1950), 285–302
IZUMI , Shin-ichi and SUNOUCHI, Gen-ichirô: Notes on fourier analysis(XXXIX): Theorems concerning Cesàro summability................... . . . . . 1 (1950), 313–326
IZUMI , Shin-ichi: Notes on Fourier Analysis (XXVI): Some negative ex-amples in the theory of Fourier series...................................... . . . . . 2 (1950), 74– 95
IZUMI , Shin-ichi: Notes on Fourier analysis(XVI): On the strong law oflarge numbers and gap series................................................ . . . . . 3 (1951), 89–103
IZUMI , Shin-ichi: Notes on Fourier analysis (XXVII): A theorem onCesàro summation............................................................. . . . . . 3 (1951), 212–215
IZUMI , Shin-ichi and SUNOUCHI, Gen-ichiô: Notes on Fourier Analysis(XLVIII): Uniform convergence of Fourier series........................ . . . . . 3 (1951), 298–305
IZUMI , Shin-ichi: Some Trigonometrical Series, IV......................... . . . . . 5 (1953), 18– 21
IZUMI , Shin-ichi: On an approximation problem in the theory of proba-bility ............................................................................. . . . . . 5 (1953), 22– 28
IZUMI , Shin-ichi: Some Trigonometrical series, V.......................... . . . . . 5 (1953), 29– 33
IZUMI , Shin-ichi: Some Trigonometrical Series VII........................ . . . . . 5 (1954), 268–271
IZUMI , Shin-ichi: Some Trigonometrical Series VI......................... . . . . . 5 (1954), 290–295
IZUMI , Shin-ichi: Some Trigonometrical Seties VIII........................ . . . . . 5 (1954), 296–301
IZUMI , Shin-ichi: Some trigonometrical series, IX.......................... . . . . . 6 (1954), 30– 34
IZUMI , Shin-ichi: Some trigonometrical series ,X........................... . . . . . 6 (1954), 69– 72
30 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
IZUMI , Shin-ichi: Some trigonometrical series XI........................... . . . . . 6 (1954), 73– 77
IZUMI , Shin-ichi and SATO, Masako: Integrability of trigonometrical se-ries I ............................................................................. . . . . . 6 (1954), 258–263
IZUMI , Shin-ichi and TSUCHIKURA, Tamotsu: Absolute convergence ofFourier expansions............................................................ . . . . . 7 (1955), 243–251
IZUMI , Shin-ichi: see MOHANTY, R. and IZUMI , Shin-ichi, 8 (1956),201–204
IZUMI , Shin-ichi: see IZUMI , Masako, IZUMI , Shin-ichi and PETERSEN,Gordon M., 21 (1969), 601–613
IZUMI , Shin-ichi: Obituary (by Tamotsu Tsuchikura)....................... . . . . 43 (1991)
IZUMI , Yosihisa: Remarques sur la notion de la perfection................. . . . . . 4 (1952), 252–256
IZUMI , Yosihisa: Über den Begriff derω-Vollständigkeit.................. . . . . . 4 (1952), 314–315
IZUMI , Yosihisa: Sur les formes normales.................................... . . . . . 6 (1954), 26– 29
IZUMI , Yosihisa: Sur le degré de la perfection............................... . . . . . 7 (1955), 128–131
IZUMI , Yosihisa and WADA, Tôru: Sur la notion de la perfection......... . . . . . 7 (1955), 132–135
IZUMINO, Saichi: The product of operators with closed range and anextension of the reverse order law........................................... . . . . 34 (1982), 43– 52
IZUMINO, Saichi: Generalized inverse method for subspace maps........ . . . . 35 (1983), 649–659
IZUMINO, Saichi: Generalized inverses of Toeplitz operators and inverseapproximation inH 2 .......................................................... . . . . 37 (1985), 95– 99
IZUMISAWA, M. and KAZAMAKI , N.: Weighted norm inequalities formartingales..................................................................... . . . . 29 (1977), 115–124
IZUMISAWA, Masataka, SEKIGUCHI, Takeshi and SHIOTA, Yasunobu:Remark on a characterization of BMO-martingales...................... . . . . 31 (1979), 281–284
IZUMISAWA, Masataka: Weighted norm inequality for operator on mar-tingales.......................................................................... . . . . 32 (1980), 1– 8
IZUMISAWA, Masataka: see MORIMOTO, Hiroaki and IZUMISAWA,Masataka, 35 (1983), 503–511
JABŁONSKI, Marian and MALCZAK , Jan: A central limit theorem forpiecewise convex mappings of the unit interval........................... . . . . 35 (1983), 173–180
JAKIMOVSKI , A.: see DITZIAN , Z. and JAKIMOVSKI , A., 20 (1968),170–174
JAKIMOVSKI , A.: see DITZIAN , Z. and JAKIMOVSKI , A., 20 (1968),175–198
JAKIMOVSKI , A.: see DITZIAN , Z. and JAKIMOVSKI , A., 21 (1969),195–220
JANG, Cheol Min: Julia set of the functionz exp(z+ µ) ................... . . . . 44 (1992), 271–277
JANG, Cheol Min: see KURODA, Tadashi and JANG, Cheol Min, 49(1997), 577–584
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 31
JANG, Youngho: An asymptotic expansion of thep-adic Green function. . . . 50 (1998), 229–242
JANS, J. P.: Torsion associated with duality................................... . . . . 24 (1972), 449–452
JENKINS, James A.: On the existence of certain general extremal metricsII ................................................................................. . . . . 45 (1993), 249–257
JIANG, Daqing: see WANG, Junyu and JIANG, Daqing, 50 (1998), 203–210
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JØRGENSEN, Palle E. T.: On one-parameter groups of automorphismsand extensions of symmetric operators associated with unboundedderivations in operator algebras............................................. . . . . 30 (1978), 277–305
JURKAT, W. and PEYERIMHOFF, A.: Über Sätze vom Bohr-Hardy’schenTyp ............................................................................... . . . . 17 (1965), 55– 71
JURKAT, W. B. and PEYERIMHOFF, A.: On power series with negativezeros............................................................................. . . . . 24 (1972), 207–221
KABEYA, Yoshitsugu, YANAGIDA , Eiji and YOTSUTANI, Shoji: Numberof zeros of solutions to singular initial value problems.................. . . . . 50 (1998), 1– 22
KAFTAL, Victor: see HALPERN, Herbert and KAFTAL, Victor, 39 (1987),153–173
KAJIWARA, Takeshi: The functor of a toric variety with enough invarianteffective Cartier divisors...................................................... . . . . 50 (1998), 139–157
KAKEHI , Tomoyuki and MASUDA, Tetsuya: Logarithmic divergence ofheat kernels on some quantum spaces...................................... . . . . 47 (1995), 595–600
KAMADA , Hiroyuki and MACHIDA, Yoshinori: Self-duality of metrics oftype(2, 2) on four-dimensional manifolds................................. . . . . 49 (1997), 259–275
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KAMBER, Franz W. and TONDEUR, Philippe: Semi-simple Weil algebrasand characteristic classes..................................................... . . . . 30 (1978), 373–422
KAMBER, Franz W. and TONDEUR, Philippe: Infinitesimal automor-phisms and second variation of the energy for harmonic foliations.... . . . . 34 (1982), 525–538
KAMBER, Franz W.:see BRADLOW, Steven B., GLAZEBROOK, James F.and KAMBER, Franz W., 51 (1999), 81–123
KAMEI , Nobuo: Simply invariant subspace theorems for antisymmetricfinite subdiagonal algebras................................................... . . . . 21 (1969), 467–473
KAMETANI , Yukio: The simple invariant and differentiable structures onthe Horikawa surface.......................................................... . . . . 47 (1995), 541–553
KAMINOGO, Takashi: Boundary value problems for ordinary adifferen-tial equations................................................................... . . . . 29 (1977), 449–461
KAMINOGO, Takashi: Kneser’s property and boundary value problemsfor some retarded functional differential equations....................... . . . . 30 (1978), 471–486
32 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
KAMINOGO, Takashi: A variation of Kneser’s theorem and boundaryvalue problems................................................................. . . . . 32 (1980), 511–523
KAMINOGO, Takashi: Topological degree of solution mappings in func-tional and ordinary differential equations.................................. . . . . 49 (1997), 527–535
KAMI NSKI, Brunon: Decreasing nets ofσ -algebras and their applicationsto ergodic theory............................................................... . . . . 43 (1991), 263–274
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KANEKO, Makoto: Estimates for the maximal function of Hardy-Littlewood and the maximal Hilbert transform with weighted mea-sures............................................................................. . . . . 22 (1970), 130–137
KANEKO, Makoto: The absolute Cesàro summability and the Littlewood-Paley function.................................................................. . . . . 24 (1972), 223–232
KANEKO, Makoto: Boundedness of some operators composed of Fouriermultipliers...................................................................... . . . . 35 (1983), 267–288
KANEKO, Makoto and SUNOUCHI, Gen-ichirô: On the Littlewood-Paleyand Marcinkiewicz functions in higher dimensions...................... . . . . 37 (1985), 343–365
KANEKO, Makoto: Estimates of the area integrals by the non-tangentialmaximal functions............................................................. . . . . 39 (1987), 589–596
KANEMAKI , Shôji: Quasi-Sasakian manifolds............................... . . . . 29 (1977), 227–233
KANG, Hyeonbae: Holomorphic automorphisms of certain class of do-mains of infinite type.......................................................... . . . . 46 (1994), 435–442
KANJIN, Yûichi: A convolution mesure algebra on the unit disc.......... . . . . 28 (1976), 105–115
KANJIN, Yûichi: Banach algebra related to disk polynomials............. . . . . 37 (1985), 395–404
KANJIN, Yuichi: A transplantation theorem for Laguerre series........... . . . . 43 (1991), 537–555
KANJIN, Yuichi and SAKAI , Ryozi: Pointwise convergence of Hermite-Fejér interpolation of higher order for Freud weights.................... . . . . 46 (1994), 181–206
KANNAPPAN, PL. and RATHIE, P. N.: On generalized information func-tion ............................................................................... . . . . 27 (1975), 207–212
KANNAPPAN, Pl.: Note on generalized information function.............. . . . . 30 (1978), 251–255
KANNO, Kôsi: On the Riemann summability................................ . . . . . 6 (1954), 155–161
KANNO, Kôsi: Cesàro summability of Fourier series....................... . . . . . 7 (1955), 110–118
KANNO, Kôsi: On the Cesàro summability of Fourier series (II).......... . . . . . 7 (1955), 265–278
KANNO, Kôsi: On the Riesz summability of Fourier series................ . . . . . 8 (1956), 223–234
KANNO, Kôsi: On the Cesàro summability of Fourier series (III)......... . . . . . 9 (1957), 27– 36
KANNO, Kôsi: On the summation of multiple Fourier series.............. . . . . 11 (1959), 25– 42
KANNO, Kosi and TSUCHIKURA, Tamotsu: On the absolute summabilityof Fourier series................................................................ . . . . 11 (1959), 456–479
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 33
KANNO, Kôsi: On the absolute summability of Fourier series (II)........ . . . . 13 (1961), 201–215
KANNO, Kosi: On the absolute Nörlund summability of the factoredFourier series................................................................... . . . . 21 (1969), 434–447
KANNO, Kosi and OKUYAMA , Yasuo: On the absolute Nörlund summa-bility factors of Fourier series................................................ . . . . 29 (1977), 439–448
KANNO, Kôsi: Absolute Riesz summability factors of Fourier series. . . . . . . . 36 (1984), 25– 32
KANNO, Tsuneo: On the representations of Lie algebras................... . . . . . 8 (1956), 46– 53
KANNO, Tsuneo: A note on the Lie algebras of algebraic groups......... . . . . 10 (1958), 262–273
KANNO, Tsuneo: On replicas................................................... . . . . 11 (1959), 287–298
KANNO, Tsuneo:see ABE, Eiichi and KANNO, Tsuneo, 11 (1959), 376–384
KANNO, Tsuneo: A certain class of commutative algebraic groups....... . . . . 14 (1962), 80– 98
KAPLANSKY, Irving: Group algebras in the large........................... . . . . . 3 (1951), 249–256
KARAKOSTAS, George, STAVROULAKIS , I. P. and WU, Yumei: Oscilla-tions of Volterra integral equations with delay............................ . . . . 45 (1993), 583–605
KARTSATOS, Athanassios G.: Convergence in perturbed nonlinear sys-tems.............................................................................. . . . . 24 (1972), 539–546
KARTSATOS, Athanassios G.: Locally invertible operators and existenceproblems in differential systems............................................. . . . . 28 (1976), 167–176
KARTSATOS, Athanassios G. and PARROTT, Mary E.: Existence of solu-tions and Galerkin approximations for nonlinear functional evolutionequations........................................................................ . . . . 34 (1982), 509–523
KASHIWABARA, Shobin: On the reducibility of an affinely connectedmanifold......................................................................... . . . . . 8 (1956), 13– 28
KASHIWABARA, Shobin: On Euclidean connections in a Finsler mani-fold ............................................................................... . . . . 10 (1958), 69– 80
KASHIWABARA, Shobin: The decomposition of a differentiable manifoldand its applications............................................................ . . . . 11 (1959), 43– 53
KASHIWABARA, Shobin: The structure of a Riemannian manifold admit-ting a parallel field of one-dimensional tangent vector subspaces...... . . . . 11 (1959), 327–350
KASHIWABARA, Shobin: The structure of a Riemannian manifold admit-ting a parallel field of tangent vector subspaces........................... . . . . 12 (1960), 102–119
KASHIWABARA, Shobin: On the parallelisability under Riemannian met-rics of direction fields over 3-dimensional manifolds.................... . . . . 14 (1962), 24– 47
KASHIWABARA, Shobin: On the parallelisability under Riemarmian met-rics of direction fields over 3-dimensional manifolds, II................. . . . . 15 (1963), 332–334
KASHIWABARA, Shobin: A fibering of Riemannian manifolds admitting1-parameter groups of motions.............................................. . . . . 17 (1965), 266–270
34 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
KASHIWABARA, Shobin: Riemannian manifolds with dense orbits underLie groups of motions......................................................... . . . . 20 (1968), 254–256
KASHIWABARA, Shobin: 3-dimensional Riemannian manifolds withdense orbits..................................................................... . . . . 25 (1973), 503–507
KASUE, Atsushi and KUMURA, Hironori: Spectral convergence of Rie-mannian manifolds............................................................ . . . . 46 (1994), 147–179
KASUE, Atsushi and KUMURA, Hironori: Spectral convergence of Rie-mannian manifolds, II......................................................... . . . . 48 (1996), 71–120
KATO, Fumiharu: Log smooth deformation theory.......................... . . . . 48 (1996), 317–354
KATO, Fumiharu: see ISHIDA, Masa-Nori and KATO, Fumiharu, 50(1998), 537–555
KATO, Junji: Asymptotic behaviors in functional differential equations. . . . . 18 (1966), 174–215
KATO, Junji: On the existence ofO-curves................................... . . . . 19 (1967), 49– 62
KATO, Junji: On the existence ofO-curves II................................ . . . . 19 (1967), 126–140
KATO, Junji: Uniformly asymptotic stability and total stability........ ... . . . . 22 (1970), 254–269
KATO, Junji and NAKAJIMA , Fumio: On Sacker-Sell’s theorem for a lin-ear skew product flow......................................................... . . . . 28 (1976), 79– 88
KATO, Junji: Liapunov’s second method in functional differential equa-tions.............................................................................. . . . . 32 (1980), 487–497
KATO, Junji: An autonomous system whose solutions are uniformly ulti-mately bounded but not uniformly bounded............................... . . . . 32 (1980), 499–504
KATO, Junji and KUROSAKI, Sadao: Notes on the stability in variation. . . . . 32 (1980), 505–510
KATO, Kazuya and MESSING, William: Syntomic cohomology andp-adic étale cohomology........................................................ . . . . 44 (1992), 1– 9
KATO, Masahide: Compact complex surfaces containing global stronglypseudoconvex hypersurfaces................................................. . . . . 31 (1979), 537–547
KATO, Masahide: Factorization of compact complex 3-folds which admitcertain projective structures.................................................. . . . . 41 (1989), 359–397
KATO, Masahide: Holomorphic conformal structures and characteristicforms............................................................................ . . . . 45 (1993), 51– 66
KATO, Mitsuyoshi, KOJIMA, Sadayoshi, OHKAWA , Tetsusuke and YA-MASAKI , Masayuki: The Matsumoto tripling for compact simply con-nected 4-manifolds............................................................ . . . . 31 (1979), 525–535
KATO, Shin: Conformal deformation to prescribed scalar curvature oncomplete noncompact Riemannian manifolds with nonpositive curva-ture............................................................................... . . . . 45 (1993), 205–230
KATO, Suehiro: A dimension formula for a certain space of automorphicforms ofSU(p, 1), II: The ease of�(N) withN ≥ 3 .................... . . . . 37 (1985), 571–584
KATO, Suehiro: CORRECTION: A dimension formula for a certain spaceof automorphic forms ofSU(p, 1), II: The case of�(N) with N ≥ 3 . . . . 38 (1986), 643
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 35
KATO, Tosio and SATAKE, Ichiro: An algebraic theory of Landau-Kolmogorov inequalities..................................................... . . . . 33 (1981), 421–428
KATO, Touru and MOTOMIYA, Kanji: A study on certain homogeneousspaces............................................................................ . . . . 21 (1969), 1– 20
KATO, Toyonori: Duality of cyclic modules.................................. . . . . 19 (1967), 349–356
KATO, Toyonori: Self-injective rings.......................................... . . . . 19 (1967), 485–495
KATO, Toyonori: Torsionless modules......................................... . . . . 20 (1968), 234–243
KATO, Toyonori: Rings ofU -dominant dimension≥ 1 ..................... . . . . 21 (1969), 321–327
KATO, Toyonori: Rings having dominant modules.......................... . . . . 24 (1972), 1– 10
KATSUDA, Atsushi and URAKAWA , Hajime: The Faber-Krahn typeisoperimetric inequalities for a graph....................................... . . . . 51 (1999), 267–281
KATSURA, Toshiyuki:see SHIODA, Tetsuji and KATSURA, Toshiyuki, 31(1979), 97–115
KATSURA, Toshiyuki: Unirational elliptic surfaces in characteristicp ... . . . . 33 (1981), 521–553
KATSURA, Toshiyuki: The unirationality of certain elliptic surfaces incharacteristicp ................................................................. . . . . 36 (1984), 217–231
KATSURADA, Hidenori: A generalized Igusa local zeta function and localdensities of quadratic forms.................................................. . . . . 44 (1992), 211–218
KATSURADA, Yoshie: On the theory of non-holonomic systems in theFinsler space.................................................................... . . . . . 3 (1951), 140–148
KAUP, Ludger: see BARTHEL, Gottfried, BRASSELET, Jean-Paul,FIESELER, Karl-Heinz and KAUP, Ludger, 48 (1996), 363–390
KAWACHI , Mayumi and NAKANO, Shin: The 2-class groups of cubicfields and 2-descents on elliptic curves..................................... . . . . 44 (1992), 557–565
KAWAGUCHI, Michiaki: Une généralisation du calcul des jets et quelquesprolongements généralisés de variétés différentiables................... . . . . 13 (1961), 329–370
KAWAI , Shigeo: A theorem of Bernstein type for minimal surfaces inR4 . . . . 36 (1984), 377–384
KAWAMURA , Shinzo: On the spectra of tensor product of linear operatorsin locally convex spaces...................................................... . . . . 27 (1975), 247–258
KAWAMURA , Shinzo: Invariant subspaces for shift operators of multi-plicity one....................................................................... . . . . 34 (1982), 15– 21
KAWAMURA , Shinzô: A decomposition of reducing subspace for shiftoperators........................................................................ . . . . 35 (1983), 425–440
KAWASHIMA , Shuichi and SHIZUTA, Yasushi: On the normal form of thesymmetric hyperbolic-parabolic systems associated with the conserva-tion laws......................................................................... . . . . 40 (1988), 449–464
KAWATA , Tatsuo: Remarks on prediction problem in the theory of sta-tionary stochastic processes.................................................. . . . . . 6 (1954), 13– 20
36 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
KAWATA , Tatsuo: Absolute convergence of Fourier series of periodic sto-chastic processes and its applieations....................................... . . . . 35 (1983), 459–474
KAWAZOE, Takeshi, ONOE, Yoshikazu and TACHIZAWA , Kazuya: Func-tions on the real line with nonnegative Fourier transforms.............. . . . . 46 (1994), 311–320
KAZAMAKI , N.: On a stoehastic integral equation with respect to a weakMartingale...................................................................... . . . . 26 (1974), 53– 63
KAZAMAKI , N.: A note on conformal martingales.......................... . . . . 26 (1974), 229–235
KAZAMAKI , N.: see IZUMISAWA, M. and KAZAMAKI , N., 29 (1977),115–124
KAZAMAKI , N.: The equivalence of two conditions on weighted norminequalities for martingales.................................................. . . . . 29 (1977), 275–285
KAZAMAKI , N.: On a problem of Girsanov.................................. . . . . 29 (1977), 597–600
KAZAMAKI , N.: Correction: On a problem of Girsanov.................... . . . . 30 (1978), 175
KAZAMAKI , Norihiko and TSUCHIKURA, Tamotsu: Weighted averagesof submartingales.............................................................. . . . . 19 (1967), 297–302
KAZAMAKI , Norihiko: On the equivalence ofq-martingales and locallyLp-integrable martingales.................................................... . . . . 20 (1968), 346–354
KAZAMAKI , Norihiko: Some remarks on local martingales............... . . . . 22 (1970), 174–180
KAZAMAKI , Norihiko: Remarks on the Riesz decomposition for super-martingales..................................................................... . . . . 22 (1970), 557–565
KAZAMAKI , Norihiko: On the existence of solutions of Martingale inte-gral equations.................................................................. . . . . 24 (1972), 463–468
KAZAMAKI , Norihiko: An inequality for the conditioned square func-tions on martingales........................................................... . . . . 28 (1976), 157–165
KAZAMAKI , Norihiko: On the existence of a conformal martingale...... . . . . 28 (1976), 437–441
KAZAMAKI , Norihiko: A note on exponential martingales................. . . . . 30 (1978), 367–371
KAZAMAKI , Norihiko: On transforming the class of BMO-martingalesby a change of law............................................................. . . . . 31 (1979), 117–125
KAZAMAKI , Norihiko and SEKIGUCHI, Takeshi: On the transformationof some classes of martingales by a change of law....................... . . . . 31 (1979), 261–279
KAZAMAKI , Norihiko: Changes of law, martingales and the conditionedsquare function................................................................. . . . . 31 (1979), 549–552
KAZAMAKI , Norihiko and SEKIGUCHI, Takeshi: Uniform integrabilityof continuous exponential martingales..................................... . . . . 35 (1983), 289–301
KAZAMAKI , Norihiko: On the reverse Hölder inequalities for certain ex-ponential processes............................................................ . . . . 35 (1983), 309–311
KAZAMAKI , Norihiko and SHIOTA, Yasunobu: Remarks on the class ofcontinuous martingales with bounded quadratic variation............... . . . . 37 (1985), 101–106
KENMOTSU, Katsuei: Invariant submanifolds in a Sasakian manifold. . . . . . . 21 (1969), 495–500
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 37
KENMOTSU, Katsuei: Some remarks on minimal submanifolds........... . . . . 22 (1970), 240–248
KENMOTSU, Katsuei: Local classification of invariantη-Einstein sub-manifolds of codimension 2 in a Sasakian manifold with constantφ-sectional curvature............................................................. . . . . 22 (1970), 270–272
KENMOTSU, Katsuei: Some results for an orientable 5-dimensional sub-manifold ofR7 ................................................................. . . . . 23 (1971), 59– 65
KENMOTSU, Katsuei: A class of almost contact Riemannian manifolds. . . . . 24 (1972), 93–103
KENMOTSU, Katsuei: On compact minimal surfaces with non-negativeGaussian curvature in a space of constant curvature I.................... . . . . 25 (1973), 469–479
KENMOTSU, Katsuei: A characterization of bipolar minimal surfaces inS4 ................................................................................ . . . . 26 (1974), 587–598
KENMOTSU, Katsuei: On a parametrization of minimal immersions ofR2 into S5 ....................................................................... . . . . 27 (1975), 83– 90
KENMOTSU, Katsuei: On compact minimal surfaces with non-negativeGaussian curvature in a space of constant curvature: II.................. . . . . 27 (1975), 291–301
KENMOTSU, Katsuei: Surfaces of revolution with prescribed mean cur-vature............................................................................ . . . . 32 (1980), 147–153
KERSTEN, Ina and REHMANN, Ulf: Generic splitting of reductive groups. . . . 46 (1994), 35– 70
KHAN, M. A.: see RAHMAN , Q. I. and KHAN, M. A., 19 (1967), 396–399
KHAN, N. A.: The characteristic roots of the product of two matrices. . . . . . . . 9 (1957), 234–237
KI, U-Hang and NAKAGAWA , Hisao: A characterization of the Cartanhypersurface in a sphere...................................................... . . . . 39 (1987), 27– 40
KIDA, Yûji: On cyclotomicZ2-extensions of imaginary quadratic fields. . . . 31 (1979), 91– 96
KIM, Byung Hak:see TAKAGI , Ryoichi, KIM, In-Bae and KIM, ByungHak, 50 (1998), 531–536
KIM, Chang-Wan and YIM, Jin-Whan: Surfaces with extreme value ofcurvature in Alexandrov spaces............................................. . . . . 47 (1995), 461–474
KIM, In-Bae:see TAKAGI , Ryoichi, KIM, In-Bae and KIM, Byung Hak,50 (1998), 531–536
KIM, Jae Moon: Circular units in theZp-extensions of real abelian fieldsof prime conductor............................................................ . . . . 51 (1999), 305–313
KIM, Seok Woo:see CHOI, Hyeong In, KIM, Seok Woo and LEE, YongHah, 50 (1998), 333–348
KIMPARA, Makoto: Sur les Réseaux plans dans un espace à connexionprojective à deux dimensions................................................ . . . . . 3 (1951), 174–181
KIMURA, Hideyuki: see KURIBAYASHI , Akikazu and KIMURA,Hideyuki, 43 (1991), 337–353
KINUKAWA , Masakiti: On the Cesàro summability of Fourier series..... . . . . . 6 (1954), 109–120
KINUKAWA , Masakiti: On the Cesàro summability of Fourier series II. . . . . . . 7 (1955), 252–264
38 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
KINUKAWA , Masakiti and IGARI, Satoru: Transformations of conjugatefunctions........................................................................ . . . . 13 (1961), 274–280
KINUKAWA , Masakiti: A note on the closure of translations inLp ....... . . . . 18 (1966), 225–231
KINUKAWA , Masakiti: Contractions of Fourier transforms inRk ......... . . . . 24 (1972), 233–243
KINUKAWA , Masakiti: Generalized Lipschitz class of functions and theirFourier transforms............................................................. . . . . 35 (1983), 583–595
KISHIMOTO, Akitaka and TAKAI , Hiroshi: On the invariantF(α) in C∗-dynamical systems............................................................. . . . . 30 (1978), 83– 94
KISHIMOTO, Akitaka: see BRATTELI, Ola, ELLIOTT, George A.,EVANS, David E. and KISHIMOTO, Akitaka, 41 (1989), 133–161
KITAGAWA , Yoshihisa: Umbilics of conformally flat submanifolds. . . . . . . . . . 32 (1980), 433–438
KITANO, Koh-ichi: Invariant subspaces of some non-selfadjoint opera-tors............................................................................... . . . . 20 (1968), 313–322
KITANO, Koh-ichi: A note on invariant subspaces........................... . . . . 21 (1969), 144–151
KITANO, Koh-ichi: The growth of the resolvent and hyperinvariant sub-spaces............................................................................ . . . . 25 (1973), 317–331
KITANO, Koh-ichi: Some conditions on a reductive operator implyingnormality or spectrality....................................................... . . . . 28 (1976), 293–303
KITANO, Koh-ichi: Criteria for the normality of a compact operator. . . . . . . . . 28 (1976), 459–465
KIZUKA , Takashi: Analytic automorphisms and algebraic automor-phisms ofC2 ................................................................... . . . . 31 (1979), 553–565
KIZUKA , Takashi: Analytic automorphisms of the complement of an al-gebraic curve in the complex projective plane............................ . . . . 33 (1981), 77– 89
KIZUKA , Takashi: Rational functions ofC∗-type on the two-dimensionalcomplex projective space..................................................... . . . . 38 (1986), 123–178
KLEMES, Ivo: The spectral type of the staircase transformation........... . . . . 48 (1996), 247–258
KLINGENBERG, Wilhelm: The index theorem for closed geodesics...... . . . . 26 (1974), 573–579
KLINGENBERG, Wilhelm and SASAKI , Shigeo: On the tangent spherebundle of a 2-sphere........................................................... . . . . 27 (1975), 49– 56
KOBAYASHI, Masako: Capacities of sets and harmonic analysis on thegroup 2ω ........................................................................ . . . . 21 (1969), 419–433
KOBAYASHI, Masako: Correction: Capacities of sets and harmonic anal-ysis on the group 2ω ........................................................... . . . . 21 (1969), 676
KOBAYASHI, Osamu: Yamabe metrics and conformal transformations. . . . . . 44 (1992), 251–258
KOBAYASHI, Ryoichi: A remark on the Ricci curvature of algebraic sur-faces of general type.......................................................... . . . . 36 (1984), 385–399
KOBAYASHI, Ryoichi: Einstein-Kaehler metries on open algebraic sur-faces of general type.......................................................... . . . . 37 (1985), 43– 77
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 39
KOBAYASHI, Ryoichi and TODOROV, Andrey N.: Polarized period mapfor generalizedK3 surfaces and the moduli of Einstein metrics. . . .. . . . . . . 39 (1987), 341–363
KOBAYASHI, Ryoichi, KUSHIBIKI , Keiko and NARUKI , Isao: Polygonsand Hilbert modular groups.................................................. . . . . 41 (1989), 633–646
KOBAYASHI, Shoshichi: Principal fibre bundles with the 1-dimensionaltoroidal group.................................................................. . . . . . 8 (1956), 29– 45
KOBAYASHI, Shoshichi: On the automorphism group of a certain class ofalgebraic manifolds............................................................ . . . . 11 (1959), 184–190
KOBAYASHI, Shoshichi: On characteristic classes defined by connections. . . . 13 (1961), 381–385
KOBAYASHI, Shoshichi: Homogeneous Riemannian manifolds of nega-tive curvature................................................................... . . . . 14 (1962), 413–415
KOBAYASHI, Shoshichi: Topology of positively pinched Kaehler mani-folds ............................................................................. . . . . 15 (1963), 121–139
KOBAYASHI, Shoshichi: Imbeddings of homogeneous spaces with mini-mum total curvature........................................................... . . . . 19 (1967), 63– 70
KOBAYASHI, Shoshichi: Isometric imbeddings of compact symmetricspaces............................................................................ . . . . 20 (1968), 21– 25
KOBAYASHI, Shoshichi: Some remarks and questions concerning the in-trinsic distance................................................................. . . . . 25 (1973), 481–486
KOBAYASHI, Shoshichi: Complex manifolds with nonpositive holomor-phic sectional curvature and hyperbolicity................................. . . . . 30 (1978), 487–489
KOBAYASHI, Shoshichi and OCHIAI , Takushiro: Holomorphic structuresmodeled after hyperquadrics................................................. . . . . 34 (1982), 587–629
KOBAYASHI, Shoshichi: Submersions of CR submanifolds................ . . . . 39 (1987), 95–100
KOBAYASHI, Shoshichi: Manifolds over function algebras and mappingspaces............................................................................ . . . . 41 (1989), 263–282
KODAMA, Akio and SAKANE, Yusuke: Remarks on eompact complexhypersurfaces of compact complex parallelisable nilmanifolds. . . . . . . . . . . . 29 (1977), 57– 60
KODAMA, Akio: On generalized Siegel domains with exponent(c1, c2, . . . , cs), II ............................................................. . . . . 34 (1982), 65– 86
KODAMA, Akio: Remarks on homogeneous hyperbolic complex mani-folds ............................................................................. . . . . 35 (1983), 181–186
KODAMA, Akio: Characterizations of certain weakly pseudoconvex do-mainsE(k, α) in Cn ........................................................... . . . . 40 (1988), 343–365
KODAMA, Akio: A characterization of certain domains with good bound-ary points in the sense of Greene-Krantz, II............................... . . . . 43 (1991), 9– 25
KODAMA, Akio: A characterization of certain weakly pseudoconvex do-mains............................................................................ . . . . 51 (1999), 55– 64
KOELMAN, Robert Jan: Generators for the ideal of a projectively embed-ded toric surface............................................................... . . . . 45 (1993), 385–392
40 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
KÖHNEN, W.: Das Anfangswertverhalten von Evolutionsgleichungen inBanachräumen. Teil I : Approximationseigenschaften von Evolution-soperatoren..................................................................... . . . . 22 (1970), 566–596
KÖHNEN, W.: Das Anfangswertverhalten von Evolutionsgleichungen inBanachräumen. Teil II: Anwendungen..................................... . . . . 23 (1971), 621–639
KOIKE, Masao: Hypergeometric polynomials over finite fields... .. ... ... . . . . 51 (1999), 75– 79
KOIZUMI , Sumiyuki and SUNOUCHI, Gen-ichirô: Generalized Fourierintegrals......................................................................... . . . . . 5 (1954), 243–260
KOIZUMI , Sumiyuki: On integral inequalities and certain applications toFourier series................................................................... . . . . . 7 (1955), 119–127
KOIZUMI , Sumiyuki: Correction and remark on the paper: On integral in-equalities and certain of its applications to Fourier series. This JournalVol. 7(1955), No. 1–2, pp 119–127......................................... . . . . . 8 (1956), 235–243
KOIZUMI , Sumiyuki: On fractional integration.............................. . . . . . 9 (1957), 298–306
KOIZUMI , Sumiyuki: A theorem about interpolation of operations on in-termediate spaces.............................................................. . . . . 24 (1972), 245–249
KOJIMA, Hisashi: Rankin’s method in the case of level 4q and its appli-cation to the Doi-Naganuma lifting......................................... . . . . 31 (1979), 195–205
KOJIMA, Hisashi: Siegel modular cusp forms of degree two............... . . . . 33 (1981), 65– 75
KOJIMA, Hisashi: Dimension of spaces of vector valued automorphicforms on the unitary group of degreeSU(2, 1) ........................... . . . . 36 (1984), 563–579
KOJIMA, Hisashi: Galois extensions of algebraic function fields.......... . . . . 42 (1990), 149–161
KOJIMA, Hisashi: Remark on Belyi’s paper concerning Galois extensionsof the maximal cyclotomic field with certain linear groups as Galoisgroups........................................................................... . . . . 43 (1991), 117–122
KOJIMA, Sadayoshi: see KATO, Mitsuyoshi, KOJIMA, Sadayoshi,OHKAWA , Tetsusuke and YAMASAKI , Masayuki, 31 (1979), 525–535
KOKUBU, Masatoshi: Isometric deformations of hypersurfaces in a Eu-clidean space preserving mean curvature.................................. . . . . 44 (1992), 433–442
KOKUBU, Masatoshi: Weierstrass representation for minimal surfaces inhyperbolic space............................................................... . . . . 49 (1997), 367–377
KOMATSU, Gen: Global analytic-hypoellipticity of the∂-Neumann prob-lem............................................................................... . . . . 28 (1976), 145–156
KOMATSU, Gen: Boundedness of the Bergman projector and Bell’s dual-ity theorem...................................................................... . . . . 36 (1984), 453–467
KOMATSU, Hikosaburo: A general interpolation theorem ofMarcinkiewicz type........................................................... . . . . 33 (1981), 383–393
KOMATSU, Kiichi: On zeta-functions and cyclotomicZp-extensions ofalgebraic number fields....................................................... . . . . 36 (1984), 555–562
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 41
KOMORNÍK, Jozef: Asymptotic periodicity of the iterates of weakly con-strictive Markov operators.................................................... . . . . 38 (1986), 15– 27
KOMURA, Yukio: see FURUYA, Kiyoko and KOMURA, Yukio, 37 (1985),125–149
KON, Masahiro: see YANO, Kentaro and KON, Masahiro, 28 (1976),215–225
KON, Masahiro:see YANO, Kentaro and KON, Masahiro, 29 (1977), 9–23
KONISHI, Mariko: see YANO, Kentaro, ISHIHARA, Shigeru and KON-ISHI, Mariko, 25 (1973), 167–175
KONNO, Kazuhiro: Infinitesimal Torelli theorem for complete intersec-tions in certain homogeneous Kähler manifolds.......................... . . . . 38 (1986), 609–624
KONNO, Kazuhiro: Infinitesimal Torelli theorem for complete intersec-tions in certain homogeneous Kähler manifolds, II....................... . . . . 42 (1990), 333–338
KONNO, Kazuhiro: see ASHIKAGA, Tadashi and KONNO, Kazuhiro, 42(1990), 517–536
KONNO, Kazuhiro: Infinitesimal Torelli theorem for complete intersec-tions in certain homogeneous Kähler manifolds, III...................... . . . . 43 (1991), 557–568
KONNO, Kazuhiro: On certain even canonical surfaces..................... . . . . 44 (1992), 59– 68
KOSAKI, Hideki: Remarks on positive cones associated with a von Neu-mann algebra................................................................... . . . . 33 (1981), 587–591
KOSEKI, Harutaka:see HASHIMOTO, Ki-ichiro and KOSEKI, Harutaka,41 (1989), 1–30
KOSEKI, Harutaka:see HASHIMOTO, Ki-ichiro and KOSEKI, Harutaka,41 (1989), 171–216
KOSHIKAWA, Hiroaki: On the bordism groups of semi-freeSa-actions.. . . . . 25 (1973), 535–539
KOTO, Satoshi: On harmonic tensors in anl almost Tachibana space. . . . . . . . . 13 (1961), 423–426
KOTO, Satoshi: see TACHIBANA , Shun-ichi and KOTO, Satoshi, 14(1962), 177–186
KOTANI, Motoko: The first eigenvalue of homogeneous minimal hyper-surfaces in a unit sphereSn+1(1) ............................................ . . . . 37 (1985), 523–532
KOWADA, Masasi: On a complete metric invariant for group automor-phisms on the torus............................................................ . . . . 22 (1970), 525–535
KOZIMA, Michitaka: On the absolute summability factors of power se-ries............................................................................... . . . . 18 (1966), 60– 70
KOZIMA, Michitaka and SUNOUCHI, Gen-ichirô: On the approximationand saturation by general singular integrals............................... . . . . 20 (1968), 146–169
KOZONO, Hideo: Weak and classical solutions of the two-dimensionalmagnetohydrodynamic equations........................................... . . . . 41 (1989), 471–488
KOZONO, Hideo: see NAITO, Hisashi, KOZONO, Hideo and MAEDA,Yoshiaki, 42 (1990), 45–66
42 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
KOZONO, Hideo and NAKAO, Mitsuhiro: Periodic solutions of theNavier-Stokes equations in unbounded domains.......................... . . . . 48 (1996), 33– 50
KRA, Irwin: see EARLE, Clifford J. and KRA, Irwin, 39 (1987), 429–436
KRAUSE, Guenter: On rings whose injective indecomposable modulesare finitely generated.......................................................... . . . . 22 (1970), 333–346
KRISZTIN, Tibor: Stability for functional differential equations and somevariational problems........................................................... . . . . 42 (1990), 407–417
KUANG, Yang, ZHANG, Binggen and ZHAO, Tao: Qualitative analysis ofa nonautonomous nonlinear delay differential equation................. . . . . 43 (1991), 509–528
KUANG, Yang: see TANG, Baorong and KUANG, Yang, 49 (1997), 217–239
KUBOKAWA, Yoshihiro: A local ergodie theorem for semi-group onLp .. . . 26 (1974), 411–422
KUBOTA, Tadahiko: Obituary note Matsusaburô Fujiwara................. . . . . . 1 (1949), 1– 2
KUBOTA, Tadahiko: The list of mathematical papers by Prof. T. Kubota. . . . . 1 (1949), 3– 13
KUBOTA, Yôto: On the definition of Cesàro-Perron integrals.............. . . . . 11 (1959), 266–270
KUBOTA, Yôto: The Cauchy property of the generalized approximatelycontinuous Perron integral................................................... . . . . 12 (1960), 171–174
KUBOTA, Yôto: On the approximately continuous Denjoy integral....... . . . . 15 (1963), 253–264
KUBOTA, Yôto: The preponderantly continuous Denjoy integral... ..... . . . . . 30 (1978), 537–541
KÜHNEL, Wolfgang and RADEMACHER, Hans-Bert: Oscillator and pen-dulum equation on pseudo-Riemannian spaces........................... . . . . 48 (1996), 601–612
KUIPERS, L.: see TIK, Han Khwat and KUIPERS, L., 9 (1957), 238–242
KUMURA, Hironori: see KASUE, Atsushi and KUMURA, Hironori, 46(1994), 147–179
KUMURA, Hironori: see KASUE, Atsushi and KUMURA, Hironori, 48(1996), 71–120
KUNIYOSHI, Hideo: On a certain group concerning thep-adic numberfield .............................................................................. . . . . . 1 (1950), 186–193
KUNIYOSHI, Hideo and TAKAHASHI , Shuichi: On the principal genustheorem.......................................................................... . . . . . 5 (1953), 128–131
KUNIYOSHI, Hideo: On purely-transcendency of a certain field. ......... . . . . . 6 (1954), 101–108
KUNIYOSHI, Hideo: Cohomology theory and different..................... . . . . 10 (1958), 313–337
KUO, Ying-Yan: On almost contact 3-structure.............................. . . . . 22 (1970), 325–332
KURANISHI, Masatake: On non-connected maximally almost periodicgroups........................................................................... . . . . . 2 (1950), 40– 46
KURANO, Kazuhiko: A remark on the Riemann-Roch formula on affineschemes associated with Noetherian local rings.......................... . . . . 48 (1996), 121–138
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 43
KURIBAYASHI , Akikazu and KIMURA, Hideyuki: Automorphismgroups, isomorphic toGL(3,F2), of compact Riemann surfaces...... . . . . 43 (1991), 337–353
KURIHARA, Mitsunobu: Asymptotic expansions in scalar linear func-tional differential equations.................................................. . . . . 32 (1980), 189–199
KURITA, Minoru: On a Certain Motion in the Euclidean Space........... . . . . . 2 (1951), 275–285
KURIYAMA , Yoshiaki: see ÔIKE, Hiroshi and KURIYAMA , Yoshiaki, 19(1967), 454–461
KURODA, Tadashi: Some remarks on an open Riemann surface with nullboundary........................................................................ . . . . . 3 (1951), 182–186
KURODA, Tadashi: On the uniform meromorphic functions with the setof capacity zero of essential singularities.................................. . . . . . 3 (1951), 257–269
KURODA, Tadashi and SAGAWA, Akira: Remark on the Gross property. . . . . 20 (1968), 394–399
KURODA, Tadashi and JANG, Cheol Min: Julia set of the functionz exp(z+ µ) II ................................................................ . . . . 49 (1997), 577–584
KUROKAWA, Toshiko and MATSUMOTO, Kikuji: On totally ramified val-ues............................................................................... . . . . 28 (1976), 245–256
KUROSAKI, Sadao:see KATO, Junji and KUROSAKI, Sadao, 32 (1980),505–510
KUROSE, Hideki: Closed derivations inC(I) ................................ . . . . 35 (1983), 341–347
KUROSE, Takashi: On the divergences of 1-conformally flat statisticalmanifolds....................................................................... . . . . 46 (1994), 427–433
KURTZ, J. C.: Almost convergent vector sequences......................... . . . . 22 (1970), 493–498
KURTZ, J. C.: Almost convergence in Banach spaces....................... . . . . 24 (1972), 389–399
KURTZ, J. Cleo: Hardy-Bohr theorems........................................ . . . . 18 (1966), 237–246
KURTZ, J. Cleo: A note on convergence and summability factors......... . . . . 20 (1968), 113–119
KUSHIBIKI , Keiko: see KOBAYASHI, Ryoichi, KUSHIBIKI , Keiko andNARUKI , Isao, 41 (1989), 633–646
KUTTNER, B.: Some quasi-Hausdorff transformations..................... . . . . 26 (1974), 11– 24
KUTTNER, B.: Sequences summable by some Riesz mean................. . . . . 30 (1978), 211–221
KUWABARA, Ruishi: Spectrum of the Schrödinger operator on a line bun-dle over complex projective spaces......................................... . . . . 40 (1988), 199–211
KYUNO, Shoji: On the semi-simple gamma rings........................... . . . . 29 (1977), 217–225
LAI , Hang-Chin: On the multipliers ofAP (G)-algebras.................... . . . . 23 (1971), 641–662
LAI , Hang-Chin: Multipliers of a Banach algebra in the second conjugatealgebra as an idealizer......................................................... . . . . 26 (1974), 431–452
LAI , Hang-Chin: Restrictions of Fourier transforms onAp ................ . . . . 26 (1974), 453–460
LAI , Hang-Chin and CHANG, Tsu-Kung: Multipliers and translation in-variant operators............................................................... . . . . 41 (1989), 31– 41
44 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
LAI , Hon-Fei: see WONG, Yung-chow and LAI , Hon-Fei, 19 (1967), 1–31
LAI , Hon-Fei: Weakened Bertrand curves.................................... . . . . 19 (1967), 141–155
LAKE, Jane:see BROWN, Gavin, DOOLEY, Anthony H. and LAKE, Jane,47 (1995), 1–13
LAKSHMIKANTHAM , V.: see BERNFELD, Stephen R. and LAKSH-MIKANTHAM , V., 32 (1980), 607–613
LAKSHMINARASIMHAN , T. V.: On the mean of an entire function andthe mean of the product of two entire functions........................... . . . . 19 (1967), 417–422
LALLI , Bikkar S.:see GOPALSAMY, Kondalsamy and LALLI , Bikkar S.,43 (1991), 149–160
LANGER, Andreas: 0-cycles on the elliptic modular surface of level 4. . . . . . . 50 (1998), 291–302
LASOTA, Andrzej: A fixed point theorem and its application in ergodictheory............................................................................ . . . . 32 (1980), 567–575
LATERVEER, Robert: Linear systems on toric varieties..................... . . . . 48 (1996), 451–458
LAURITZEN, Niels: see BUCH, Anders, THOMSEN, Jesper F., LAU-RITZEN, Niels and MEHTA, Vikram, 49 (1997), 355–366
LEE, Doo Seok: see CHOI, Hyeong In, LEE, Doo Seok and YOON,Joung-Hahn, 50 (1998), 455–467
LEE, E. T. Y. and SUNOUCHI, Gen-ichirô: On the majorant properties inLp(G) ........................................................................... . . . . 31 (1979), 41– 48
LEE, Nany: Constant mean curvature hypersurfaces in noncompact sym-metric spaces................................................................... . . . . 47 (1995), 499–508
LEE, Yong Hah:see CHOI, Hyeong In, KIM, Seok Woo and LEE, YongHah, 50 (1998), 333–348
LEE, Yu-Lee: On the existence of non-comparable homogeneous topolo-gies with the same class of homeomorphisms............................. . . . . 22 (1970), 499–501
LEVIATAN , Dany: Some Tauberian theorems concerning(S∗, µ) trans-formations...................................................................... . . . . 21 (1969), 389–405
LEVIN, Jacob J.: Nonlinearly perturbed Volterra equations................ . . . . 32 (1980), 317–335
LI, Song-Ying:see CHEN, Jingyi and LI, Song-Ying, 49 (1997), 585–597
LI, Zhixiang: see WANG, Zhicheng, LI, Zhixiang and WU, Jianhong, 37(1985), 455–462
LI, Zhi-Xiang: Liapunov-Razumikhin functions and the asymptotic prop-erties of the autonomous functional differential equations with infinitedelay............................................................................. . . . . 38 (1986), 491–499
LI, Zhixiang: Representation of the solution operator generated by func-tional differential equations.................................................. . . . . 42 (1990), 109–117
LIN, Gow Dong: On a moment problem...................................... . . . . 38 (1986), 595–598
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 45
LIN, Tsau-young: On complex manifolds with certain structures whichare related to complex contact structures................................... . . . . 15 (1963), 187–202
LIN, Zhenghua:see WANG, Junyu, GAO, Wenjie and LIN, Zhenghua, 47(1995), 327–344
LIU, Qing: Sur les espaces de Stein quasi-compacts en geometrie rigide. . . . 42 (1990), 289–306
LIU, Shih-Chao: An example of general recursive well-ordering which isnot primitive recursive........................................................ . . . . 12 (1960), 233–234
LIU, Shihi-Chao: An enumeration of the primitive recursive functionswithout repetition.............................................................. . . . . 12 (1960), 400–402
LIU, Xianfang: On the geography of threefolds (with an Appendix byMei-Chu Chang)............................................................... . . . . 49 (1997), 59– 71
LIVESAY, G. R.: see BROWDER, W. and LIVESAY, G. R., 25 (1973),69–88
LÓPEZ, Rafael:see ALÍAS, Luis J., LÓPEZ, Rafael and PASTOR, José A.,50 (1998), 491–501
LORENTE DOMÍNGUEZ, María and MARTÍN-REYES, Francisco Javier:The ergodic Hilbert transform for Cesàro bounded flows............... . . . . 46 (1994), 541–556
LORENTZ, George G. and ZELLER, Karl: Strong and ordinary summa-bility ............................................................................. . . . . 15 (1963), 315–321
LOUBOUTIN, Stéphane: On the class number one problem for non-normal quartic CM-fields..................................................... . . . . 46 (1994), 1– 12
LOVELADY, David Lowell: Relative boundedness and second order dif-ferential equations............................................................. . . . . 25 (1973), 365–374
LOY, R. J.: Uniqueness of the complete norm topology and continuity ofderivations on Banach algebras.............................................. . . . . 22 (1970), 371–378
LU, Shanzhen:see HU, Guoen and LU, Shanzhen, 48 (1996), 259–266
LU, Shanzhen:see DING, Yong and LU, Shanzhen, 48 (1996), 437–449
LU, Shijie: The range and pseudo-inverse of a product..................... . . . . 39 (1987), 89– 94
LU, Shijie: An application of pseudo-inverses — the analytic character-istic of T -regular points for closed operators.............................. . . . . 40 (1988), 331–341
LUDDEN, G. D.: see BLAIR , D. E. and LUDDEN, G. D., 21 (1969), 354–362
MA, Bolin and HU, Guoen: Maximal operators associated with commu-tators of spherical means..................................................... . . . . 50 (1998), 349–363
MA, Shiwang, YU, Jianshe and WANG, Zhicheng: Semilinear equationsat resonance with the kernel of an arbitrary dimension.................. . . . . 50 (1998), 513–529
MABUCHI, Toshiki: Almost homogeneous torus actions on varieties withample tangent bundle......................................................... . . . . 30 (1978), 639–651
MABUCHI, Toshiki: K-energy maps integrating Futaki invariants......... . . . . 38 (1986), 575–593
46 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
MACHIDA, Yoshinori: see KAMADA , Hiroyuki and MACHIDA, Yoshi-nori, 49 (1997), 259–275
MADDOX, I. J.: On Riesz summability factors............................... . . . . 14 (1962), 431–435
MADDOX, Ivor J.: On absolute Riesz summability factors................. . . . . 15 (1963), 116–120
MADDOX, Ivor J.: On absolute Riesz summability factors (II)............ . . . . 16 (1964), 60– 71
MAEDA, Masao: The injective radius of non-compact 3-dimensional Rie-mannian manifolds............................................................ . . . . 27 (1975), 405–412
MAEDA, Yoshiaki: see NISHIKAWA , Seiki and MAEDA, Yoshiaki, 26(1974), 159–168
MAEDA, Yoshiaki: see NAITO, Hisashi, KOZONO, Hideo and MAEDA,Yoshiaki, 42 (1990), 45–66
MAHFOUD, Wadi Elias:see BURTON, Theodore Allen and MAHFOUD,Wadi Elias, 37 (1985), 489–511
MAKAY , Géza: Periodic solutions of dissipative functional differentialequations........................................................................ . . . . 46 (1994), 417–426
MAKAY , Géza: Periodic solutions of dissipative functional differentialequations with infinite delay................................................. . . . . 48 (1996), 355–362
MALCZAK , Jan:see JABŁONSKI, Marian and MALCZAK , Jan, 35 (1983),173–180
MANTERO, Anna Maria: see GAUDRY, Garth, GIULINI , Saverio andMANTERO, Anna Maria, 42 (1990), 195–203
MARIC, V. and SHAH, S. M.: Entire functions defined by gap powerseries and satisfying a differential equation................................ . . . . 21 (1969), 621–631
MARTELLI , Mario and SCHUUR, Jerry D.: Periodic solutions of Liénardtype second order ordinary differential equations........................ . . . . 32 (1980), 201–207
MARTÍN-REYES, Francisco Javier:see LORENTE DOMÍNGUEZ, Maríaand MARTÍN-REYES, Francisco Javier, 46 (1994), 541–556
MASHIMO, Katsuya: Eigenmaps and minimal immersions of projectivespaces into spheres............................................................ . . . . 40 (1988), 245–267
MASKIT, Bernard: The homology covering of a Riemann surface........ . . . . 38 (1986), 561–562
MASSEY, William S.: Surfaces of Gaussian curvature zero in Euclidean3-space.......................................................................... . . . . 14 (1962), 73– 79
MASUDA, K.: Note on conservative algebraic function fields.............. . . . . . 5 (1953), 12– 17
MASUDA, Katsuhiko: Direct decompositions of Galois algebras.......... . . . . . 4 (1952), 122–130
MASUDA, Katsuhiro: Note on characters of the groups of units of alge-braic number fields............................................................ . . . . 13 (1961), 248–252
MASUDA, Kyûya: Weak solutions of Navier-Stokes eqtlations............ . . . . 36 (1984), 623–646
MASUDA, Mikiya: Unitary toric manifolds, multi-fans and equivariantindex............................................................................. . . . . 51 (1999), 237–265
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 47
MASUDA, Tetsuya:see KAKEHI , Tomoyuki and MASUDA, Tetsuya, 47(1995), 595–600
MATSUDA, Kouichi and MINAKAWA , Hiroyuki: A qualitative theory ofsimilarity pseudogroups: holonomy of the orbits with bubbles......... . . . . 46 (1994), 71– 82
MATSUDA, Ryuuki: On purely-transcendency of certain fields............ . . . . 16 (1964), 189–202
MATSUI, Akinori: Surgery on 1-connected homology manifolds......... . . . . 26 (1974), 169–172
MATSUI, Akinori: Transversality theorem for homology manifolds andthe representation of homology classes of homology manifolds. . . . . . . . . . . 27 (1975), 497–508
MATSUI, Akinori: Stiefel Whitney homology classes ofZ2-Poincaré Eu-ler spaces........................................................................ . . . . 35 (1983), 321–339
MATSUI, Akinori: Axioms for Stiefel-Whitney homology classes ofZ2-Euler spaces.................................................................... . . . . 37 (1985), 27– 32
MATSUI, Akinori: Stiefel-Whitney homology classes ofk-Poincaré-Eulerspaces............................................................................ . . . . 37 (1985), 287–297
MATSUI, Akinori: Intersection formula for Stiefel-Whitney homologyclasses........................................................................... . . . . 40 (1988), 315–322
MATSUKI, Kenji: see ABRAMOVICH, Dan, MATSUKI, Kenji andRASHID, Suliman, 51 (1999), 489–537
MATSUMOTO, Kozi: On a conformalC-Killing vector field in a compactSasakian manifold............................................................. . . . . 25 (1973), 139–144
MATSUMOTO, Kikuji: see KUROKAWA, Toshiko and MATSUMOTO,Kikuji, 28 (1976), 245–256
MATSUMOTO, Kikuji: On the generalization of Frostman’s theorem dueto S. Kobayashi................................................................ . . . . 40 (1988), 409–412
MATSUMOTO, Kishi: Local property of the summability|R, λn, 1| . . . . . . . . . . . 8 (1956), 114–124
MATSUMOTO, Kishi: On absolute Cesàro summability of a series relatedto a Fourier series.............................................................. . . . . . 8 (1956), 205–222
MATSUMOTO, Kishi: A sufficient condition for the absolute Rieszsummability of a Fourier series.............................................. . . . . . 9 (1957), 222–233
MATSUMOTO, Yukio: see MATUMOTO, Takao and MATSUMOTO, Yukio,27 (1975), 57–68
MATSUOKA, Yoshio: On the approximation of functions by some singu-lar integrals..................................................................... . . . . 18 (1966), 13– 43
MATSUYAMA , N.: see IZUMI , S., MATSUYAMA , N. and TSUCHIKURA,T., 5 (1953), 43–51
MATSUYAMA , Noboru: Linear topological spaces and its pseudo-norms. . . . . 1 (1949), 14– 21
MATSUYAMA , Noboru: A note on general topological spaces............. . . . . . 1 (1949), 22– 25
MATSUYAMA , Noboru: Notes on Fourier Analysis (X): Absolute Cesàrosummability of Fourier series................................................ . . . . . 1 (1949), 40– 45
48 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
MATSUYAMA , Noboru: Notes on Fourier Analysis (XX): On the Rieszlogarithmic summability of the derived Fourier series................... . . . . . 1 (1949), 91– 94
MATSUYAMA , Noboru: Notes on Fourier Analysis (XXV): On the|C|-summabililty of the Fourier series........................................... . . . . . 2 (1950), 51– 56
MATSUYAMA , Noboru: Notes on Fourier Analysis (XXXVII) : On theConvergence Factor of the Fourier Series at a Point...................... . . . . . 2 (1950), 126–134
MATSUYAMA , Noboru: Notes on Fourier Analysis (XL): On the absolutesummability of the Fourier series........................................... . . . . . 3 (1951), 39– 44
MATSUYAMA , Noboru: On the strong law of large numbers............... . . . . 18 (1966), 259–269
MATSUYAMA , Yoshio: Rigidity of hypersurfaces with constant mean cur-vature............................................................................ . . . . 28 (1976), 199–213
MATSUYAMA , Yoshio: Complex hypersurfaces ofPn(C)× Pn(C) .. . . . . . . . . 28 (1976), 541–552
MATSUZAKI , Katsuhiko: Geometric finiteness, quasiconformal stabilityand surjectivity of the Bers map for Kleinian groups.................... . . . . 43 (1991), 327–336
MATSUZAWA, Tadato: Gevrey hypoellipticity of a class of pseudodiffer-ential operators................................................................. . . . . 39 (1987), 447–464
MATUMOTO, Takao and MATSUMOTO, Yukio: The unstable differencebetween homology cobordism and piecewise linear bloek bundles.. .. . . . . 27 (1975), 57– 68
MAWHIN, Jean: Two point boundary value problems for nonlinear secondorder differential equations in Hilbert spaces.............................. . . . . 32 (1980), 225–233
MAY, C. P.:see DITZIAN , Z. and MAY, C. P., 28 (1976), 363–372
MAZHAR, S. M.: On the absolute summability factors of infinite series. . . . . 23 (1971), 433–451
MCMILLIN , Kenneth M.: Abel summability of the double series succes-sively derived from the double Fourier series............................. . . . . . 8 (1956), 183–187
MEANEY, Christopher:see CAZZANIGA , Franco and MEANEY, Christo-pher, 34 (1982), 389–406
MEANEY, Christopher and PRESTINI, Elena: Bochner-Riesz means onsymmetric spaces.............................................................. . . . . 50 (1998), 557–570
MEDINA, Alberto: Groupes de Lie munis de métriques bi-invariantes. . . . . . . 37 (1985), 405–421
MEDINA, Alberto: see BORDEMANN, Martin, MEDINA, Alberto andOUADFEL, Ali, 45 (1993), 423–436
MEGIBBEN, Charles: Stiff groups and wild socles........................... . . . . 20 (1968), 577–581
MEGIBBEN, Charles: A generalization of the classical theory of primarygroups........................................................................... . . . . 22 (1970), 347–356
MEHTA, Vikram: see BUCH, Anders, THOMSEN, Jesper F., LAURITZEN,Niels and MEHTA, Vikram, 49 (1997), 355–366
MEIGNIEZ, Gaël: Bouts d’un groupe opérant sur la droite: 2. Applicationà la topologie des feuilletages................................................ . . . . 43 (1991), 473–500
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 49
MELO, Maria Eulalia Moraes:see HOUNIE, Jorge and MELO, MariaEulalia Moraes, 35 (1983), 249–259
MESSING, William: see KATO, Kazuya and MESSING, William, 44(1992), 1–9
MIAO, Shumei: Boundary value problems for higher order nonlinear or-dinary differential systems................................................... . . . . 45 (1993), 259–269
MICALI , Artibano: see CHEVALET, Claude, GILLOIS, Michel and MI-CALI , Artibano, 31 (1979), 127–138
MICHEL, Anthony N.: see MILLER, Richard K. and MICHEL, AnthonyN., 32 (1980), 155–168
MIKI , Hiroo: A note on Maus’ theorem on ramification groups........... . . . . 29 (1977), 61– 68
MIKLYUKOV , Vladimir M. and VUORINEN, Matti: A boundary unique-ness theorem for Sobolev functions......................................... . . . . 50 (1998), 503–511
MILLER, Richard K. and MICHEL, Anthony N.: Stability theory forcountably infinite systems of differential equations...................... . . . . 32 (1980), 155–168
MIMACHI , Katsuhisa: Holonomicq-difference system associated withthe basic hypergeometric seriesn+1ϕn ..................................... . . . . 45 (1993), 485–490
MIMACHI , Katsuhisa and NOUMI, Masatoshi: An integral representationof eigenfunctions for Macdonald’sq-difference operators.............. . . . . 49 (1997), 517–525
MINAKAWA , Hiroyuki: Piecewise linear homeomorphisms of a circle andfoliations........................................................................ . . . . 43 (1991), 69– 74
MINAKAWA , Hiroyuki: see MATSUDA, Kouichi and MINAKAWA , Hi-royuki, 46 (1994), 71–82
MING, R. Yue Chi: A note on singular ideals................................. . . . . 21 (1969), 337–342
MISHRA, Mahendra Nath:see NAYAK , Chanchala, PATTANAYAK , Swad-heenananda and MISHRA, Mahendra Nath, 39 (1987), 1–15
MISONOU, Y.: see FUKAMIYA , M., MISONOU, Y. and TAKEDA, Z., 6(1954), 89–93
MISONOU, Yosinao and NAKAMURA , Masahiro: Centering of an opera-tor algebra...................................................................... . . . . . 3 (1951), 243–248
MISONOU, Yosinao: On a weakly central operator algebra................ . . . . . 4 (1952), 194–202
MISONOU, Yosinao: On the direct product ofW ∗-algebras................ . . . . . 6 (1954), 189–204
MISONOU, Yosinao: Generalized approximately finiteW ∗-algebras. . . . . . . . . . 7 (1955), 192–205
MISONOU, Yosinao: On divisors of factors................................... . . . . . 8 (1956), 63– 69
MISRA, B.: see MOHANTY, R. and MISRA, B., 6 (1954), 5–12
MIURA, Yasuhide: A note on the von Neumann algebra with a cyclic andseparating vector............................................................... . . . . 29 (1977), 77– 80
MIYACHI , Akihiko: Products of distributions inHp spaces................ . . . . 35 (1983), 483–498
50 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
MIYADERA, Isao: Generation of a strongly continuous semi-group oper-ators.............................................................................. . . . . . 4 (1952), 109–114
MIYADERA, Isao: On the generation of a strongly ergodic semi-group ofoperators........................................................................ . . . . . 6 (1954), 38– 52
MIYADERA, Isao: On the generation of strongly ergodic semi-groups ofoperators II..................................................................... . . . . . 6 (1954), 231–242
MIYADERA, Isao: Errata : On the generation of a strongly ergodic semi-group of operators............................................................. . . . . . 6 (1954), 277
MIYADERA, Isao: On the representation theorem by the Laplace transfor-mation of vector-valued functions........................................... . . . . . 8 (1956), 170–180
MIYADERA, Isao: A note on contraction semi-groups of operators....... . . . . 11 (1959), 98–105
MIYADERA, Isao: Semi-groups of operators in Fréchet space and appli-cations to partial differential equations..................................... . . . . 11 (1959), 162–183
MIYADERA, Isao: On perturbation theory for semi-groups of operators. . . . . 18 (1966), 299–310
MIYADERA, Isao: On the convergence of nonlinear semi-groups......... . . . . 21 (1969), 221–236
MIYADERA, Isao and OHARU, Shinnosuke: Approximation of semi-groups of nonlinear operators................................................ . . . . 22 (1970), 24– 47
MIYADERA, Isao: Some remarks on semi-groups of nonlinear operators. . . . 23 (1971), 245–258
MIYADERA, Isao: On the generation of semi-groups of linear operators. . . . . 24 (1972), 251–261
MIYAKE , Katsuya: On the structure of the idele groups of algebraic num-ber fields, II..................................................................... . . . . 34 (1982), 101–112
MIYAKE , Katsuya: Somep-groups with two generators which satisfy cer-tain conditions arising from arithmetic in imaginary quadratic fields. . . . . 44 (1992), 443–469
MIYAKE , Masatake: Remarks on the formulation of the Cauchy problemfor general system of ordinary differential equations.................... . . . . 32 (1980), 79– 89
MIYAKE , Masatake: Characterizations of the well posed Cauchy problemfor a system in a complex domain........................................... . . . . 42 (1990), 231–259
MIYAMOTO, Ikuko: A type of uniqueness of solutions for the Dirichletproblem on a cylinder......................................................... . . . . 48 (1996), 267–292
MIYANISHI , Masayoshi:see GURJAR, Rajendra Vasant and MIYANISHI ,Masayoshi, 48 (1996), 459–469
MIYAOKA , Reiko: The splitting and deformations of the generalizedGauss map of compact CMC surfaces...................................... . . . . 51 (1999), 35– 53
MIYATA , Takehiko: A normal integral basis theorem for dihedral groups. . . . 32 (1980), 49– 62
MIYAZAKI , Hiroshi: On the Klein’s Geometry............................... . . . . . 2 (1951), 286–291
MIYAZAKI , Hiroshi: On covering homotopy theorems..................... . . . . . 4 (1952), 80– 87
MIYAZAKI , Hiroshi: A note on paracompact spaces........................ . . . . . 4 (1952), 88– 92
MIYAZAKI , Hiroshi: The paracompactness of CW-complexes............ . . . . . 4 (1952), 309–313
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 51
MIYAZAKI , Hiroshi: The cohomotopy and uniform cohomotopy groups. . . . . 5 (1953), 83–103
MIYAZAKI , Hiroshi: On generalizations of Hopf’s classification theo-rems.............................................................................. . . . . . 5 (1954), 284–289
MIYAZAKI , Hiroshi: On realizations of some Whitehead products. . .. . . . . . . . 12 (1960), 1– 30
MIYAZAKI , Hiroshi: see IWATA, Kôichi and MIYAZAKI , Hiroshi, 12(1960), 130–138
MIYAZAKI , Hiroshi: Correction : On realizations of some Whiteheadproducts (This Journal, vol. 12 pp 1–30.................................... . . . . 12 (1960), 480
MIYAZAKI , Takuya and ODA, Takayuki: Principal series Whittaker func-tions onSp(2; R), II .......................................................... . . . . 50 (1998), 243–260
MIZUHARA, Takahiro: On Fourier multipliers of Lipschitz classes....... . . . . 24 (1972), 263–268
MIZUSAWA, Hideo: On infinitesimal holomorphically projective trans-formations in∗O-spaces...................................................... . . . . 13 (1961), 466–480
MIZUTANI , Tadayoshi:see SATO, Hajime and MIZUTANI , Tadayoshi, 36(1984), 159–174
MO, Xiaokang: see CHI, Quo-Shin and MO, Xiaokang, 44 (1992), 83–101
MOCHIZUKI, Nozomu: On fully complete spaces........................... . . . . 13 (1961), 485–490
MOCHIZUKI, Nozomu: A characterization of the algebra of generalizedanalyitc functions.............................................................. . . . . 16 (1964), 313–319
MOCHIZUKI, Nozomu: The tensor product of function algebras.......... . . . . 17 (1965), 139–146
MOCHIZUKI, Nozomu: Isometry betweenHp(dm) and the Hardy classHp ............................................................................... . . . . 18 (1966), 311–315
MOCHIZUKI, Nozomu: A note on the Choquet boundary of a restrictedfunction algebra................................................................ . . . . 18 (1966), 316–317
MOCHIZUKI, Nozomu: Correction: Isometry betweenHp(dm) and theHardy classHp ................................................................ . . . . 19 (1967), 379
MOCHIZUKI, Nozomu: see HASUMI, Morisuke and MOCHIZUKI, No-zomu, 33 (1981), 493–501
MOCHIZUKI, Nozomu: Inequalities of Fejér-Riesz type for holomorphiefunctions on certain product domains...................................... . . . . 34 (1982), 367–372
MOCHIZUKI, Nozomu: A class of subharmonic functions and integralinequalities...................................................................... . . . . 35 (1983), 475–482
MOCHIZUKI, Nozomu: The Fejér-Riesz inequality for Siegel domains. . . . . . 36 (1984), 581–590
MOCHIZUKI, Nozomu: Fejér-Riesz inequalities for lower dimensionalsubspaces....................................................................... . . . . 38 (1986), 433–439
MOCHIZUKI, Nozomu: Inequalities of Fejér-Riesz and Hardy-Littlewood ...................................................................... . . . . 40 (1988), 77– 86
MOCHIZUKI, Nozomu: Positive kernel functions and Bergman spaces. . . . . . 40 (1988), 473–483
52 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
MOHANTY, R. and MISRA, B.: On absolute logarithmic summability ofa sequence related to a Fourier series....................................... . . . . . 6 (1954), 5– 12
MOHANTY, R. and IZUMI , Shin-ichi: On the absolute logarithmicsummability of Fourier series of order one................................ . . . . . 8 (1956), 201–204
MOLINO, Pierre: see ALMEIDA , Rui and MOLINO, Pierre, 38 (1986),313–326
MONTIEL, Sebastián: A characterization of hyperbolic cylinders in thede Sitter space.................................................................. . . . . 48 (1996), 23– 31
MOODY, Robert V.: Polynomial invariants of isometry groups of indefi-nite quadratic lattices.......................................................... . . . . 30 (1978), 525–535
MORI, Hiroshi: On the decomposition of generalizedK-curvature tensorfields............................................................................. . . . . 25 (1973), 225–235
MORI, Hiroshi: Rotational surfaces in a pseudo-Riemannian 3-sphere... . . . . 38 (1986), 29– 36
MORI, Seiki: Order of composite functions of integral functions. .. . .. . .. . . . . 22 (1970), 462–479
MORI, Seiki: Sum of deficiencies and the order of a meromorphic func-tion ............................................................................... . . . . 22 (1970), 659–669
MORI, Seiki: The deficiencies of a composite function of integral func-tions.............................................................................. . . . . 23 (1971), 719–725
MORI, Seiki: An example on defect of a composite function.............. . . . . 24 (1972), 269–274
MORI, Seiki: On the deficiencies of meromorphic functions............... . . . . 28 (1976), 443–457
MORI, Seiki: The deficiencies and the order of holomorphic mappings ofCn into a compact complex manifold...................................... . . . . 31 (1979), 285–291
MORI, Seiki: Another proof of Stoll’s theorem for moving targets. . . . . . . . . . . 41 (1989), 619–624
MÓRICZ, Ferenc: Approximation by partial sums and Cesáro means ofmultiple orthogonal series.................................................... . . . . 35 (1983), 519–539
MORIMOTO, Akihiko: On normal almost contact structures with a regu-larity ............................................................................. . . . . 16 (1964), 90–104
MORIMOTO, Hiroaki: On the absolute continuity of measures relative toa Poisson measure............................................................. . . . . 31 (1979), 57– 62
MORIMOTO, Hiroaki: Existence of optimal martingales.................... . . . . 31 (1979), 293–299
MORIMOTO, Hiroaki: The dual space of the space BMO for a stochasticpoint process................................................................... . . . . 31 (1979), 519–524
MORIMOTO, Hiroaki: Optimal stopping and a martingale approach to thepenalty method................................................................. . . . . 34 (1982), 407–416
MORIMOTO, Hiroaki: Optimal switching problems of tandem type. . . . . . . . . . 35 (1983), 119–128
MORIMOTO, Hiroaki and IZUMISAWA, Masataka: Nonlinear semigroupsand a characterization of the value process in stochastic control....... . . . . 35 (1983), 503–511
MORIMOTO, Shigeru:see AZUKAWA , Kazuo and MORIMOTO, Shigeru,44 (1992), 69–81
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 53
MORITA, Jun: Root strings with three or four real roots in Kac-Moodyroot systems.................................................................... . . . . 40 (1988), 645–650
MORITA, Jun and REHMANN, Ulf: A Matsumoto-type theorem for Kac-Moody groups.................................................................. . . . . 42 (1990), 537–560
MORITA, Yasuo:see SCHIKHOF, Win H. and MORITA, Yasuo, 38 (1986),387–397
MORITA, Yasuo and SATO, Atsushi: Distribution of rational points onhyperelliptic surfaces.......................................................... . . . . 44 (1992), 345–358
MORITA, Yasuo: Remarks on a conjecture of Batyrev and Manin. . . . . . . . . . . . 49 (1997), 437–448
MORITOH, Shinya: Wavelet transforms in Euclidean spaces —their rela-tion with wave front sets and Besov, Triebel-Lizorkin spaces—. . . . . . . . . . . 47 (1995), 555–565
MOROSAWA, Shunsuke and NAKADA , Masami: The Nielsen develop-ment and transitive points under a certain Fuchsian group.............. . . . . 37 (1985), 107–123
MOROSAWA, Shunsuke: A property of transitive points under Fuchsiangroups........................................................................... . . . . 40 (1988), 153–158
MOROSAWA, Shunsuke: Invariant subsets of the limit set for a Fuchsiangroup............................................................................ . . . . 42 (1990), 429–437
MOSCOVICI, Henri: The signature with local coefficients of locally sym-metric spaces................................................................... . . . . 37 (1985), 513–522
MOTOMIYA, Kanji: A study on almost contact manifolds.................. . . . . 20 (1968), 73– 90
MOTOMIYA, Kanji: see KATO, Touru and MOTOMIYA, Kanji, 21 (1969),1–20
MOZO FERNÁNDEZ, Jorge: Cohomology theorems for asymptoticsheaves.......................................................................... . . . . 51 (1999), 447–460
MUKOYAMA , Kazuo: Actions of compact connected Lie groups on sim-ply connected rational cohomology 5-spheres............................ . . . . 41 (1989), 117–131
MUKOYAMA , Kazuo: SmoothSp(2,R)-actions on the 4-sphere.......... . . . . 48 (1996), 543–560
MUNDICI, Daniele:see AGUZZOLI, Stefano and MUNDICI, Daniele, 46(1994), 557–572
MURABAYASHI , Naoki: see HASHIMOTO, Ki-ichiro andMURABAYASHI , Naoki, 47 (1995), 271–296
MURAI, Takafumi: Lacunary series and ranges of non-synthesis. . . . . . . . . . . . . 34 (1982), 289–294
MURAI, Takafumi:see COIFMAN, Ronald R. and MURAI, Takafumi, 40(1988), 397–407
MURAKAMI , Satoru: Asymptotic behavior of solutions of ordinary dif-ferential equations............................................................. . . . . 34 (1982), 559–574
MURAKAMI , Satoru: Stability of a mechanical system with unboundeddissipative forces............................................................... . . . . 36 (1984), 401–406
MURAKAMI , Satoru: Stability in functional differential equations withinfinite delay.................................................................... . . . . 37 (1985), 561–570
54 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
MURAKAMI , Satoru: Almost periodic solutions of a system of integrod-ifferential equations........................................................... . . . . 39 (1987), 71– 79
MURAKAMI , Satoru and YOSHIZAWA, Taro: Relationships between BC-stabilities andρ-stabilities in functional differential equations with in-finite delay...................................................................... . . . . 44 (1992), 45– 57
MURAKAMI , Satoru: see HINO, Yoshiyuki, MURAKAMI , Satoru andYOSHIZAWA, Taro, 49 (1997), 133–147
MURALEEDHARAN, Thettath K. and PARTHASARATHY, Krishnan: Dif-ference spectrum and spectral synthesis.................................... . . . . 51 (1999), 65– 73
MURAMATU, Tosinobu:see FUKUMA , Seiji and MURAMATU, Tosinobu,51 (1999), 193–203
MURASE, Atsushi: A uniformity of distribution ofGQ in GA ............. . . . . 35 (1983), 137–153
MURASE, Atsushi and SUGANO, Takashi: Shintani functions and auto-morphicL-functions forGL(n) ............................................. . . . . 48 (1996), 165–202
MURATA, Minoru: Large time asymptotics for fundamental solutions ofdiffusion equations............................................................ . . . . 37 (1985), 151–195
MURO, Masakazu: Invariant hyperfunctions on regular prehomogeneousvector spaces of commutative parabolic type.............................. . . . . 42 (1990), 163–193
MURO, Masakazu: Singular invariant hyperfunctions on the space of realsymmetric matrices............................................................ . . . . 51 (1999), 329–364
MUTO, Hideo: The first eigenvalue of the Laplacian on even dimensionalspheres.......................................................................... . . . . 32 (1980), 427–432
MUTO, Hideo, OHNITA, Yoshihiro and URAKAWA , Hajime: Homoge-neous minimal hypersurfaces in the unit spheres and the first Eigenval-ues of their Laplacian......................................................... . . . . 36 (1984), 253–267
MUTÔ, Yosio: Some Properties of a Riemannian Space Admitting a Sim-ply Transitive Group of Translations....................................... . . . . . 2 (1951), 205–213
MUTÔ, Yosio: On convex mapping............................................ . . . . . 7 (1955), 141–145
MUTO, Yosio: On linear Lie algebras II....................................... . . . . 12 (1960), 301–326
MUTO, Yosio: On some almost Kählerian spaces............................ . . . . 14 (1962), 344–362
MUTO, Yosio: On some systems of partial differential equations.. ....... . . . . 16 (1964), 345–367
MUTO, Yosio: see YANO, Kentaro and MUTO, Yosio, 25 (1973), 111–127
MUTO, Yosio: Some critical mappings........................................ . . . . 25 (1973), 487–498
MUTO, Yosio: Index of some Gauss-critical submanifolds................. . . . . 30 (1978), 561–573
MUTO, Yosio: On spherical representation of anm-dimensional subman-ifold in the Euclideann-space............................................... . . . . 35 (1983), 65– 76
NADLER, Sam B., Jr.: Differentiable retractions in Banach spaces........ . . . . 19 (1967), 400–405
NAGAMI , Keiô: Hereditary properties of product spaces................... . . . . 21 (1969), 39– 46
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 55
NAGANO, Tadashi: Sur des hypersurfaces et quelques groupesd’isométries d’un espace riemannien....................................... . . . . 10 (1958), 242–252
NAGASAWA, Takeyuki:Lp,q -estimates for certain semi-linear parabolicequations........................................................................ . . . . 41 (1989), 597–608
NAGASAWA, Takeyuki: The set of solutions for certain semilinear heatequations........................................................................ . . . . 47 (1995), 99–103
NAGAYOSHI, Takatoshi and TSUKAMOTO, Yôtarô: On positively curvedRiemannian manifolds with bounded volume............................. . . . . 25 (1973), 213–218
NAGY, P. T.: On the tangent sphere bundle of a Riemannian 2-manifold. . . . 29 (1977), 203–208
NAITO, Hisashi, KOZONO, Hideo and MAEDA, Yoshiaki: A stable man-ifold theorem for the Yang-Mills gradient flow........................... . . . . 42 (1990), 45– 66
NAITO, Hirotada: Thep-adic HurwitzL-functions......................... . . . . 34 (1982), 553–558
NAITO, Satoshi: Kostant’s formula for a certain class of generalized Kac-Moody algebras................................................................ . . . . 44 (1992), 567–580
NAITO, Tadao: Lattices withP -ideal topologies............................. . . . . 12 (1960), 235–262
NAITO, Toshiki: On the uniqueness of solutions in the hull................ . . . . 25 (1973), 383–389
NAITO, Toshiki: Adjoint equations of autonomous linear functional dif-ferential equations with infinite retardations............................... . . . . 28 (1976), 135–143
NAITO, Toshiki: Fundamental matrices of linear autonomous retardedequations with infinite delay................................................. . . . . 32 (1980), 539–556
NAITO, Toshiki: A modified form of the variation-of-constants formulafor equations with infinite delay............................................. . . . . 36 (1984), 33– 40
NAITO, Toshiki: see SHIN, Jong Son and NAITO, Toshiki, 51 (1999),555–583
NAKADA , Masami: Remark on the number of components of finitelygenerated function groups.................................................... . . . . 27 (1975), 99–102
NAKADA , Masami: Surjectivity of the Bers map............................ . . . . 28 (1976), 257–266
NAKADA , Masami: Quasi-conformal stability of finitely generated func-tion groups...................................................................... . . . . 30 (1978), 45– 58
NAKADA , Masami: Dimension of cohomology spaces of infinitesimallydeformed Kleinian groups.................................................... . . . . 31 (1979), 187–194
NAKADA , Masami:see MOROSAWA, Shunsuke and NAKADA , Masami,37 (1985), 107–123
NAKADA , Masami: The exponent of convergence of Poincaré series as-sociated with some discontinuous groups.................................. . . . . 40 (1988), 413–423
NAKAGAWA , H. and SHIOHAMA , K.: On Riemannian manifolds withcertain cut loci II............................................................... . . . . 22 (1970), 357–361
NAKAGAWA , Hisao and SHIOHAMA , Katsuhiro: On Riemannian mani-folds with certain cut loci..................................................... . . . . 22 (1970), 14– 23
56 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
NAKAGAWA , Hisao: see ITOH, Takehiro and NAKAGAWA , Hisao, 25(1973), 445–450
NAKAGAWA , Hisao:see KI, U-Hang and NAKAGAWA , Hisao, 39 (1987),27–40
NAKAGAWA , Hisao and TAKAGI , Ryoichi: Harmonic foliations on acompact Riemannian manifold of non-negative constant curvature.... . . . . 40 (1988), 465–471
NAKAGAWA , Jin: On the Stark-Shintani conjecture and cyclotomicZp-extensions of class fields over real quadratic fields II.................... . . . . 36 (1984), 439–452
NAKAGAWA , Jin: Class numbers of quadratic extensions of algebraicnumber fields................................................................... . . . . 38 (1986), 245–257
NAKAGAWA , Kiyokazu: On the analyticity of the solutions of the Navier-Stokes equations............................................................... . . . . 33 (1981), 177–192
NAKAGAWA , Kiyokazu: Behavior of solutions for the linearized Navier-Stokes equations with vanishing viscosity................................. . . . . 39 (1987), 17– 25
NAKAGAWA , Yasuhiro: Einstein-Kähler toric Fano fourfolds.............. . . . . 45 (1993), 297–310
NAKAGAWA , Yasuhiro: Classification of Einstein-Kähler toric Fano four-folds ............................................................................. . . . . 46 (1994), 125–133
NAKAI , Mitsuru: The equation�u = Pu on Em with almost rotationfreep ≥ 0 ....................................................................... . . . . 23 (1971), 413–431
NAKAI , Mitsuru: Densities without Evans solutions........................ . . . . 26 (1974), 363–370
NAKAI , Mitsuru: Picard principle and Riemann theorem................... . . . . 28 (1976), 277–292
NAKAI , Mitsuru and SEGAWA, Shigeo: On a subsurface of Tôki surface. . . . 28 (1976), 591–600
NAKAI , Mitsuru: see GLASNER, Moses and NAKAI , Mitsuru, 33 (1981),91–101
NAKAI , Mitsuru: see HARA, Masaru and NAKAI , Mitsuru, 37 (1985),225–240
NAKAJIMA , F.: Existence of almost periodic solutions by Liapunov func-tions.............................................................................. . . . . 27 (1975), 69– 74
NAKAJIMA , Fumio: Separation conditions and stability properties in al-most periodic systems......................................................... . . . . 26 (1974), 305–314
NAKAJIMA , Fumio:see KATO, Junji and NAKAJIMA , Fumio, 28 (1976),79–88
NAKAJIMA , Fumio: see SELL, George R. and NAKAJIMA , Fumio, 32(1980), 255–263
NAKAJIMA , Fumio: Ultimate boundedness of solutions for a generalizedLiénard equation with forcing term......................................... . . . . 46 (1994), 295–310
NAKAJIMA , Haruhisa: Affine torus embeddings which are complete in-tersections....................................................................... . . . . 38 (1986), 85– 98
NAKAMURA , Gen and SASAI, Takao: The singularities of the solutionsof the Cauchy problem for second order equations in case the initialmanifold includes characteristic points..................................... . . . . 28 (1976), 523–539
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 57
NAKAMURA , Iku: On surfaces of class VII0 with curves, II............... . . . . 42 (1990), 475–516
NAKAMURA , Iku: see ALEXEEV, Valery and NAKAMURA , Iku, 51(1999), 399–420
NAKAMURA , M., TAKEDA, Z. and TURUMARU, T.: On some extendedprincipal axis theorems for completely continuous operators........... . . . . . 5 (1953), 190–193
NAKAMURA , Masahiro: Notes on Banach Space (VIII): A generalizationof Silov’s theorem............................................................. . . . . . 1 (1949), 66– 68
NAKAMURA , Masahiro: Notes on Banach Space (X): Vitali-Hahn-Saks’theorem and K-spaces......................................................... . . . . . 1 (1949), 100–108
NAKAMURA , Masahiro: Notes on Banach Space (XI): Banach Latticeswith Positive Bases............................................................ . . . . . 2 (1950), 135–141
NAKAMURA , Masahiro: Notes on Banach Space (XII): A Remark on aTheorem of Gelfand and Neumark.......................................... . . . . . 2 (1950), 182–187
NAKAMURA , Masahiro and TAKEDA, Zirô: Group repesentation and Ba-nach limit....................................................................... . . . . . 3 (1951), 132–135
NAKAMURA , Masahiro: see MISONOU, Yosinao and NAKAMURA ,Masahiro, 3 (1951), 243–248
NAKAMURA , Masahiro and TURUMARU, Takasi: On the representationsof positive definite functions and stationary functions on a topologicalgroup............................................................................ . . . . . 4 (1952), 1– 9
NAKAMURA , Masahiro and TAKEDA, Zirô: The Radon-Nikodym theo-rem of traces for a certain operator algebra................................ . . . . . 4 (1952), 275–283
NAKAMURA , Masahiro and TURUMARU, Takasi: Simple algebras ofcompletely continuous operators............................................ . . . . . 4 (1952), 303–308
NAKAMURA , Masahiro and TAKEDA, Zirô: Normal states of commuta-tive operator algebras......................................................... . . . . . 5 (1953), 109–121
NAKAMURA , Masahiro and TURUMARU, Takasi: Completely continuousoperators with propertyF .................................................... . . . . . 6 (1954), 174–176
NAKAMURA , Masahiro and TURUMARU, Takasi: Expectations in an op-erator algebra................................................................... . . . . . 6 (1954), 182–188
NAKAMURA , Masahiro: On the direct product of finite factors............ . . . . . 6 (1954), 205–207
NAKAMURA , Masahiro and TURUMARU, Takasi: On extensions of purestates of an abelian operator algebra........................................ . . . . . 6 (1954), 253–257
NAKAMURA , Yukio: see GOTO, Shiro and NAKAMURA , Yukio, 46(1994), 573–586
NAKANISHI , Akio and UCHIDA, Fuichi: Actions of symplectic groupson certain manifolds........................................................... . . . . 36 (1984), 81– 98
NAKANISHI , Toshihiro: The lengths of the closed geodesics on a Rie-mann surface with self-intersections........................................ . . . . 41 (1989), 527–541
NAKANISHI , Toshihiro: The inner radii of finite-dimensional Teichmüllerspaces............................................................................ . . . . 41 (1989), 679–688
58 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
NAKANO, Hidegorô: Hilbert algebras......................................... . . . . . 2 (1950), 4– 23
NAKANO, Shin: see KAWACHI , Mayumi and NAKANO, Shin, 44 (1992),557–565
NAKAO, Mitsuhiro: see KOZONO, Hideo and NAKAO, Mitsuhiro, 48(1996), 33–50
NAKATA , Saburô: On the divergence of rearranged Walsh series. . . . . . . . . . . . . 24 (1972), 275–280
NAKATA , Saburô: On the divergence of rearranged Walsh series II....... . . . . 26 (1974), 407–410
NAKATA , Saburô: On the divergence of rearranged trigonometric series. . . . . 27 (1975), 241–246
NAKAUCHI , Nobumitsu: Concentration compactness of a space of non-linearp-harmonic functions................................................. . . . . 45 (1993), 285–295
NAKAUCHI , Nobumitus: Supplement: Concentration compactness of aspace of nonlinearp-harmonic functions.................................. . . . . 45 (1993), 607
NAKAYAMA , Noboru: see FURUSHIMA, Mikio and NAKAYAMA ,Noboru, 41 (1989), 543–560
NAKAZI , Takahiko: Exposed points and extremal problems inH 1, II .... . . . . 37 (1985), 265–269
NAKAZI , Takahiko: Norms of Hankel operators and uniform algebras, II. . . . 39 (1987), 543–555
NAMBA , Makoto: On automorphism groups of some contact Riemannianmanifolds....................................................................... . . . . 20 (1968), 91–100
NAMBA , Makoto: On maximal families of compact complex submani-folds of complex manifolds.................................................. . . . . 24 (1972), 581–609
NAMBA , Makoto: On maximal families of compact complex submani-folds of complex fiber spaces................................................ . . . . 25 (1973), 237–262
NAMBA , Makoto: Automorphism groups of Hopf surfaces................ . . . . 26 (1974), 133–157
NAMBA , Makoto: On deformations of automorphism groups of compactcomplex manifolds............................................................ . . . . 26 (1974), 237–283
NAMBA , Makoto: On stability of holomorphic maps of compact complexmanifolds....................................................................... . . . . 27 (1975), 479–486
NAMBA , Makoto: A class of differential equations of Fuchsian type..... . . . . 39 (1987), 391–406
NARUKI , Isao: On extendibility of isomorphisms of Cartan connectionsand biholomorphie mappings of bounded domains....................... . . . . 28 (1976), 117–122
NARUKI , Isao: see KOBAYASHI, Ryoichi, KUSHIBIKI , Keiko andNARUKI , Isao, 41 (1989), 633–646
NASTASESCU, Constantin: La structure des modules par rapport à unetopologie additive.............................................................. . . . . 26 (1974), 173–201
NASU, Yasuo: On the torse-forming directions in Finsler spaces.......... . . . . . 4 (1952), 99–102
NASU, Yasuo: On asymptotic conjugate points.............................. . . . . . 7 (1955), 157–165
NASU, Yasuo: On angular measure in a metric space....................... . . . . . 8 (1956), 1– 12
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 59
NASU, Yasuo: On asymptotes in a metric space with non-positive curva-ture............................................................................... . . . . . 9 (1957), 68– 95
NAYAK , Chanchala, PATTANAYAK , Swadheenananda and MISHRA, Ma-hendra Nath: Random Fourier-Stieltjes series associated with stableprocess.......................................................................... . . . . 39 (1987), 1– 15
NEHER, Erhard: see DORFMEISTER, Josef and NEHER, Erhard, 35(1983), 187–224
NEHER, Erhard: see DORFMEISTER, Josef and NEHER, Erhard, 35(1983), 225–247
NESSEL, R. J.:see BUTZER, P. L., NESSEL, R. J. and TREBELS, W., 24(1972), 127–140
NESSEL, R. J.:see BUTZER, P. L., NESSEL, R. J. and TREBELS, W., 24(1972), 551–569
NESSEL, R. J.:see BUTZER, P. L., NESSEL, R. J. and TREBELS, W., 27(1975), 213–223
NIINO, Kiyoshi: Analytic mappings between two regularly branchedthree-sheeted algebroid surfaces............................................. . . . . 39 (1987), 313–328
NISHIKAWA , Seiki: Transnormal hypersurfaces: Generalized constantwidth for Riemannian manifolds............................................ . . . . 25 (1973), 451–459
NISHIKAWA , Seiki and MAEDA, Yoshiaki: Conformally flat hypersur-faces in a conformally flat Riemannian manifold......................... . . . . 26 (1974), 159–168
NISHIKAWA , Seiki: Conformally flat hypersurfaces in a Euclidean space. . . . 26 (1974), 563–572
NISHIKAWA , Seiki: The Gauss map of Kaehler immersions............... . . . . 27 (1975), 453–460
NISHIKAWA , Seiki and TAKEUCHI, Masaru:�-foliations and semisimpleflat homogeneous spaces..................................................... . . . . 30 (1978), 307–335
NISHIKAWA , Seiki and TONDEUR, Philippe: Transversal infinitesimalautomorphisms for harmonic Kähler foliations........................... . . . . 40 (1988), 599–611
NISHIKAWA , Seiki: see AKUTAGAWA , Kazuo and NISHIKAWA , Seiki, 42(1990), 67–82
NISHIMORI, Toshiyuki: Compact leaves with Abelian holonomy......... . . . . 27 (1975), 259–272
NISHIMORI, Toshiyuki: Behaviour of leaves of codimension-one folia-tions.............................................................................. . . . . 29 (1977), 255–273
NISHIMORI, Toshiyuki: Ends of leaves of codimension-one foliations... . . . . 31 (1979), 1– 22
NISHIMORI, Toshiyuki: SRH-decompositions of codimension-one folia-tions and the Godbillon-Vey classes........................................ . . . . 32 (1980), 9– 34
NISHIMORI, Toshiyuki: Octahedral webs on closed manifolds............ . . . . 32 (1980), 399–410
NISHIMORI, Toshiyuki: Existence problem of transverse foliations forsome foliated 3-manifolds.................................................... . . . . 34 (1982), 179–238
NISHIMURA, Toshio: Remarks on the metrization problem................ . . . . . 1 (1950), 225–228
60 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
NISHIO, Katsuyoshi:see ANDO, Tsuyoshi and NISHIO, Katsuyoshi, 22(1970), 65–75
NISHIOKA, Kumiko: Algebraic independence of Mahler functions andtheir values...................................................................... . . . . 48 (1996), 51– 70
NISHISHIRAHO, Toshihiko: Saturation of positive linear operators....... . . . . 28 (1976), 239–243
NISHISHIRAHO, Toshihiko: The degree of convergence of positive linearoperators........................................................................ . . . . 29 (1977), 81– 89
NISHISHIRAHO, Toshihiko: Saturation of bounded linear operators...... . . . . 30 (1978), 69– 81
NISHISHIRAHO, Toshihiko: Quantitative theorems on linear approxima-tion processes of convolution operators in Banach spaces............... . . . . 33 (1981), 109–126
NISHISHIRAHO, Toshihiko: Saturation of multiplier operators in Banachspaces............................................................................ . . . . 34 (1982), 23– 42
NISHISHIRAHO, Toshihiko: Convergence of positive linear approxima-tion processes.................................................................. . . . . 35 (1983), 441–458
NISHISHIRAHO, Toshihiko: The order of approximation by positive lin-ear operators.................................................................... . . . . 40 (1988), 617–632
NISHISHIRAHO, Toshihiko: The degree of the best approximation in Ba-nach spaces..................................................................... . . . . 46 (1994), 13– 26
NISHIYAMA , Ken-ichi: The minimal height of Jacobian fibrations onK3surfaces.......................................................................... . . . . 48 (1996), 501–517
NITTA, Takashi: Vector bundles over quaternionic Kähler manifolds..... . . . . 40 (1988), 425–440
NKASHAMA , M. N.: see HADDOCK, John R., NKASHAMA , M. N. andWU, Jianhong, 41 (1989), 689–710
NOGUCHI, Hiroshi: A note on absolute neighborhood retracts............ . . . . . 4 (1952), 93– 95
NOGUCHI, Hiroshi: On isotopy. I.............................................. . . . . . 5 (1953), 104–108
NOMA, Atsushi: Gorenstein toric singularities and convex polytopes. . . . . . . . 43 (1991), 529–535
NOMIZU, Katsumi and GOTÔ, Morikuni: On the group of automorphismsof a topological group......................................................... . . . . . 2 (1950), 47– 50
NOMIZU, Katsumi: On Frenet equations for curves of classC∞ .......... . . . . 11 (1959), 106–112
NOMIZU, Katsumi: On hypersurfaces satisfying a certain condition onthe curvature tensor............................................................ . . . . 20 (1968), 46– 59
NOMIZU, Katsumi: Generalized central spheres and the notion of spheresin Riemannian geometry...................................................... . . . . 25 (1973), 129–137
NOMIZU, Katsumi: Uniqueness of the normal connections and congru-ence of isometric immersions................................................ . . . . 28 (1976), 613–617
NOMIZU, Katsumi: Kinematics and differential geometry of submani-folds ............................................................................. . . . . 30 (1978), 623–637
NOMIZU, Katsumi: see HANO, Jun-ichi and NOMIZU, Katsumi, 36(1984), 427–437
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 61
NOMIZU, Katsumi and PINKALL , Ulrich: On a certain class of homoge-neous projectively flat manifolds............................................ . . . . 39 (1987), 407–427
NOMIZU, Katsumi and PINKALL , Ulrich: Cayley surfaces in affine dif-ferential geometry............................................................. . . . . 41 (1989), 589–596
NOMIZU, Katsumi: see BOKAN, Neda, NOMIZU, Katsumi and SIMON,Udo, 42 (1990), 101–108
NOMIZU, Katsumi and SASAKI , Takeshi: On certain quartic forms foraffine surfaces.................................................................. . . . . 44 (1992), 25– 33
NOMIZU, Katsumi and OPOZDA, Barbara: On normal and conormalmaps for affine hypersurfaces................................................ . . . . 44 (1992), 425–431
NOMIZU, Katsumi and SASAKI , Takeshi: Globally defined linear con-nections on the real line and the circle...................................... . . . . 51 (1999), 205–212
NOUMI, Masatoshi:see MIMACHI , Katsuhisa and NOUMI, Masatoshi,49 (1997), 517–525
OAKU, Toshinori: Gröbner bases forD-modules on a non-singular affinealgebraic variety............................................................... . . . . 48 (1996), 575–600
OBATA, Morio: see ISHIHARA, Shigeru and OBATA, Morio, 7 (1955),146–150
OBATA, Morio: Hermitian manifolds with quaternion structure........... . . . . 10 (1958), 11– 18
OBATA, Morio: A non-compact Riemannian manifold admitting a transi-tive group of conformorphisms.............................................. . . . . 25 (1973), 553–556
OCHIAI , Takushiro:see KOBAYASHI, Shoshichi and OCHIAI , Takushiro,34 (1982), 587–629
ODA, Tadao:see ISHIDA, Masa-Nori and ODA, Tadao, 33 (1981), 337–381
ODA, Tadao and PARK, Hye Sook: Linear Gale transforms and Gelfand-Kapranov-Zelevinskij decompositions..................................... . . . . 43 (1991), 375–399
ODA, Tadao: The algebraic de Rham theorem for toric varieties.......... . . . . 45 (1993), 231–247
ODA, Takayuki: An explicit integral representation of Whittaker func-tions onSp(2; R) for the large discrete series representations.......... . . . . 46 (1994), 261–279
ODA, Takayuki:see MIYAZAKI , Takuya and ODA, Takayuki, 50 (1998),243–260
ODLYZKO, A. M.: Lower bounds for discriminants of number fields. II. . . . . 29 (1977), 209–216
OGATA, Shoetsu: Special values of zeta functions associated to cusp sin-gularities........................................................................ . . . . 37 (1985), 367–384
OGATA, Shoetsu: Infinitesimal deformations of Tsuchihashi’s cusp sin-gularities........................................................................ . . . . 38 (1986), 269–279
OGATA, Shoetsu: Infinitesimal deformations of generalized cusp singu-larities........................................................................... . . . . 39 (1987), 237–248
62 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
OGATA, Takashi: Minimal surfaces in a sphere with Gaussian curvaturenot less than 1/6 ............................................................... . . . . 37 (1985), 553–560
OGATA, Takashi: Curvature pinching theorem for minimal surfaces withconstant Kaehler angle in complex projective spaces.................... . . . . 43 (1991), 361–374
OGATA, Takashi: Curvature pinching theorem for minimal surfaces withconstant Kaehler angle in complex projective spaces, II................. . . . . 45 (1993), 271–283
OGAWA, Hisasi: The reduction theorem of the relative cohomology groupin algebras, and its application............................................... . . . . 12 (1960), 155–170
OGAWA, Hisasi: On a duality of cohomology groups of Frobenius alge-bras.............................................................................. . . . . 13 (1961), 46– 65
OGAWA, Hisasi: On derived groups of normal simple algebra............. . . . . 14 (1962), 99–103
OGAWA, Shigeyoshi: Une remarque sur l’approximation de l’integralestochastique du type noncausal par une suite des integrales de Stieltjes. . . . 36 (1984), 41– 48
OGAWA, Shigeyoshi: CORRECTION: Une remarque sur l’approximationde l’intégrale stochastique du type noncausal par une suite des inté-grales de Stieltjes.............................................................. . . . . 36 (1984), 483
OGAWA, Yosuke: see HATAKEYAMA , Yoji, OGAWA, Yosuke andTANNO, Shukichi, 15 (1963), 42–48
OGAWA, Yosuke: Some properties on manifolds with almost contactstructures........................................................................ . . . . 15 (1963), 148–161
OGAWA, Yosuke: On principal torus bundles over homogeneous contactmanifold......................................................................... . . . . 16 (1964), 297–308
OGAWA, Yôsuke: On 5-demensional Sasaki-Einstein space with sectionalcurvature≥ 1/3 ................................................................ . . . . 19 (1967), 103–109
OGAWA, Yôsuke: OnC-harmonic forms in a compact Sasakian space. . . . . . 19 (1967), 267–296
OGAWA, Yôsuke: OnC-killing forms in a compact Sasakian space...... . . . . 19 (1967), 467–484
OGAWA, Yôsuke: On contravariantC-analytic 1-forms in a compactSasakian space................................................................. . . . . 20 (1968), 333–345
OGAWA, Yôsuke:see TACHIBANA , Shun-ichi and OGAWA, Yôsuke, 21(1969), 632–643
OGITSU, Noriko: see IWASAKI , Keiko and OGITSU, Noriko, 27 (1975),313–317
OGIUE, Koichi: Prolongations of pseudogroup structures to tangent bun-dles............................................................................... . . . . 21 (1969), 84– 91
OGIUE, Koichi: On compact complex submanifolds of the complex pro-jective space.................................................................... . . . . 22 (1970), 95– 97
OGIUE, Koichi: Positively curved complex hypersurfaces immersed in acomplex projective space..................................................... . . . . 24 (1972), 51– 54
OGIUE, Koichi: see SUN, Huafei and OGIUE, Koichi, 49 (1997), 423–429
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 63
OGUISO, Keiji and ZHANG, De-Qi: On extremal log Enriques surfaces,II ................................................................................. . . . . 50 (1998), 419–436
OHARU, S.: see TAKAHASHI , T. and OHARU, S., 24 (1972), 505–528
OHARU, Shinnosuke:see MIYADERA, Isao and OHARU, Shinnosuke, 22(1970), 24–47
OHKAWA , Tetsusuke: see KATO, Mitsuyoshi, KOJIMA, Sadayoshi,OHKAWA , Tetsusuke and YAMASAKI , Masayuki, 31 (1979), 525–535
OHKUMA , Tadashi: On a certain system of orthogonal step functions (1). . . . . 5 (1953), 166–177
OHNITA, Yoshihiro: The degrees of the standard imbeddings ofR-spaces. . . . 35 (1983), 499–502
OHNITA, Yoshihiro: see MUTO, Hideo, OHNITA, Yoshihiro andURAKAWA , Hajime, 36 (1984), 253–267
OHNITA, Yoshihiro: Stable minimal submanifolds in compact rank onesymmetric spaces.............................................................. . . . . 38 (1986), 199–217
OHNITA, Yoshihiro: Stability of harmonic maps and standard minimalimmersions..................................................................... . . . . 38 (1986), 259–267
OHNO, Mayumi, SHIZUTA, Yasushi and YANAGISAWA, Taku: The tracetheorem on anisotropic Sobolev spaces.................................... . . . . 46 (1994), 393–401
OHNO, Yoshiki: Remarks on Helson-Szegö problems...................... . . . . 18 (1966), 54– 59
OHNO, Yoshiki: Simply invariant subspaces.................................. . . . . 19 (1967), 368–378
OHNO, Yoshiki: Helson-Szegö-Sarason theorem for Dirichlet algebras. . . . . . 31 (1979), 71– 79
OHTA, Takuya: The singularities of the closures of nilpotent orbits incertain symmetric pairs....................................................... . . . . 38 (1986), 441–468
OHTA, Takuya: The closures of nilpotent orbits in the classical symmetricpairs and their singularities................................................... . . . . 43 (1991), 161–211
OHTAKE, Hiromi: A canonical decomposition of automorphic formswhich vanish on an invariant measurable subset.......................... . . . . 39 (1987), 299–311
OIKAWA , Kôtaro: Remarks on conformality at the boundary.............. . . . . 35 (1983), 313–319
ÔIKE, Hiroshi and KURIYAMA , Yoshiaki: On the retractions of stuntedprojective spaces............................................................... . . . . 19 (1967), 454–461
ÔIKE, Hiroshi: see IWATA, Koichi and ÔIKE, Hiroshi, 20 (1968), 582–588
ÔIKE, Hiroshi: Higher order tangent bundles of projective spaces andlens spaces...................................................................... . . . . 22 (1970), 200–209
ÔIKE, Hiroshi: Inflection-free embeddings of Grassmann manifolds..... . . . . 28 (1976), 311–326
OIKE, Hiroshi: Simply connected closed smooth 5-manifolds with effec-tive smoothU(2)-actions..................................................... . . . . 33 (1981), 1– 24
OKADA , Masami: Sur une capacité définie par la forme de Dirichlet as-sociée aux fonctions plurisousharmoniques............................... . . . . 35 (1983), 513–517
64 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
OKADA , Masami:see GAVEAU, Bernard, OKADA , Masami and OKADA ,Tatsuya, 39 (1987), 465–504
OKADA , Tatsuya: A criterion for uniform integrability of exponentialmartingales..................................................................... . . . . 34 (1982), 495–498
OKADA , Tatsuya:see GAVEAU, Bernard, OKADA , Masami and OKADA ,Tatsuya, 39 (1987), 465–504
OKAMOTO, Hisashi: Interfacial progressive water waves — a singularity-theoretic view.................................................................. . . . . 49 (1997), 33– 57
ÔKAWA , Masaki: see TSUBOI, Shôji and ÔKAWA , Masaki, 40 (1988),269–291
OKAYASU, Takashi: Pinching and nonexistence of stable harmonic maps. . . . 40 (1988), 213–220
OKAYASU, Takateru: On the tensor products ofC∗-algebras.............. . . . . 18 (1966), 325–331
OKAYASU, Takateru and TAKESAKI , Masamichi: Dual spaces of tensorproducts ofC∗-algebras...................................................... . . . . 18 (1966), 332–337
OKAYASU, Takateru: A structure theorem of automorphisms of von Neu-mann algebras.................................................................. . . . . 20 (1968), 199–206
OKAYASU, Takateru: OnGCR-operators..................................... . . . . 21 (1969), 573–579
OKAYASU, Takateru: Polar decomposition for isomorphisms ofC∗-algebras......................................................................... . . . . 26 (1974), 541–554
OKAYASU, Takateru: see HAMANA , Masamichi, OKAYASU, Takateruand SAITÔ, Kazuyuki, 34 (1982), 277–287
OKAZAWA , Noboru: A generation theorem for semigroups of growth or-derα ............................................................................. . . . . 26 (1974), 39– 51
OKAZAWA , Noboru: see TAKENAKA , Toshiharu and OKAZAWA ,Noboru, 30 (1978), 107–115
OKUMA , Tomohiro: The pluri-genera of surface singularities............. . . . . 50 (1998), 119–132
OKUMURA, Masafumi: Some remarks on space with a certain contactstructure......................................................................... . . . . 14 (1962), 135–145
OKUMURA, Masafumi: see TACHIBANA , Shun-ichi and OKUMURA,Masafumi, 14 (1962), 156–161
OKUMURA, Masafumi: On infinitesimal conformal and projective trans-formations of normal contact spaces........................................ . . . . 14 (1962), 398–412
OKUMURA, Masafumi: Certain almost contact hypersurfaces in Kaehle-rian manifolds of constant holomorphic sectional curvatures........... . . . . 16 (1964), 270–284
OKUMURA, Masafumi: Contact hypersurfaces in certain Kaehlerianmanifolds....................................................................... . . . . 18 (1966), 74–102
OKUMURA, Masafumi: Certain hypersurfaces of an odd dimensionalsphere............................................................................ . . . . 19 (1967), 381–395
OKUMURA, Masafumi: Compact orientable submanifold of codimension2 in an odd dimensional sphere.............................................. . . . . 20 (1968), 8– 20
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 65
OKUMURA, Masafumi: A pinching problem on the second fundamentaltensors and submanifolds of a sphere....................................... . . . . 25 (1973), 461–467
OKUYAMA , Yasuo: On contraction of Walsh Fourier series................ . . . . 19 (1967), 156–167
OKUYAMA , Yasuo: see WATARI , Chinami and OKUYAMA , Yasuo, 27(1975), 129–134
OKUYAMA , Yasuo: On the absolute Nörlund summability factors of theconjugate series of a Fourier series......................................... . . . . 28 (1976), 563–581
OKUYAMA , Yasuo:see KANNO, Kosi and OKUYAMA , Yasuo, 29 (1977),439–448
OLIVEIRA , José C. Fernandes de and HALE, Jack K.: Dynamic behaviorfrom bifurcation equations................................................... . . . . 32 (1980), 577–592
OLSZAK, Zbigniew: On contact metric manifolds........................... . . . . 31 (1979), 247–253
OMORI, Hideki: On Banach-Lie groups acting on finite dimensional man-ifolds ............................................................................. . . . . 30 (1978), 223–250
ONO, Kaoru: Equivariant index of Dirac operators.......................... . . . . 42 (1990), 319–332
ONO, Takashi: On some arithmetic properties of certain quadratic fibra-tions.............................................................................. . . . . 41 (1989), 283–290
ONODERA, Takeshi: Ein Satz über koendlich erzeugteRZ-Moduln . . . . . . . . . 23 (1971), 691–695
ONOE, Yoshikazu: see KAWAZOE, Takeshi, ONOE, Yoshikazu andTACHIZAWA , Kazuya, 46 (1994), 311–320
ONUCHIC, Nelson and PAVLU , Luiz Carlos: Invariance, asymptotic be-havior and stability properties for ordinary differential equations...... . . . . 32 (1980), 217–224
OPOZDA, Barbara: see NOMIZU, Katsumi and OPOZDA, Barbara, 44(1992), 425–431
O’REGAN, Donal: see AGARWAL, Ravi P. and O’REGAN, Donal, 51(1999), 391–397
ORIHARA, Akio: Bessel functions and the Euclidean motion group...... . . . . 13 (1961), 66– 74
ORLIK , Peter and TERAO, Hiroaki: Coxeter arrangements are hereditarilyfree............................................................................... . . . . 45 (1993), 369–383
ORTEGA SALVADOR, Pedro: Weights for the ergodic maximal operatorand a.e. convergence of the ergodic averages for functions in Lorentzspaces............................................................................ . . . . 45 (1993), 437–446
OSADA, Hiroyuki: The Galois groups of the polynomialsxn + axs + b,II ................................................................................. . . . . 39 (1987), 437–445
OSHIKIRI, Gen-ichi: The surgery of codimension-one foliations. . . . . . . . . . . . . 31 (1979), 63– 70
OSHIKIRI, Gen-ichi: Foliated cobordisms of suspended foliations........ . . . . 32 (1980), 375–392
OSHIKIRI, Gen-ichi: A remark on minimal foliations....................... . . . . 33 (1981), 133–137
OSHIKIRI, Gen-ichi: Jacobi fields and the stability of leaves ofcodimension-one minimal foliations........................................ . . . . 34 (1982), 417–424
66 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
OSHIKIRI, Gen-ichi: Totally geodesic foliations and Killing fields. . .. .. . . . . . 35 (1983), 387–392
OSHIKIRI, Gen-ichi: Totally geodesic foliations and Killing fields, II.... . . . . 38 (1986), 351–356
OSHIKIRI, Gen-ichi: Some remarks on minimal foliations................. . . . . 39 (1987), 223–229
OSHIKIRI, Gen-ichi: A characterization of the mean curvature functionsof codimension-one foliations............................................... . . . . 49 (1997), 557–563
OSHIKIRI, Gen-ichi: Codimension-one foliations and oriented graphs... . . . . 51 (1999), 227–236
ÔTA, Schôichi: Decomposition of unbounded derivations in operator al-gebras............................................................................ . . . . 33 (1981), 215–225
ÔTSUKI, Tominosuke: On a space with affine connection which has noclosed path...................................................................... . . . . . 1 (1949), 88– 90
ÔTSUKI, Tominosuke: On the spaces with normal conformal connexionsand some imbedding problem of Riemannian spaces, I.................. . . . . . 1 (1950), 194–224
ÔTSUKI, Tominosuke: On the Spaces with Normal Conformal Connex-ions and some Imbedding Problem of Riamannian Spaces, II.......... . . . . . 2 (1951), 220–274
OTSUKI, Tominosuke: On a boundary valure problem of systems of pathsin plane.......................................................................... . . . . . 4 (1952), 284–293
OTSUKI, Tominosuke: On focal elements and the spheres................. . . . . 17 (1965), 285–304
OTSUKI, Tominosuke: Integral formulas for hypersurfaces in a Riemann-ian manifold and their applications......................................... . . . . 17 (1965), 335–348
OTSUKI, Tominosuke: On parallel hypersurfaces of an elliptic hypersur-face of the second order inEn+1 ............................................ . . . . 19 (1967), 251–266
OTSUKI, Tominosuke: Minimal submanifolds withM-index 2 in Rie-mannian manifolds of constant curvature.................................. . . . . 23 (1971), 731–402
OTSUKI, Tominosuke: Geodesics ofO2n and an analysis on a related Rie-
mann surface................................................................... . . . . 28 (1976), 411–427
OUADFEL, Ali: see BORDEMANN, Martin, MEDINA, Alberto andOUADFEL, Ali, 45 (1993), 423–436
OZAKI , Manabu: The class group ofZp-extensions over totally real num-ber fields........................................................................ . . . . 49 (1997), 431–435
OZAWA, Mitsuru: Factorization of entire functions.......................... . . . . 27 (1975), 321–336
OZAWA, Shin: The first eigenvalue of the Laplacian on two dimensionalRiemannian manifolds........................................................ . . . . 34 (1982), 7– 14
OZAWA, Shin: Singular variation of the ground state eigenvalue for asemilinear elliptic equation................................................... . . . . 45 (1993), 359–368
OZEKI, Hideki and TAKEUCHI, Masaru: On some types of isoparametrichypersurfaces in spheres I.................................................... . . . . 27 (1975), 515–559
OZEKI, Hideki and TAKEUCHI, Masaru: On some types of isoparametrichypersurfaces in spheres II................................................... . . . . 28 (1976), 7– 55
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 67
OZOLS, V.: Cut loci in Riemannian manifolds............................... . . . . 26 (1974), 219–227
PALMER, Bennett: Calibrations and Lagrangian submanifolds in the sixsphere............................................................................ . . . . 50 (1998), 303–315
PAN, Yibiao: see FAN, Dashan, PAN, Yibiao and YANG, Dachun, 51(1999), 141–161
PANDEY, J. N. and ZEMANIAN , A. H.: An extension of Tanno’s form ofthe convolution transformation.............................................. . . . . 20 (1968), 425–430
PANDEY, J. N.:see DUBE, L. S. and PANDEY, J. N., 27 (1975), 337–354
PANDEY, J. N. and HUGHES, Edward: An approximate Hilbert transformand its inversion................................................................ . . . . 28 (1976), 497–509
PANDEY, J. N.:see DUBE, L. S. and PANDEY, J. N., 29 (1977), 189–201
PAPAGEORGIOU, Nikolaos S.: A relaxation theorem for differential in-clusions in Banach spaces.................................................... . . . . 39 (1987), 505–517
PAR, Jin Sur and SAKAMOTO, Kunio: Submanifolds with properd-planargeodesics immersed in complex projective spaces....................... . . . . 38 (1986), 297–311
PARK, Hye Sook:see ODA, Tadao and PARK, Hye Sook, 43 (1991), 375–399
PARK, Hye Sook: The Chow rings and GKZ-decompositions forQ-factorial toric varieties........................................................ . . . . 45 (1993), 109–145
PARK, Joon-Sik: Harmonic inner automorphisms of compact connectedsemisimple Lie groups........................................................ . . . . 42 (1990), 83– 91
PARKER, R. V.: Stirling’s numbers as polynomials.......................... . . . . . 8 (1956), 181–182
PARROTT, Mary E.: see KARTSATOS, Athanassios G. and PARROTT,Mary E., 34 (1982), 509–523
PARSHALL, Brian and WANG, Jian-pan: Cohomology of infinitesimalquantum groups, I............................................................. . . . . 44 (1992), 395–423
PARSHALL, Brian: see CLINE, Edward, PARSHALL, Brian and SCOTT,Leonard, 45 (1993), 511–534
PARTHASARATHY, Krishnan: see MURALEEDHARAN, Thettath K. andPARTHASARATHY, Krishnan, 51 (1999), 65–73
PASTOR, José A.:see ALÍAS, Luis J., LÓPEZ, Rafael and PASTOR, JoséA., 50 (1998), 491–501
PATI , Tribikram and AHMAD, Z. U.: On the absolute summability factorsof infinite series I.............................................................. . . . . 12 (1960), 222–232
PATTANAYAK , Swadheenananda:see NAYAK , Chanchala, PATTANAYAK ,Swadheenananda and MISHRA, Mahendra Nath, 39 (1987), 1–15
PATTERSON, S. J.: Further remarks on the exponent of convergence ofPoincaré series................................................................. . . . . 35 (1983), 357–373
PAVEL, Nicolae: On the boundedness of solutions of a system of differ-ential equations................................................................ . . . . 24 (1972), 21– 32
68 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
PAVLU , Luiz Carlos:see ONUCHIC, Nelson and PAVLU , Luiz Carlos, 32(1980), 217–224
PAWELKE, Siegfried: Über die Approximationsordnung bei Kugelfunk-tionen und algebraischen Polynomen....................................... . . . . 24 (1972), 473–486
PERRONE, Domenico: 5-dimensional contact manifolds with secondBetti numberb2 = 0 .......................................................... . . . . 41 (1989), 163–170
PERRONE, Domenico and VANHECKE, Lieven: Five-dimensional homo-geneous contact manifolds and related problems......................... . . . . 43 (1991), 243–248
PERSSON, Lars-Erik: see DECHEVSKY, Ljubomir T. and PERSSON,Lars-Erik, 48 (1996), 1–22
PETERSEN, Gordon M.: see IZUMI , Masako, IZUMI , Shin-ichi and PE-TERSEN, Gordon M., 21 (1969), 601–613
PETERSEN, Gordon Marshall: Extreme points for regular summabilitymatrices......................................................................... . . . . 18 (1966), 255–258
PETERSON, G. E. and TUCKER, Don H.: On the equivalence in Banachspaces of a convergence theorem of Bernstein type, a Hausdorff typemoment problem and a regularity theorem................................ . . . . 21 (1969), 170–189
PEYERIMHOFF, A.: see JURKAT, W. and PEYERIMHOFF, A., 17 (1965),55–71
PEYERIMHOFF, A.: see JURKAT, W. B. and PEYERIMHOFF, A., 24(1972), 207–221
PIANZOLA , Arturo: see BILLIG , Yuly and PIANZOLA , Arturo, 47 (1995),391–403
PINKALL , Ulrich: see NOMIZU, Katsumi and PINKALL , Ulrich, 39(1987), 407–427
PINKALL , Ulrich: see NOMIZU, Katsumi and PINKALL , Ulrich, 41(1989), 589–596
PONTZEN, Dieter:see GÖRLICH, Ernst and PONTZEN, Dieter, 34 (1982),539–552
PRESTINI, Elena: see MEANEY, Christopher and PRESTINI, Elena, 50(1998), 557–570
PRIMROSE, E. J. F.: Coincidence points of a curve.......................... . . . . . 6 (1954), 35– 37
PRULLAGE, D. L.: Summability in topological groups, IV (convergencefields)............................................................................ . . . . 21 (1969), 159–169
PYM, J. S. and VASUDEVA, H.: An inequality between square norms ondual groups..................................................................... . . . . 26 (1974), 25– 33
RADEMACHER, Hans-Bert:see KÜHNEL, Wolfgang and RADEMACHER,Hans-Bert, 48 (1996), 601–612
RAGHAVENDRA, Nyshadham and VISHWANATH, Periyapatna A.: Mod-uli of pairs and generalized theta divisors.................................. . . . . 46 (1994), 321–340
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 69
RAHMAN , Q. I. and KHAN, M. A.: Functions of exponential type belong-ing toLp on the real line..................................................... . . . . 19 (1967), 396–399
RAHMAN , Q. I.: see GOVIL , N. K. and RAHMAN , Q. I., 20 (1968), 126–136
RAHMAN , Qazi Ibadur: On the maximum modulus and the coefficientsof an entire Dirichlet series................................................... . . . . . 8 (1956), 108–113
RAHMAN , Qazi Ibadur: On entire functions of infinite order.............. . . . . . 8 (1956), 165–169
RAHMAN , Qazi Ibadur: The quotient of finite exponential sums.......... . . . . 12 (1960), 345–348
RAJAGOPAL, C. T.: On the Riemann-Cesàro summability of series andintegrals......................................................................... . . . . . 9 (1957), 247–263
RAJAGOPAL, C. T.: Errata On the Riemann-Cesàro summability of seriesand integrals (This Journal, Vol. 9, pp. 247–263)......................... . . . . 10 (1958), 367
RAJAGOPAL, C. T.: Correction : On the Riemann-Cesàro summability ofseries and integrals............................................................ . . . . 17 (1965), 443
RAMANAN , S. and RAMANATHAN , A.: Some remarks on the instabilityflag............................................................................... . . . . 36 (1984), 269–291
RAMANATHAN , A.: see RAMANAN , S. and RAMANATHAN , A., 36(1984), 269–291
RAMANUJAM , S.: Application of Morse theory to some homogeneousspaces............................................................................ . . . . 21 (1969), 343–353
RANGACHARI, M. S. and SITARAMAN , Y.: Tauberian theorems for log-arithmic summability(L) .................................................... . . . . 16 (1964), 257–269
RANGACHARI, M. S. and SITARAMAN , Y.: Correction : Tauberian theo-rems for logarithmic summability(L) ...................................... . . . . 17 (1965), 443
RASHID, Suliman: see ABRAMOVICH, Dan, MATSUKI, Kenji andRASHID, Suliman, 51 (1999), 489–537
RASVAN, Vladimir: see HALANAY , Aristide and RASVAN, Vladimir, 32(1980), 299–308
RATHIE, P. N.: On the solution of a functional inequality and its applica-tions.............................................................................. . . . . 23 (1971), 681–690
RATHIE, P. N.: see KANNAPPAN, PL. and RATHIE, P. N., 27 (1975),207–212
RATTO, Andrea and RIGOLI, Marco: Gradient bounds and Liouville’stype theorems for the Poisson equation on complete Riemannian man-ifolds ............................................................................. . . . . 47 (1995), 509–519
REDDY, A. R.: On entire Dirichlet series of zero order..................... . . . . 18 (1966), 144–155
REHMANN, Ulf: see MORITA, Jun and REHMANN, Ulf, 42 (1990), 537–560
REHMANN, Ulf: see KERSTEN, Ina and REHMANN, Ulf, 46 (1994), 35–70
70 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
REVENTÓS, A.: On the Gauss-Bonnet formula on odd-dimensional man-ifolds ............................................................................. . . . . 31 (1979), 165–178
RIEMENSCHNEIDER, S. D.: Compactness of a class of Volterra operators. . . . 26 (1974), 385–387
RIGAL, Marie-Hélène: Rigidité des feuilletages transversalement confor-mément parallélisables........................................................ . . . . 50 (1998), 407–418
RIGOLI, Marco: see RATTO, Andrea and RIGOLI, Marco, 47 (1995),509–519
RILEY, James D.: Contributions to the theory of functions of a bicomplexvariable.......................................................................... . . . . . 5 (1953), 132–165
ROBINSON, Derek W. and YAMAMURO, Sadayuki: The canonical half-norm, dual-half norms, and monotonic norms............................ . . . . 35 (1983), 375–386
RODRIGUES, Hildebrando M.: On growth and decay of solutions of per-turbed retarded linear equations............................................. . . . . 32 (1980), 593–605
ROMERO, Alfonso: see ALÍAS, Luis J., ROMERO, Alfonso andSÁNCHEZ, Miguel, 49 (1997), 337–345
ROSSMAN, Wayne: Minimal surfaces inR3 with dihedral symmetry. . . . . . . . 47 (1995), 31– 54
ROSSMAN, Wayne, UMEHARA, Masaaki and YAMADA , Kotaro: Irre-ducible constant mean curvature 1 surfaces in hyperbolic space withpositive genus.................................................................. . . . . 49 (1997), 449–484
ROTH, H.: On Borel series....................................................... . . . . 15 (1963), 103–113
ROTH, H.: On a theorem of Maillet............................................ . . . . 15 (1963), 114–115
ROUSSOS, Ioannis M.: The helicoidal surfaces as Bonnet surfaces....... . . . . 40 (1988), 485–490
ROUX, Bernard: Sur la dualite de Morita...................................... . . . . 23 (1971), 457–472
RUBEL, L. A. and SHIELDS, A. L.: The failure of interiorexterior factor-ization in the polydisc and the ball.......................................... . . . . 24 (1972), 409–413
RUNGE, Bernhard: Endomorphism rings of abelian surfaces and projec-tive models of their moduli spaces.......................................... . . . . 51 (1999), 283–303
RUSSELL, Dennis C.: On generalized Cesàro means of integral order. . . . . . . 17 (1965), 410–442
RUSSELL, Dennis C.: Note on convergence factors......................... . . . . 18 (1966), 414–428
RUSSELL, Dennis C.: On generalized Cesàro means of integral order-Corregenda..................................................................... . . . . 18 (1966), 454–455
RUTTER, Edgar A., Jr.:PF -modules.......................................... . . . . 23 (1971), 201–206
RUTTER, Edgar A., Jr.: Dominant modules and finite localizations....... . . . . 27 (1975), 225–239
RUTTER, John W. and SPENCER, Christopher B.: On the James, Samel-son and Whitehead products................................................. . . . . 22 (1970), 547–556
RYAN, Patrick J.: Homogeneity and some curvature conditions for hyper-surfaces.......................................................................... . . . . 21 (1969), 363–388
SABBAH, Claude: On a twisted de Rham complex.......................... . . . . 51 (1999), 125–140
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 71
SABLÉ-TOUGERON, Monique: Comportement asymptotique des valeurspropres pour une classe d’opérateurs elliptiques dégénérés............. . . . . 30 (1978), 583–605
SAEKI , Sadahiro: An elementary proof of a theorem of Henry Helson... . . . . 20 (1968), 244–247
SAEKI , Sadahiro: Factorizations in function algebras....................... . . . . 20 (1968), 368–383
SAEKI , Sadahiro: Operating functions onB0(G) in plane regions........ . . . . 21 (1969), 112–116
SAEKI , Sadahiro: Translation invariant operators on groups............... . . . . 22 (1970), 409–419
SAEKI , Sadahiro: Homomorphisms of tensor algebras...................... . . . . 23 (1971), 173–199
SAEKI , Sadahiro: Tensor products of Banach algebras and harmonic anal-ysis............................................................................... . . . . 24 (1972), 281–299
SAEKI , Sadahiro: Infinite tensor products in Fourier algebras............. . . . . 27 (1975), 355–379
SAEKI , Takuya: On pseudorecurrence in topological dynamical systems. . . . . 7 (1955), 171–176
SAEKI , Takuya: The holonomy covering space in principal fibre bundles. . . . 10 (1958), 304–312
SAGAWA, Akira: A note on a Riemann surface with null boundary....... . . . . . 3 (1951), 273–276
SAGAWA, Akira: On the existence of Green function....................... . . . . . 7 (1955), 136–139
SAGAWA, Akira: On the existence of harmonic functions on a Riemannsurface........................................................................... . . . . 15 (1963), 265–272
SAGAWA, Akira: see KURODA, Tadashi and SAGAWA, Akira, 20 (1968),394–399
SAGAWA, Akira: Some function-theoretic null sets.......................... . . . . 21 (1969), 456–466
SAGAWA, Akira: Note on the cluster sets of meromorphic functions. . . . . . . . . 23 (1971), 13– 15
SAITÔ, Kazuyuki: On the preduals ofW ∗-algebras......................... . . . . 19 (1967), 324–331
SAITÔ, Kazuyuki: Non-commutative extension of Lusin’s theorem.. .. .. . . . . 19 (1967), 332–340
SAITÔ, Kazuyuki: On a duality for locally compact groups................ . . . . 20 (1968), 355–367
SAITÔ, Kazuyuki: On the algebra of measurable operators for a generalAW ∗-algebra................................................................... . . . . 21 (1969), 249–270
SAITÔ, Kazuyuki: A non-commutative theory of integration for a semi-finiteAW ∗-algebra and a problem of Feldman........................... . . . . 22 (1970), 420–461
SAITÔ, Kazuyuki: On the algebra of measurable operators for a generalAW ∗-algebra II................................................................ . . . . 23 (1971), 525–534
SAITÔ, Kazuyuki: On the embedding as a double commutator in a type 1AW ∗-algebra................................................................... . . . . 23 (1971), 541–557
SAITÔ, Kazuyuki: On the embedding as a double commutator in a type 1AW ∗-algebra II................................................................ . . . . 26 (1974), 333–339
SAITÔ, Kazuyuki: A note on the continuity of automorphic representa-tions of groups................................................................. . . . . 28 (1976), 305–310
SAITÔ, Kazuyuki: AW ∗-algebras with monotone convergence propertyand examples by Takenouchi and Dyer..................................... . . . . 31 (1979), 31– 40
72 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SAITÔ, Kazuyuki: On normalAW ∗-algebras................................ . . . . 33 (1981), 567–572
SAITÔ, Kazuyuki: see HAMANA , Masamichi, OKAYASU, Takateru andSAITÔ, Kazuyuki, 34 (1982), 277–287
SAITO, Kichi-Suke: The Hardy spaces associated with a periodic flow ona von Neumann algebra....................................................... . . . . 29 (1977), 69– 75
SAITO, Kichi-Suke: On non-commutative Hardy spaces associated withflows on finite von Neumann algebras...................................... . . . . 29 (1977), 585–595
SAITO, Kichi-Suke: Nonselfadjoint subalgebras associated with compactabelian group actions on finite von Neumann algebras.................. . . . . 34 (1982), 485–494
SAITO, Masa-Hiko: Classification of non-rigid families of abelian vari-eties.............................................................................. . . . . 45 (1993), 159–189
SAITO, Morihiko: Decomposition theorem for proper Kähler morphisms. . . . 42 (1990), 127–148
SAITO, Mutsumi: A localization theorem forD-modules................... . . . . 43 (1991), 213–234
SAITO, Mutsumi: Parameter shift in normal generalized hypergeometricsystems.......................................................................... . . . . 44 (1992), 523–534
SAITÔ, Teishirô: On incomplete infinite direct product ofW ∗-algebras. . . . . 10 (1958), 165–171
SAITÔ, Teishirô: The direct product and the crossed product of rings ofoperators........................................................................ . . . . 11 (1959), 299–304
SAITÔ, Teishirô: Some remarks on a representation of a group........... . . . . 12 (1960), 383–388
SAITÔ, Teishirô and TOMIYAMA , Jun: Some results on the direct productofW ∗-algebras................................................................. . . . . 12 (1960), 455–458
SAITÔ, Teishirô: On a representation of a countably infinite group....... . . . . 13 (1961), 268–273
SAITÔ, Teishirô: On groups of automorphisms of finite factors........... . . . . 13 (1961), 427–433
SAITÔ, Teishirô: Some theorems on the crossed products of finite factors. . . . 14 (1962), 312–316
SAITÔ, Teishirô: see SUZUKI , Noboru and SAITÔ, Teishirô, 15 (1963),277–280
SAITÔ, Teishirô and YOSHINO, Takashi: Note on the canonical decom-position of contraction........................................................ . . . . 16 (1964), 309–312
SAITÔ, Teishirô and YOSHINO, Takashi: On a conjecture of Berberian.. . . . . 17 (1965), 147–149
SAITÔ, Teishirô: Some remarks on a representation of a group, II........ . . . . 17 (1965), 206–209
SAITÔ, Teishirô: Some remarkes to Andô’s theorems....................... . . . . 18 (1966), 404–409
SAITÔ, Teishirô: see ISTRAT, Vasile, SAITÔ, Teishirô and YOSHINO,Takashi, 18 (1966), 410–413
SAITÔ, Teishirô: Numerical ranges of tensor products of operators. . . . . . . . . . 19 (1967), 98–100
SAITÔ, Teishirô: Generators of certain von Neumann algebras............ . . . . 20 (1968), 101–105
SAITÔ, Teishirô:see GOYA, Eitoku and SAITÔ, Teishirô, 33 (1981), 127–131
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 73
SAKA , Khoichi: A note on subalgebras of a measure algebra vanishingon non-symmetric homomorphisms........................................ . . . . 25 (1973), 333–338
SAKA , Khoichi: Measure algebras on some topological groups........... . . . . 27 (1975), 1– 12
SAKA , Koichi: The representation theorem and theHp space theory as-sociated with semigroups on Lie groups................................... . . . . 30 (1978), 131–151
SAKA , Koichi: Besov spaces and Sobolev spaces on a nilpotent Lie group. . . . 31 (1979), 383–437
SAKAI , Katsuro: Some properties of MAR and MANR.................... . . . . 30 (1978), 351–366
SAKAI , Ryozi: see KANJIN, Yuichi and SAKAI , Ryozi, 46 (1994), 181–206
SAKAI , Shôichirô: On the group isomorphism of unitary groups inAW ∗-algebras......................................................................... . . . . . 7 (1955), 87– 95
SAKAI , Shôichirô: The absolute value ofW ∗-algebras of finite type. . . . . . . . . . 8 (1956), 70– 85
SAKAI , Shôichirô: On some problems ofC∗-algebras...................... . . . . 11 (1959), 453–455
SAKAI , Shôichiro: On a conjecture of Kaplansky............................ . . . . 12 (1960), 31– 33
SAKAI , Shôichirô: On the Stone-Weierstrass theorem ofC∗-algebras. . . . . . . 22 (1970), 191–199
SAKAI , Shôichirô: Derivations of simpleC∗-algebras, III.................. . . . . 23 (1971), 559–564
SAKAI , Shôichirô: DerivedC∗-algebras of primitiveC∗-algebras........ . . . . 25 (1973), 307–316
SAKAI , Shôichirô: On automorphism groups of II1-factors................ . . . . 26 (1974), 423–430
SAKAI , Shôichirô: Commutative normal∗-derivations III.................. . . . . 28 (1976), 583–590
SAKAI , Takashi: Some transformations onK-contact and normal contactRiemannian manifolds........................................................ . . . . 18 (1966), 216–224
SAKAI , Takashi: Three remarks on fundamental groups of some Rie-mannian manifolds............................................................ . . . . 22 (1970), 249–253
SAKAI , Takashi: On closed geodesics of lens spaces........................ . . . . 23 (1971), 403–411
SAKAI , Takashi: On eigenvalues of Laplacian and curvature of Riemann-ian manifold.................................................................... . . . . 23 (1971), 589–603
SAKAI , Takashi: The contact structures on{SU(n+1)×R/SU(n)×R}αand{Sp(n)× SU(2)/Sp(n− 1)× SU(2)}α of Berger................. . . . . 25 (1973), 145–155
SAKAI , Takashi: On Pu’s theorem for odd dimensional real projectivespaces............................................................................ . . . . 25 (1973), 219–224
SAKAI , Takashi: Correction and supplement to “On closed geodesics oflens spaces”..................................................................... . . . . 27 (1975), 319–320
SAKAKI , Makoto: Upper bounds for the index of minimal surfaces.. .. .. . . . . 42 (1990), 339–349
SAKAMOTO, Kunimochi: Construction and stability analysis of transitionlayer solutions in reaction-diffusion systems.............................. . . . . 42 (1990), 17– 44
SAKAMOTO, Kunio: On the topology of quaternion Kähler manifolds... . . . . 26 (1974), 389–405
SAKAMOTO, Kunio: Planar geodesic immersions........................... . . . . 29 (1977), 25– 56
74 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SAKAMOTO, Kunio: see PAR, Jin Sur and SAKAMOTO, Kunio, 38 (1986),297–311
SAKAN , Ken-ichi: Boundary groups of a fuchsian group of the secondkind .............................................................................. . . . . 28 (1976), 99–104
SAKAN , Ken-ichi: On extremal quasiconformal mappings compatiblewith a Fuchsian group......................................................... . . . . 34 (1982), 87–100
SAKAN , Ken-ichi: On extremal quasiconformal mappings compatiblewith a Fuchsian group with a dilatation bound............................ . . . . 37 (1985), 79– 93
SAKAN , Ken-ichi: A fundamental variational lemma for extremal quasi-conformal mappings compatible with a Fuchsian group................. . . . . 39 (1987), 105–114
SAKANE, Yusuke:see KODAMA, Akio and SAKANE, Yusuke, 29 (1977),57–60
SAKATA , Hiroshi: On convexity theorems for Riesz means................ . . . . 24 (1972), 301–307
SALAZAR , Domingo: see HALE, Jack K. and SALAZAR , Domingo, 51(1999), 412–432
SÁNCHEZ, Miguel: see ALÍAS, Luis J., ROMERO, Alfonso andSÁNCHEZ, Miguel, 49 (1997), 337–345
SANKARAN , Gregory Kumar: A class of non-Kähler complex manifolds. . . . 41 (1989), 43– 64
SANKARANARAYANAN , G.: Some asymptotic properties of Poisson pro-cess.............................................................................. . . . . 10 (1958), 60– 68
SANTOS, Walcy: Submanifolds with parallel mean curvature vector inspheres.......................................................................... . . . . 46 (1994), 403–415
SARIAN, Edward: PropertyL andW -∗ algebras of tpye I.................. . . . . 31 (1979), 491–494
SARIO, Leo and WANG, Cecilia: Negative quasiharmonic functions. . . . . . . . . 26 (1974), 85– 93
SARIO, Leo: see CHUNG, Lung Ock and SARIO, Leo, 27 (1975), 487–496
SARIO, Leo: see CHUNG, Lung Ock, SARIO, Leo and WANG, Cecilia,32 (1980), 439–445
SASAI, Takao:see NAKAMURA , Gen and SASAI, Takao, 28 (1976), 523–539
SASAI, Takao: The fundamental theorem of analytic space curves andapparent singularities of Fuchsian differential equations................ . . . . 36 (1984), 17– 24
SASAKI , Shigeo and YANO, Kentarô: On the structure of spaceswith normal projective connexions whose groups of holonomy fix ahiperquadric or a quadric of(n− 2)-dimension.......................... . . . . . 1 (1949), 31– 39
SASAKI , Shigeo: Obituary Note: Tadahiko Kubota (1885-1952).......... . . . . . 4 (1952), 318–319
SASAKI , Shigeo: Supplementary lists of Mathematical Publications ofProf. T. Kubota................................................................. . . . . . 4 (1952), 320–322
SASAKI , Shigeo: On the influence of the topological structure of Rie-mannian mamifolds upon their holonomy groups........................ . . . . . 6 (1954), 135–148
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 75
SASAKI , Shigeo: The minimum number of points of inflexion of closedcurves in the projective plane................................................ . . . . . 9 (1957), 113–117
SASAKI , Shigeo: On the differential geometry of tangent bundles of Rie-mannian manifolds............................................................ . . . . 10 (1958), 338–354
SASAKI , Shigeo: On differentiable manifolds with certain structureswhich are closely related to almost contact structure I................... . . . . 12 (1960), 459–476
SASAKI , Shigeo: On differentiable manifolds with(φ, ψ)-structures. . . . . . . . 13 (1961), 132–153
SASAKI , Shigeo and HATAKEYAMA , Yoji: On differentiable manifoldswith certain structures which are closely related to almost contactstructure. II..................................................................... . . . . 13 (1961), 281–294
SASAKI , Shigeo: On the differential geometry of tangent bundles of Rie-mannian manifolds II......................................................... . . . . 14 (1962), 146–155
SASAKI , Shigeo and HSU, Chen-Jung: On the integrability of almostcontact structure............................................................... . . . . 14 (1962), 167–176
SASAKI , Shigeo: Homogeneous contact transformations................... . . . . 14 (1962), 369–397
SASAKI , Shigeo: A characterization of contact transformations........... . . . . 16 (1964), 285–290
SASAKI , Shigeo:see KLINGENBERG, Wilhelm and SASAKI , Shigeo, 27(1975), 49–56
SASAKI , Shigeo and HSU, Chen-Jung: On a property of Brieskorn mani-folds ............................................................................. . . . . 28 (1976), 67– 78
SASAKI , Shigeo and TAKAHASHI , Toshio: Almost contact structures onBrieskorn manifolds........................................................... . . . . 28 (1976), 619–624
SASAKI , Shigeo: Obituary....................................................... . . . . 39 (1987)
SASAKI , Takehiko: Boundaries of components of Kleinian groups....... . . . . 28 (1976), 267–276
SASAKI , Takehiko: On common boundary points of more than two com-ponents of a finitely generated Kleinian group............................ . . . . 29 (1977), 427–437
SASAKI , Takehiko: The residual limit points of the first kind and the nestgroups........................................................................... . . . . 32 (1980), 35– 48
SASAKI , Takehiko: On the Koebe-Maskit theorem.......................... . . . . 33 (1981), 503–513
SASAKI , Takeshi and YOSHIDA, Masaaki: Linear differential equationsmodeled after hyperquadrics................................................. . . . . 41 (1989), 321–348
SASAKI , Takeshi: see NOMIZU, Katsumi and SASAKI , Takeshi, 44(1992), 25–33
SASAKI , Takeshi: see NOMIZU, Katsumi and SASAKI , Takeshi, 51(1999), 205–212
SASAYAMA , Hiroyoshi: On the generalized invariant differential form onmanifolds with general connection.......................................... . . . . . 5 (1953), 122–127
SATAKE, I. and FARAUT, J.: The functional equation of zeta distributionsassociated with formally real Jordan algebras............................. . . . . 36 (1984), 469–482
76 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SATAKE, Ichiro: see KATO, Tosio and SATAKE, Ichiro, 33 (1981), 421–428
SATAKE, Ichiro: A formula in simple Jordan algebras...................... . . . . 36 (1984), 611–622
SATAKE, Ichiro: On the rational structures of symmetric domains, II De-termination of rational points of classical domains....................... . . . . 43 (1991), 401–424
SATAKE, Ichiro: OnQ-structures of quasisymmetric domains............. . . . . 47 (1995), 357–390
SATAKE, Ichiro: Addendum: OnQ-structures of quasisymmetric do-mains............................................................................ . . . . 47 (1995), 613–614
SATO, Atsushi:see MORITA, Yasuo and SATO, Atsushi, 44 (1992), 345–358
SATO, Eiichi: A criterion for uniruledness in positive characteristic...... . . . . 45 (1993), 447–460
SATO, Eiichi: Projective manifolds swept out by large dimensional linearspaces............................................................................ . . . . 49 (1997), 299–321
SATO, Enji: Maximal ideals of the convolution measure algebra fornondiscrete locally compact abelian groups............................... . . . . 35 (1983), 641–648
SATO, Enji: Spectra of measures asLp multipliers.......................... . . . . 37 (1985), 333–342
SATO, Enji: see IGARI, Satoru and SATO, Enji, 46 (1994), 357–366
SATO, Fumihiro: Zeta functions in several variables associated with pre-homogeneous vector spaces I: Functional equations..................... . . . . 34 (1982), 437–483
SATO, Fumihiro: Zeta functions in several variables associated with pre-homogeneous vector spaces II: A convergence criterion................ . . . . 35 (1983), 77– 99
SATO, Fumihiro: Eisenstein series on weakly spherical homogeneousspaces ofGL(n) ............................................................... . . . . 50 (1998), 23– 69
SATO, Hajime: Constructing manifolds by homotopy equivalences II:Browder-Novikov-Wall type obstruction to constructingPL- andtopological manifolds from homology manifolds........................ . . . . 27 (1975), 569–599
SATO, Hajime: Remarks concerning contact manifolds..................... . . . . 29 (1977), 577–584
SATO, Hajime and YABUTA, Kôzô: Toeplitz operators on strongly pseu-doconvex domains in Stein spaces.......................................... . . . . 30 (1978), 153–162
SATO, Hajime and MIZUTANI , Tadayoshi: On topological Blaschke con-jecture II........................................................................ . . . . 36 (1984), 159–174
SATO, Hiroki: Augmented Schottky spaces and a uniformization of Rie-mann surfaces.................................................................. . . . . 35 (1983), 557–572
SATO, Hiroki: Limits of sequences of Riemann surfaces represented bySchottky groups................................................................ . . . . 36 (1984), 521–539
SATO, Hiroki: Classical Schottky groups of real type of genus two, I. . . . . . . . 40 (1988), 51– 75
SATO, Hiroki: Classical Schottky groups of real type of genus two, II. . . . . . . 43 (1991), 449–472
SATO, Hiroki: Classical Schottky groups of real type of genus two, III. . . . . . 49 (1997), 485–502
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 77
SATO, Hiroshi: Global density theorem for a Federer measure............ . . . . 44 (1992), 581–595
SATÔ, Isuke: On Riemannian manifolds of separated curvature........... . . . . 10 (1958), 130–134
SATÔ, Isuke: Almost analytic vector fields in almost complex manifolds. . . . 17 (1965), 185–199
SATÔ, Isuke: On a structure similar to Sasakian 3-structure................ . . . . 25 (1973), 405–415
SATO, Katsunori: Construction of higher genus minimal surfaces withone end and finite total curvature............................................ . . . . 48 (1996), 229–246
SATO, Kojiro: Infinitesimal affine transformations of the tangent bundleswith Sasaki metric............................................................. . . . . 26 (1974), 353–361
SATO, Masako:see IZUMI , Shin-ichi and SATO, Masako, 6 (1954), 258–263
SATO, Ryotaro: Ergodic theorems for semi-groups inLp, 1< p < ∞ . . . . . . 26 (1974), 73– 76
SATO, Ryotaro: On the existence of positive invariant functions for semi-groups of operators............................................................ . . . . 27 (1975), 187–196
SATO, Ryotaro:see HASEGAWA, Shigeru, SATO, Ryotaro and TSURUMI,Shigeru, 30 (1978), 95–106
SATO, Ryotaro: On abstract mean ergodic theorems........................ . . . . 30 (1978), 575–581
SATO, Ryotaro: Individual ergodic theorems for commuting operators. . . . . . 35 (1983), 129–135
SATO, Ryotaro: On the ergodic properties of positive operators........... . . . . 48 (1996), 471–499
SATO, Shuichi: A note on a Fourier multiplier of two variables........... . . . . 33 (1981), 139–143
SATO, Shuichi: Entropy and almost everywhere convergence of Fourierseries............................................................................. . . . . 33 (1981), 593–597
SATO, Shuichi: Lusin functions and nontangential maximal functions intheHp theory on the product of upper half-spaces....................... . . . . 37 (1985), 1– 13
SATO, Shuichi: Lusin functions on product spaces.......................... . . . . 39 (1987), 41– 59
SATÔ, Terukiyo: On linear Lie algebras of a certain dimension........... . . . . 12 (1960), 71– 76
SATÔ, Terukiyo: On derivations of nilpotent Lie algebras.................. . . . . 17 (1965), 244–249
SATO, Terukiyo: The derivations of the Lie algebras........................ . . . . 23 (1971), 21– 36
SATO, Tokui: Sur la limitation des solutions d’un système d’équationsintégrales de volterra.......................................................... . . . . . 4 (1952), 272–274
SATO, Tokushi: Positive solutions with weak isolated singularities tosome semilinear elliptic equations.......................................... . . . . 47 (1995), 55– 80
SATYANARAYANA , M.: Characterization of local rings..................... . . . . 19 (1967), 411–416
SAWAKI , Sumio: On almost-analytic tensors in∗O-spaces................ . . . . 13 (1961), 154–178
SAWAKI , Sumio: On the Matsushima’s theorem in a compact EinsteinK-space......................................................................... . . . . 13 (1961), 455–465
SAWAKI , Sumio: On harmonic tensors in a compact almost-Kählerianspace............................................................................. . . . . 15 (1963), 335–342
78 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SAWAKI , Sumio and TAKAMATSU , Kichiro: On almost complex hyper-surfaces of aK-space......................................................... . . . . 25 (1973), 569–578
SAWAKI , Sumio and SEKIGAWA, Kouei: σ -hypersurfaces in a locallysymmetric almost Hermitian manifold..................................... . . . . 30 (1978), 543–551
SAWANO, Kensuke: Exponential asymptotic stability for functional dif-ferential equations with infinite retardations............................... . . . . 31 (1979), 363–382
SAWANO, Kensuke: Positively invariant sets for functional differentialequations with infinite delay................................................. . . . . 32 (1980), 557–566
SCHECHTER, Martin: Nonhomogeneous elliptic systems and scattering. . . . . 27 (1975), 601–616
SCHEMPP, Walter: see DRESELER, Bernd and SCHEMPP, Walter, 27(1975), 153–173
SCHIKHOF, Win H. and MORITA, Yasuo: Duality of projective limitspaces and inductive limit spaces over a nonspherically completenonarchimedean field......................................................... . . . . 38 (1986), 387–397
SCHROETER, Günter: A remark on the Hausdorff moment problem...... . . . . 27 (1975), 389
SCHUUR, Jerry D.: see MARTELLI , Mario and SCHUUR, Jerry D., 32(1980), 201–207
SCOTT, Leonard: see CLINE, Edward, PARSHALL, Brian and SCOTT,Leonard, 45 (1993), 511–534
SEEGER, Andreas: Necessary conditions for quasiradial Fourier multipli-ers................................................................................ . . . . 39 (1987), 249–257
SEGAWA, Shigeo:see NAKAI , Mitsuru and SEGAWA, Shigeo, 28 (1976),591–600
SEIFERT, George: On total stability and asymptotic stability.............. . . . . 19 (1967), 71– 74
SEIFERT, George: Correction : On total stability and asymptotic stability. . . . 20 (1968), 416
SEIFERT, George: On uniformly almost periodic sets of functions foralmost periodic differential equations...................................... . . . . 34 (1982), 301–309
SEKI, Takejiro: An elementary proof of Brouwer’s fixed point theorem. . . . . . 9 (1957), 105–109
SEKIGAWA, Hisao: The outradius of the Teichmüller space................ . . . . 30 (1978), 607–612
SEKIGAWA, Hisao: Schwarzian derivatives of some conformal mappings. . . . 31 (1979), 309–318
SEKIGAWA, Hisao and YAMAMOTO, Hiro-o: Outradii of the Teichmüllerspaces of Fuchsian groups of the second kind............................. . . . . 38 (1986), 365–370
SEKIGAWA, Hisao: A theorem on the limit sets of quasiconformal defor-mations of infinitely generated Fuchsian groups of the first kind. . . . . . . . . . 41 (1989), 349–357
SEKIGAWA, Kouei and TAKAGI , Hitoshi: On conformally flat spaces sat-isfying a certain condition on the Ricci tensor............................ . . . . 23 (1971), 1– 11
SEKIGAWA, Kouei: On some 3-dimensional complete Riemannian mani-folds satisfyingR(X, Y ) · R = 0 ............................................ . . . . 27 (1975), 561–568
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 79
SEKIGAWA, Kouei: see SAWAKI , Sumio and SEKIGAWA, Kouei, 30(1978), 543–551
SEKIGUCHI, Jiro and TAKAYAMA , Nobuki: Compactifications of theconfiguration space of six points of the projective plane and funda-mental solutions of the hypergeometric system of type(3, 6) .......... . . . . 49 (1997), 379–413
SEKIGUCHI, Takeshi: Remarks on Cairoli’s condition...................... . . . . 24 (1972), 457–461
SEKIGUCHI, Takeshi: Note on the Krickeberg decomposition............. . . . . 28 (1976), 95– 97
SEKIGUCHI, Takeshi: see KAZAMAKI , Norihiko and SEKIGUCHI,Takeshi, 31 (1979), 261–279
SEKIGUCHI, Takeshi:see IZUMISAWA, Masataka, SEKIGUCHI, Takeshiand SHIOTA, Yasunobu, 31 (1979), 281–284
SEKIGUCHI, Takeshi: BMO-martingales and inequalities.................. . . . . 31 (1979), 355–358
SEKIGUCHI, Takeshi: see KAZAMAKI , Norihiko and SEKIGUCHI,Takeshi, 35 (1983), 289–301
SEKIGUCHI, Takeshi and SHIOTA, Yasunobu: On a class of the univer-sally integrable random functions........................................... . . . . 38 (1986), 357–364
SEKIGUCHI, Tsutomu and SUWA, Noriyuki: A note on extensions of al-gebraic and formal groups, III............................................... . . . . 49 (1997), 241–257
SEKIZAWA , Masami: see TACHIBANA , Shun-ichi and SEKIZAWA ,Masami, 27 (1975), 25–30
SEKIZAWA , Masami: Umbilics of conformally flat submanifolds in Eu-clidean space................................................................... . . . . 32 (1980), 99–109
SELL, George R. and NAKAJIMA , Fumio: Almost periodic gross-substitute dynamical systems................................................ . . . . 32 (1980), 255–263
SHAH, S. M. and SINGH, S. K.: Meromorphic functions with maximumdefect sum...................................................................... . . . . 11 (1959), 447–452
SHAH, S. M.: An extension of Lindelöf’s theorem to meromorphic func-tions.............................................................................. . . . . 12 (1960), 333–338
SHAH, S. M.: see MARIC, V. and SHAH, S. M., 21 (1969), 621–631
SHAH, S. M.: Absolute Nörlund summability of Fourier series.. ... ... ... . . . . 24 (1972), 309–318
SHAH, S. M.: see BELL, R. A. and SHAE, S. M., 27 (1975), 197–206
SHANKAR, Hari: On the characteristic function of a meromorphic func-tion I ............................................................................. . . . . . 9 (1957), 243–246
SHANKAR, Hari: see SINGH, S. K. and SHANKAR, Hari, 9 (1957), 264–266
SHANKAR, Hari: An oscillation theorem of Tauberian type................ . . . . 20 (1968), 137–145
SHASTRI, Anant R.: Compact structures onC ∗ × C ∗ ..................... . . . . 40 (1988), 35– 49
SHASTRI, Anant R.: Polynomial representations of knots.................. . . . . 44 (1992), 11– 17
80 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SHAWYER, Bruce L. R.:see BORWEIN, David and SHAWYER, Bruce L.R., 19 (1967), 232–237
SHAWYER, Bruce L. R.:see BORWEIN, David and SHAWYER, Bruce L.R., 19 (1967), 244
SHAWYER, Bruce Lockhart Robertson:see BORWEIN, David andSHAWYER, Bruce Lockhart Robertson, 18 (1966), 283–298
SHEKOURY, Raymond N. and UEHARA, Hiroshi: Some remarks on Post-nikov complexes and fibre spaces........................................... . . . . 15 (1963), 299–314
SHERIF, Soraya: A Tauberian constant for the(S, µn+1) transformation. . . . 19 (1967), 110–125
SHI, Jian-yi: Left cells in affine Weyl groups................................. . . . . 46 (1994), 105–124
SHI, Zhiyong: Groups graded by finite root systems........................ . . . . 45 (1993), 89–108
SHIBA, Masaaki: On a theorem of Haar....................................... . . . . 21 (1969), 451–455
SHIBATA , Kêichi: see IKOMA, Kazuo and SHIBATA , Kêichi, 13 (1961),241–247
SHIBATA , Keiichi: Zum Aufbau einfach zusammenhängender Mini-malfläehen —besonders über ihre Instabilität und Häufung—. . .. . . .. . . . . . 38 (1986), 399–416
SHIBATA , Keiichi: Orthogonal stance of a minimal surface against itsbounding surfaces............................................................. . . . . 41 (1989), 461–469
SHIELDS, A. L.: see RUBEL, L. A. and SHIELDS, A. L., 24 (1972), 409–413
SHIGA, Hiroshige: Characterization of quasi-disks and Teichmüllerspaces............................................................................ . . . . 37 (1985), 541–552
SHIGA, Hiroshige: Remarks on holomorphic families of Riemann sur-faces............................................................................. . . . . 38 (1986), 539–549
SHIGA, Koichi: A relation between the total curvature and the measureof rays, II........................................................................ . . . . 36 (1984), 149–157
SHIMADA , Ichiro: Unirationality of certain complete intersections in pos-itive characteristics............................................................ . . . . 44 (1992), 379–393
SHIMAKURA , Norio: Sur lesζ -fonction d’epstein pour des opérateurselliptiques dégénérés.......................................................... . . . . 26 (1974), 95–131
SHIMAKURA , Norio: Equations différentielles provenant de la génétiquedes populations................................................................. . . . . 29 (1977), 287–318
SHIMANO, Takashi: Random reccurence time in ergodic theory.......... . . . . 23 (1971), 273–287
SHIMANO, Takashi: An invariant under isomorphy of systems in the er-godic theory.................................................................... . . . . 30 (1978), 337–350
SHIMANO, Takashi: Multiplicity of helices of a special flow.............. . . . . 31 (1979), 49– 55
SHIMANO, Takashi: On helices and multiple Wiener integrals of a Gauss-ian automorphism.............................................................. . . . . 33 (1981), 103–107
SHIMANO, Takashi: The multiplicity of helices for a regularly increasingsequence ofσ -fields........................................................... . . . . 36 (1984), 141–148
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 81
SHIMAZAKI , Toshio: see AKAZA , Tohru and SHIMAZAKI , Toshio, 25(1973), 61–68
SHIMIZU , Satoru: Homogeneous Kähler manifolds of complex dimen-sion two......................................................................... . . . . 34 (1982), 53– 63
SHIMIZU , Satoru: Complex analytic properties of tubes over locally ho-mogeneous hyperbolic affine manifolds.................................... . . . . 37 (1985), 299–305
SHIMIZU , Satoru:see TSUJI, Tadashi and SHIMIZU , Satoru, 38 (1986),371–378
SHIMIZU , Satoru: Automorphisms and equivalence of bounded Reinhardtdomains not containing the origin........................................... . . . . 40 (1988), 119–152
SHIMIZU , Tetsuhiro: see IZUCHI, Keiji and SHIMIZU , Tetsuhiro, 25(1973), 53–60
SHIMOMURA, Shun: On a generalized Bessel function of two variablesII. Case of coalescing saddle points......................................... . . . . 50 (1998), 389–406
SHIN, Jong Son: Global convergence of successive approximations ofsolutions for functional differential equations with infinite delay...... . . . . 39 (1987), 557–574
SHIN, Jong Son and NAITO, Toshiki: Existence and continuous depen-dence of mild solutions to semilinear functional differential equationsin Banach spaces............................................................... . . . . 51 (1999), 555–583
SHIODA, Tetsuji and KATSURA, Toshiyuki: On Fermat varieties... .. .. .. . . . . 31 (1979), 97–115
SHIOHAMA , K.: see NAKAGAWA , H. and SHIOHAMA , K., 22 (1970),357–361
SHIOHAMA , Katsuhiro: see NAKAGAWA , Hisao and SHIOHAMA , Kat-suhiro, 22 (1970), 14–23
SHIOHAMA , Katsuhiro: On complete non-compact Riemannian mani-folds with certain properties................................................. . . . . 22 (1970), 76– 94
SHIOTA, Yasunobu: see IZUMISAWA, Masataka, SEKIGUCHI, Takeshiand SHIOTA, Yasunobu, 31 (1979), 281–284
SHIOTA, Yasunobu: On a decomposition of BMO-martingales............ . . . . 33 (1981), 515–520
SHIOTA, Yasunobu: Certain decompositions of BMO-martingales. . . . . . . . . . . 33 (1981), 561–565
SHIOTA, Yasunobu:see KAZAMAKI , Norihiko and SHIOTA, Yasunobu,37 (1985), 101–106
SHIOTA, Yasunobu:see SEKIGUCHI, Takeshi and SHIOTA, Yasunobu, 38(1986), 357–364
SHIOYA, Takashi: The ideal boundaries of complete open surfaces....... . . . . 43 (1991), 37– 59
SHIROSAKI, Manabu: A generalization of Stoll’s theorem for movingtargets........................................................................... . . . . 41 (1989), 673–678
SHIROSAKI, Manabu: Another proof of the defect relation for movingtargets........................................................................... . . . . 43 (1991), 355–360
82 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SHIROSAKI, Manabu: An extension of unicity theorem for meromorphicfunctions........................................................................ . . . . 45 (1993), 491–497
SHIU, Elias S. W.: Numerical ranges of products and tensor products.... . . . . 30 (1978), 257–262
SHIZUTA, Yasushi:see KAWASHIMA , Shuichi and SHIZUTA, Yasushi, 40(1988), 449–464
SHIZUTA, Yasushi:see OHNO, Mayumi, SHIZUTA, Yasushi and YANAG-ISAWA, Taku, 46 (1994), 393–401
SHRIVASTAVA , Kailash Chandra: On the determination of the jump of afunction by its Fourier coefficients.......................................... . . . . 12 (1960), 120–129
SHUTTERS, W. A.: see FULLER, K. R. and SHUTTERS, W. A., 27 (1975),303–311
SIBUYA , Yasutaka: A linear Pfaffian system at an irregular singularity. . . . . . 32 (1980), 209–215
SIMHA , R. R.: Algebraic varieties biholomorphic toC ∗ × C∗ ............ . . . . 30 (1978), 455–461
SIMON, Udo: see BOKAN, Neda, NOMIZU, Katsumi and SIMON, Udo,42 (1990), 101–108
SIMON, Udo: Global uniqueness for ovaloids in Euclidean and affine dif-ferential geometry............................................................. . . . . 44 (1992), 327–334
SINGER, David A.: see BARROS, Manuel, GARAY, Oscar J. and SINGER,David A., 51 (1999), 177–192
SINGH, S. K. and SHANKAR, Hari: A note on meromorphic functions inthe unit circle................................................................... . . . . . 9 (1957), 264–266
SINGH, S. K.: see SHAH, S. M. and SINGH, S. K., 11 (1959), 447–452SINGH, Shri Krishna: On exceptional values of entire and meromorphic
functions........................................................................ . . . . 13 (1961), 373–380
SITARAMAN , Y.: see RANGACHARI, M. S. and SITARAMAN , Y., 16(1964), 257–269
SITARAMAN , Y.: see RANGACHARI, M. S. and SITARAMAN , Y., 17(1965), 443
SIU, Yum-Tong: A proof of Cartan’s Theorems A and B................... . . . . 20 (1968), 207–213
SIU, Yun-Tong: Normal families of Cousin I and ll data.................... . . . . 21 (1969), 548–557
SJÖLIN, Per: Regularity of solutions to nonlinear equations ofSchrödinger type............................................................... . . . . 45 (1993), 191–203
SLOSS, Bruce G. and BLYTH, William F.: Walsh functions and uniformdistribution mod 1............................................................. . . . . 45 (1993), 555–563
SMALL , Anthony: Duality for a class of minimal surfaces inRn+1 ....... . . . . 51 (1999), 585–601
SMITH, J. Wolfgang: The de Rham theorem for general spaces........... . . . . 18 (1966), 115–137
SMITH, Larry: On the type of an associativeH -space of rank two........ . . . . 20 (1968), 511–515
SORIA, Fernando:see CARBERY, Anthony, HERNÁNDEZ, Eugenio andSORIA, Fernando, 41 (1989), 647–656
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 83
SORIA, Fernando:see CARBERY, Anthony, HERNÁNDEZ, Eugenio andSORIA, Fernando, 42 (1990), 287
SOTOMAYOR, Jorge:see GUTIERREZ, Carlos and SOTOMAYOR, Jorge,38 (1986), 551–559
SOUGANIDIS, Panagiotis:see ISHII, Hitoshi and SOUGANIDIS, Panagio-tis, 47 (1995), 227–250
SPENCER, Christopher B.:see RUTTER, John W. and SPENCER, Christo-pher B., 22 (1970), 547–556
SPENCER, Christopher B.: Relative homotopy operations.................. . . . . 23 (1971), 453–456
SPRINGER, T. A.: see BOREL, A. and SPRINGER, T. A., 20 (1968), 443–497
SRINIVASACHARYULU , K.: Non linear functional equations.............. . . . . 28 (1976), 235–238
SRIVASTAVA , Bhaskar: Partial theta function expansions.................. . . . . 42 (1990), 119–125
STAMPFLI, J. G. and WILLIAMS , J. P.: Growth conditions and the numer-ical range in a Banach algebra............................................... . . . . 20 (1968), 417–424
STAVROULAKIS , I. P.: see KARAKOSTAS, George, STAVROULAKIS , I. P.and WU, Yumei, 45 (1993), 583–605
STEIN, E. M. and WEISS, Guido: On the interpolation of analytic familiesof operators acting onHp-spaces........................................... . . . . . 9 (1957), 318–339
STEMPAK, Krzysztof: Conjugate expansions for ultraspherical functions. . . . 45 (1993), 461–469
STEMPAK, Krzysztof: Heat-diffusion and Poisson integrals for Laguerreexpansions...................................................................... . . . . 46 (1994), 83–104
STEMPAK, Krzysztof: Addendum: Conjugate expansions for ultraspheri-cal functions.................................................................... . . . . 46 (1994), 293–294
STEPHENSON, Kenneth:see BEARDON, Alan F. and STEPHENSON, Ken-neth, 43 (1991), 27–36
STONG, R. E.: Algebraic classification of diffeomorphisms............... . . . . 31 (1979), 207–219
STRAIT, Peggy: On Kitagawa’s functional integral.......................... . . . . 19 (1967), 75– 78
STURMFELS, Bernd: Gröbner bases of toric varieties....................... . . . . 43 (1991), 249–261
SUGANO, Takashi: see MURASE, Atsushi and SUGANO, Takashi, 48(1996), 165–202
SUGIMOTO, Midori: On Riemannian manifolds with a certain closed ge-odesic............................................................................ . . . . 22 (1970), 56– 64
SUGIMOTO, Mitsuru: A remark on the asymptotic properties of eigenval-ues and the Lattice point problem........................................... . . . . 50 (1998), 597–611
SUH, Young Jin and TAKAGI , Ryoichi: A rigidity for real hypersurfacesin a complex projective space................................................ . . . . 43 (1991), 501–507
SUMIDA , Hiroki: see ICHIMURA, Humio and SUMIDA , Hiroki, 49(1997), 203–215
84 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SUN, Huafei and OGIUE, Koichi: Minimal hypersurfaces of unit sphere. . . . 49 (1997), 423–429
SUNADA, Toshikazu: Closed geodesics in a locally symmetric space. . . . . . . . 30 (1978), 59– 68
SUNDARAM, Narasimhan: Special divisors and vector bundles........... . . . . 39 (1987), 175–213
SUNOUCHI, Chôichirô: A generalization of Schatten-von Neumann-Dixmier’ theorem for type IAW ∗-algebras............................... . . . . 23 (1971), 727–734
SUNOUCHI, Gen-ichirô: Notes on Forier Analysis(XVIII): Absolutesummability of series with constant terms................................. . . . . . 1 (1949), 57– 65
SUNOUCHI, Gen-ichirô and UTAGAWA, Masatomo: The generalized Per-ron integrals.................................................................... . . . . . 1 (1949), 95– 99
SUNOUCHI, Genichirô: Notes on Fourier Analysis (XXV) : Quasi-Tauberian Theorem............................................................ . . . . . 1 (1950), 167–185
SUNOUCHI, Gen-ichirô: Notes on Fourier analysis (XXXVI): On certainapplications of Wiener’s Tauberian theorems............................. . . . . . 1 (1950), 303–312
SUNOUCHI, Gen-ichirô: see IZUMI , Shin-ichi and SUNOUCHI, Gen-ichirô, 1 (1950), 313–326
SUNOUCHI, Gen-ichirô: Notes on Fourier analysis(XXXIX).............. . . . . . 3 (1951), 71– 88
SUNOUCHI, Gen-ichirô: Notes on Fourier analysis (XLIV): On the sum-mation of Fourier series....................................................... . . . . . 3 (1951), 114–122
SUNOUCHI, Gen-ichirô: Harmonic analysis and Wiener integrals. . .. . .. . . . . . . 3 (1951), 187–196
SUNOUCHI, Gen-ichirô: Notes on Fourier analysis (XLVI): A conver-gence criterion for Fourier series............................................ . . . . . 3 (1951), 216–219
SUNOUCHI, Gen-ichirô: A class of singular integral equations............ . . . . . 3 (1951), 220–222
SUNOUCHI, Gen-ichirô: see IZUMI , Shin-ichi and SUNOUCHI, Gen-ichiô, 3 (1951), 298–305
SUNOUCHI, Gen-ichiro and TSUCHIKURA, Tamotsu: Absolute regularityfor convergent integrals....................................................... . . . . . 4 (1952), 153–156
SUNOUCHI, Gen-ichiro: Convergence criteria for Fourier series.......... . . . . . 4 (1952), 187–193
SUNOUCHI, Gen-ichirô: Tauberian theorems for Riemann summability. . . . . . 5 (1953), 34– 42
SUNOUCHI, Gen-ichirô: Correction to the paper “Tauberian theorems forRiemann summability.” This Journal Vol. 5, No. 1. pp. 34-42.......... . . . . . 5 (1953), 189
SUNOUCHI, Gen-ichirô: Cesàro summability of Fourier series............ . . . . . 5 (1953), 198–210
SUNOUCHI, Gen-ichirô: A new convergence criterion for Fourier series. . . . . 5 (1954), 238–242
SUNOUCHI, Gen-ichirô:see KOIZUMI , Sumiyuki and SUNOUCHI, Gen-ichirô, 5 (1954), 243–260
SUNOUCHI, Gen-ichirô:see HIROKAWA, Hiroshi and SUNOUCHI, Gen-ichirô, 5 (1954), 261–267
SUNOUCHI, Gen-ichirô: On the strong summability of power series andFourier series................................................................... . . . . . 6 (1954), 220–225
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 85
SUNOUCHI, Gen-ichirô: On the summability of power series and Fourierseries............................................................................. . . . . . 7 (1955), 96–109
SUNOUCHI, Gen-ichirô: Theorems on power series of the classHP .... . . . . . . 8 (1956), 125–146
SUNOUCHI, Gen-ichiro: Errata “Cesàro summability of Fourier series”This Journal, Vo1. 5(1953), 193–210....................................... . . . . . 8 (1956), 147
SUNOUCHI, Gen-ichirô: On functions regular in a half-plane............. . . . . . 9 (1957), 37– 44
SUNOUCHI, Gen-ichirô: Some theorems on fractional integration........ . . . . . 9 (1957), 307–317
SUNOUCHI, Gen-ichirô: On the Riesz summability of Fourier series..... . . . . 11 (1959), 321–326
SUNOUCHI, Gen-ichiro and WATARI , Chinami: On determination of theclass of saturation in the theory of approximation of functions II...... . . . . 11 (1959), 480–488
SUNOUCHI, Gen-ichiro: On the class of saturation in the theory of ap-proximation I................................................................... . . . . 12 (1960), 339–344
SUNOUCHI, Gen-ichirô: On the class of saturation in the theory of ap-proximation II.................................................................. . . . . 13 (1961), 112–118
SUNOUCHI, Gen-ichirô: Discrete analogue of a theorem of Littlewood-Paley............................................................................. . . . . 13 (1961), 295–319
SUNOUCHI, Gen-ichirô: On the class of saturation in the theory of ap-proximation III ................................................................. . . . . 13 (1961), 320–328
SUNOUCHI, Gen-ichirô: Characterization of certain classes of functiotns. . . . 14 (1962), 127–134
SUNOUCHI, Gen-ichirô: On the saturation and best approximation....... . . . . 14 (1962), 212–216
SUNOUCHI, Gen-ichirô: Approximation and saturation of functions byarithmetic means of trigonometric interpolating polynomials.......... . . . . 15 (1963), 162–166
SUNOUCHI, Gen-ichirô: Correction and remark to “Cesàro summabilityof Fourier series”.............................................................. . . . . 15 (1963), 394–397
SUNOUCHI, Gen-ichirô: Strong summability of Walsh Fourier series.. . . . . . . 16 (1964), 228–237
SUNOUCHI, Gen-ichirô: Saturation in the local approximation............ . . . . 17 (1965), 16– 28
SUNOUCHI, Gen-ichirô: On the convolution algebra of Beurling......... . . . . 19 (1967), 303–310
SUNOUCHI, Gen-ichirô: Some criteria for the absolute summability of aFourier series................................................................... . . . . 19 (1967), 311–314
SUNOUCHI, Gen-ichirô: On the Littlewood-Paley functiong∗ of multipleFourier integrals and Hankel multiplier transformations................ . . . . 19 (1967), 496–511
SUNOUCHI, Gen-ichirô:see KOZIMA, Michitaka and SUNOUCHI, Gen-ichirô, 20 (1968), 146–169
SUNOUCHI, Gen-ichirô: see LEE, E. T. Y. and SUNOUCHI, Gen-ichirô,31 (1979), 41–48
SUNOUCHI, Gen-ichirô: On the functions of Littlewood-Paley andMarcinkiewicz................................................................. . . . . 36 (1984), 505–519
SUNOUCHI, Gen-ichirô: see KANEKO, Makoto and SUNOUCHI, Gen-ichirô, 37 (1985), 343–365
86 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
SUNOUCHI, Haruo: The irreducible decompositions of the maximalHilbert algebras of the finite classes........................................ . . . . . 4 (1952), 207–215
SUNOUCHI, Haruo: An extension of the Plancherel formula to unimodu-lar groups....................................................................... . . . . . 4 (1952), 216–230
SUNOUCHI, Haruo: Infinite Lie rings.......................................... . . . . . 8 (1956), 291–307
SUNOUCHI, Haruo: Convergence of semi-discrete difference schemes ofabstract Cauchy problems.................................................... . . . . 22 (1970), 394–408
SUSSMAN, Myron M.: On uniqueness in Cauchy’s problern for ellipticpartial differential operators with characteristics of multiplicity greaterthan two......................................................................... . . . . 29 (1977), 165–188
SUWA, Noriyuki: see SEKIGUCHI, Tsutomu and SUWA, Noriyuki, 49(1997), 241–257
SUYAMA , Yoshihiko: Area-minimizing hypersurfaces defined by homo-topy classes of mappings of 1-essential manifolds....................... . . . . 41 (1989), 291–305
SUYAMA , Yoshihiko: A differentiable sphere theorem by curvaturepinching II ...................................................................... . . . . 47 (1995), 15– 29
SUYAMA , Yoshihiko: Explicit representation of compact conformally flathypersurfaces................................................................... . . . . 50 (1998), 179–196
SUZUKI , Haruo: A product in homotopy theory............................. . . . . . 6 (1954), 78– 88
SUZUKI , Haruo: On the realization of the Stiefel-Whitney characteristicclasses by submanifolds...................................................... . . . . 10 (1958), 91–115
SUZUKI , Haruo: Multiplications in Postnikov systems and their applica-tions.............................................................................. . . . . 12 (1960), 389–399
SUZUKI , Haruo:α-invariants of some differentiableS1-actions........... . . . . 25 (1973), 509–520
SUZUKI , Kazuo: Notes on the duality theorem of non-commutative topo-logical groups.................................................................. . . . . 15 (1963), 182–186
SUZUKI , Kazuo: On the character ring of representations of a compactgroup............................................................................ . . . . 20 (1968), 38– 45
SUZUKI , Kazuo: A note on a theorem of E. Cartan.......................... . . . . 23 (1971), 17– 20
SUZUKI , Kazuo: Dimension of compact groups and their representations. . . . 23 (1971), 663–670
SUZUKI , Kazuo: On parabolic subgroups of Chevalley groups over localrings............................................................................. . . . . 28 (1976), 57– 66
SUZUKI , Kazuo: see ABE, Eiichi and SUZUKI , Kazuo, 28 (1976), 185–198
SUZUKI , Makoto: The Mordell property of hyperbolic fiber spaces withnoncompact fibers............................................................. . . . . 47 (1995), 601–611
SUZUKI , Masakazu: Compactifications ofC × C ∗ and(C ∗)2 ............ . . . . 31 (1979), 453–468
SUZUKI , Noboru: On the invariants ofW ∗-algebras........................ . . . . . 7 (1955), 177–185
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 87
SUZUKI , Noboru: On automorphisms ofW ∗-algebras leaving the centerelementwise invariant......................................................... . . . . . 7 (1955), 186–191
SUZUKI , Noboru: Crossed products of rings of operators.................. . . . . 11 (1959), 113–124
SUZUKI , Noboru: Certain types of groups of automorphisms of a factor. . . . 11 (1959), 314–320
SUZUKI , Noboru: Correction : Certain types of groups of automorphismsof a factor (This Journal, Vol. 11, pp. 314–320).......................... . . . . 12 (1960), 477–478
SUZUKI , Noboru: Extensions of rings of operators on Hilbert spaces. . . . . . . . 14 (1962), 217–232
SUZUKI , Noboru and SAITÔ, Teishirô: On the operators which generatecontinuous von Neumann algebras.......................................... . . . . 15 (1963), 277–280
SUZUKI , Yasutaka: A note onQF -1 algebras................................ . . . . 22 (1970), 225–230
SUZUKI , Yoshiya: Approximation of functions by Riesz mean of theirFourier series................................................................... . . . . 15 (1963), 37– 41
SUZUKI , Yoshiya: Saturation of local approximation by linear positiveoperators........................................................................ . . . . 17 (1965), 210–221
SUZUKI , Yoshiya: Saturation of local approximation by linear positiveoperators of Bernstein type................................................... . . . . 19 (1967), 429–453
SUZUKI , Yoshiya:see IKENO, Kyuhei and SUZUKI , Yoshiya, 20 (1968),214–233
SUZUKI , Yoshiya and WATANABE, Satoshi: Some remarks on saturationproblem in the local approximation II...................................... . . . . 21 (1969), 65– 83
SWINGLE, Paul M.: see HUNTER, Robert P. and SWINGLE, Paul M., 10(1958), 3–10
SZALAY , István: On the absolute summability of Fourier series. . . . . .. . . . . . . . 21 (1969), 523–531
TACHIBANA , Shun-ichi: On almost-analytic vectors in almost-Kählerianmanifolds....................................................................... . . . . 11 (1959), 247–265
TACHIBANA , Shun-ichi: On almost-analytic vectors in certain almost-Hermitian manifolds.......................................................... . . . . 11 (1959), 351–363
TACHIBANA , Shun-ichi and ISHIHARA, Shigeru: On infinitesimal holo-morphically projective transformations in Kählerian manifolds........ . . . . 12 (1960), 77–101
TACHIBANA , Shun-ichi: Analytic tensor and its generalization........... . . . . 12 (1960), 208–221
TACHIBANA , Shun-ichi: Some theorems on locally product Riemannianspaces............................................................................ . . . . 12 (1960), 281–292
TACHIBANA , Shun-ichi: Correction : On almost-analytic vectors inalmost-Kählerian manifolds.................................................. . . . . 12 (1960), 479
TACHIBANA , Shun-ichi: On automorphisms of certain comact almost-Hermitian spaces............................................................... . . . . 13 (1961), 179–185
TACHIBANA , Shun-ichi:see ISHIHARA, Shigeru and TACHIBANA , Shun-ichi, 13 (1961), 193–200
TACHIBANA , Shun-ichi: On infinitesimal conformal and projective trans-formations of compactK-spaces............................................ . . . . 13 (1961), 386–392
88 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TACHIBANA , Shun-ichi and OKUMURA, Masafumi: On the almost-complex structure of tangent bundles of Riemannian spaces........ ... . . . . 14 (1962), 156–161
TACHIBANA , Shun-ichi and KOTO, Satoshi: On almost-analytic func-tions, tensors and invariant subspaces...................................... . . . . 14 (1962), 177–186
TACHIBANA , Shun-ichi: On harmonic tensors in compact Sasakianspaces............................................................................ . . . . 17 (1965), 271–284
TACHIBANA , Shun-ichi: On a decomposition ofC-harmonic forms in acompact Sasakian space...................................................... . . . . 19 (1967), 198–212
TACHIBANA , Shun-ichi: On Killing tensors in a Riemannian space. . . . . . . . . . 20 (1968), 257–264
TACHIBANA , Shun-ichi: On conformal Killing tensor in a Riemannianspace............................................................................. . . . . 21 (1969), 56– 64
TACHIBANA , Shun-ichi and OGAWA, Yôsuke: Onη-cohomology ofη�-invariant forms in a compact Sasakian space.............................. . . . . 21 (1969), 632–643
TACHIBANA , Shun-ichi and YU, Wen Neng: On a Riemannian space ad-mitting more than one Sasakian structures................................. . . . . 22 (1970), 536–540
TACHIBANA , Shun-ichi: On the mean curvature for holomorphic 2p-plane in Kählerian spaces.................................................... . . . . 25 (1973), 157–165
TACHIBANA , Shun-ichi and SEKIZAWA , Masami: On thek-th nullityspace of the Riemannian curvature tensor................................. . . . . 27 (1975), 25– 30
TACHIBANA , Shun-ichi: On Killing tensors in Riemannian manifolds ofpositive curvature operator................................................... . . . . 28 (1976), 177–184
TACHIBANA , Syun-ichi: On normal coordinates of a Riemann space,whose holonomy group fixes a point....................................... . . . . . 1 (1949), 26– 30
TACHIBANA , Syun-ichi: On Pseudo-Parallelism in Einstein Spaces...... . . . . . 2 (1951), 214–219
TACHIBANA , Syun-ichi: On concircular geometry and Reimann spaceswith constant scalar curvatures.............................................. . . . . . 3 (1951), 149–158
TACHIZAWA , Kazuya: Asymptotic distribution of eigenvalues ofSchrödinger operators with nonclassical potentials...................... . . . . 42 (1990), 381–406
TACHIZAWA , Kazuya: see KAWAZOE, Takeshi, ONOE, Yoshikazu andTACHIZAWA , Kazuya, 46 (1994), 311–320
TAIRA, Kazuaki: An index formula for the de Rham complex............. . . . . 45 (1993), 331–358
TAKAGI , Hitoshi: see SEKIGAWA, Kouei and TAKAGI , Hitoshi, 23(1971), 1–11
TAKAGI , Hitoshi: An example of Riemannian manifolds satislfyingR(X, Y ) · R = 0 but not∇R = 0 ........................................... . . . . 24 (1972), 105–108
TAKAGI , Hitoshi and WATANABE, Yoshiyuki: On the holonomy groupsof Kählerian manifolds with vanishing Bochner curvature tensor...... . . . . 25 (1973), 185–195
TAKAGI , Hitoshi: On curvature homogeneity of Riemannian manifolds. . . . . 26 (1974), 581–585
TAKAGI , Hitoshi: Conformally flat Riemannian manifolds admitting atransitive group of isometries................................................ . . . . 27 (1975), 103–110
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 89
TAKAGI , Hitoshi: Conformally flat Riemannian manifolds admitting atransitive group of isometries II............................................. . . . . 27 (1975), 445–451
TAKAGI , Hitoshi: Homogeneous Riemannian manifolds covered bySm×Sn ................................................................................ . . . . 28 (1976), 469–477
TAKAGI , Hitoshi: Notes on the cancellation of Riemannian manifolds... . . . . 32 (1980), 411–417
TAKAGI , Hitoshi: A condition for isoparametric hypersurfaces ofSn tobe homogeneous............................................................... . . . . 37 (1985), 241–250
TAKAGI , Hitoshi and YAWATA , Makoto: Infinitesimal isometries of framebundles with natural Riemannian metric................................... . . . . 43 (1991), 103–115
TAKAGI , Hitoshi and YAWATA , Makoto: Infinitesimal isometries of framebundles with a natural Riemannian metric II.............................. . . . . 46 (1994), 341–355
TAKAGI , Izumi: Stability of bifurcating solutions of the Gierer-Meinhardtsystem........................................................................... . . . . 31 (1979), 221–246
TAKAGI , Izumi: A priori estimates for stationary solutions of an activator-inhibitor model due to Gierer and Meinhardt.............................. . . . . 34 (1982), 113–132
TAKAGI , Ryoichi: Homogeneous hypersurfaces in a sphere with the typenumber 2........................................................................ . . . . 23 (1971), 49– 58
TAKAGI , Ryoichi and YOROZU, Shinsuke: Minimal foliations on Liegroups........................................................................... . . . . 36 (1984), 541–554
TAKAGI , Ryoichi: see NAKAGAWA , Hisao and TAKAGI , Ryoichi, 40(1988), 465–471
TAKAGI , Ryoichi: see SUH, Young Jin and TAKAGI , Ryoichi, 43 (1991),501–507
TAKAGI , Ryoichi, KIM, In-Bae and KIM, Byung Hak: The rigidity forreal hypersurfaces in a complex projective space......................... . . . . 50 (1998), 531–536
TAKAHASHI , Ken-ichi: Ein System von linearen homogenen Differen-tialgleichungen, welche auf zwei Parametern abhängen................. . . . . . 8 (1956), 258–267
TAKAHASHI , Ken-ichi: Über eine erweiterte asymptotische Darstellungder Lösung eines Systems von linearen homogenen Differentialgle-ichungen, welche von zwei Parametern abhängen........................ . . . . 10 (1958), 172–193
TAKAHASHI , Ken-ichi: Eine erweiterte asymptotische Darstellung derLösung eines Systems von homogenen linearen Differentialgleichun-gen, welche von zwei Parametern abhängen.............................. . . . . 11 (1959), 63– 97
TAKAHASHI , Ken-ichi: Über eine asymptotische Darstellung der Lösungeines Systems von Differentialgleichungen, welche von zwei Param-etern abhängen, und eine Anwendung auf spezielle Differentialgle-ichungen zweiter Ordnung................................................... . . . . 13 (1961), 1– 17
TAKAHASHI , Shigeru: On the centra1 1imit theorem....................... . . . . . 3 (1951), 316–321
TAKAHASHI , Shigeru: On some random Riemann-sums................... . . . . . 8 (1956), 245–257
90 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TAKAHASHI , Shigeru: On the complete convergence of the Riemannsum.............................................................................. . . . . 11 (1959), 422–424
TAKAHASHI , Shigeru: A gap sequence with gaps bigger than theHadamard’s..................................................................... . . . . 13 (1961), 105–111
TAKAHASHI , Shigeru: On the distribution of values of the type�f (qkt) . . . . 14 (1962), 233–243
TAKAHASHI , Shigeru: The law of the iterated logarithm for a gap se-quence with infinite gaps..................................................... . . . . 15 (1963), 281–288
TAKAHASHI , Shigeru: Central limit theorem of trigonometric series..... . . . . 16 (1964), 1– 14
TAKAHASHI , Shigeru: A version of the central limit theorem for trigono-metric series.................................................................... . . . . 16 (1964), 384–398
TAKAHASHI , Shigeru: On trigonometric series with gaps.................. . . . . 17 (1965), 227–234
TAKAHASHI , Shigeru: On the lacunary Fourier series...................... . . . . 19 (1967), 79– 85
TAKAHASHI , Shigeru: On the central limit theorem for lacunary trigono-metric series.................................................................... . . . . 20 (1968), 289–295
TAKAHASHI , Shigeru: On trigonometric Fourier coeffcients.............. . . . . 21 (1969), 406–418
TAKAHASHI , Shigeru: Lacunary trigonometric sum and probability. . . . . . . . . 22 (1970), 502–510
TAKAHASHI , Shigeru: On the law of the iterated logarithm for lacunarytrigonometric series........................................................... . . . . 24 (1972), 319–329
TAKAHASHI , Shigeru: On the law of the iterated logarithm for lacunarytrigonometric series II......................................................... . . . . 27 (1975), 391–403
TAKAHASHI , Shigeru: Almost sure invariance principles for lacunarytrigonometric series........................................................... . . . . 31 (1979), 439–451
TAKAHASHI , Shoichi: An explicit representation of the generalized prin-cipal ideal theorem for the rational ground field.......................... . . . . 16 (1964), 176–182
TAKAHASHI , Shôichi: On Tannaka-Terada’s principal ideal theorem forrational group field............................................................ . . . . 17 (1965), 87–104
TAKAHASHI , Shôichi: The number theoretic functions..................... . . . . 25 (1973), 375–382
TAKAHASHI , Shuichi: A duality theorem for representable locally com-pact groups with compact commutator subgroup......................... . . . . . 4 (1952), 115–121
TAKAHASHI , Shuichi: Cohomology groups of finite abelian groups. . . . . . . . . . 4 (1952), 294–302
TAKAHASHI , Shuichi: Homology groups in class field theory............. . . . . . 5 (1953), 8– 11
TAKAHASHI , Shuichi: see KUNIYOSHI, Hideo and TAKAHASHI ,Shuichi, 5 (1953), 128–131
TAKAHASHI , Shuichi: Dimension of compact groups and their represen-tations........................................................................... . . . . . 5 (1953), 178–184
TAKAHASHI , Shuichi: Arithmetic of group representations................ . . . . 11 (1959), 216–246
TAKAHASHI , T. and OHARU, S.: Approximation of operator semigroupsin a Banach spaee.............................................................. . . . . 24 (1972), 505–528
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 91
TAKAHASHI , Takao: Deformations of Sasakian structures and its appli-cation to the Brieskorn manifolds........................................... . . . . 30 (1978), 37– 43
TAKAHASHI , Tomokuni: Certain algebraic surfaces of general type withirregularity one and their canonical mappings............................ . . . . 50 (1998), 261–290
TAKAHASHI , Toshio: Sasakian manifold with pseudo-Riemannian met-ric ................................................................................ . . . . 21 (1969), 271–290
TAKAHASHI , Toshio: Sasakian hypersurfaces in space of constant curva-ture............................................................................... . . . . 21 (1969), 644–653
TAKAHASHI , Toshio:see TANNO, Shûkichi and TAKAHASHI , Toshio, 22(1970), 212–219
TAKAHASHI , Toshio and TANNO, Shûkichi:K-contact Riemannian man-ifolds isometrically immersed in a space of constant curvature. . . . . . . . . . . . 23 (1971), 535–539
TAKAHASHI , Toshio: see SASAKI , Shigeo and TAKAHASHI , Toshio, 28(1976), 619–624
TAKAHASHI , Toshio: Sasakianφ-symmetric spaces........................ . . . . 29 (1977), 91–113
TAKAHASHI , Toyofumi: Galois cohomology of finitely generated mod-ules............................................................................... . . . . 21 (1969), 102–111
TAKAHASHI , Toyofumi: Galois cohomology in unramified extensions ofalgebraic function fields...................................................... . . . . 24 (1972), 33– 39
TAKAHASHI , Tsunero: Complex hypersurfaces withRS = 0 inCn+1 ... . . . . 25 (1973), 527–533
TAKAHASI , Ken-iti: Die Besselsche Differentialgleichung und eine lin-eare Diffierentialgleichung dritter Ordnung mit einem Wendepunkt. . . . . . 14 (1962), 1– 14
TAKAHASI , Sin-Ei: Bohman-Korovkin-Wulbert operators from a func-tion space into a commutativeC∗-algebra for special test functions... . . . . 48 (1996), 139–148
TAKAI , Hiroshi: see KISHIMOTO, Akitaka and TAKAI , Hiroshi, 30(1978), 83–94
TAKAMATSU , Kichiro: On a decomposition of an almost-analytic vectorin aK-space with constant scalar curvature............................... . . . . 16 (1964), 72– 80
TAKAMATSU , Kichiro and WATANABE, Yoshiyuki: Classification of aconformally flatK-space..................................................... . . . . 24 (1972), 435–440
TAKAMATSU , Kichiro: see SAWAKI , Sumio and TAKAMATSU , Kichiro,25 (1973), 569–578
TAKANO, Kinsaku: Certain Fourier transforms of distributions........... . . . . . 3 (1951), 306–315
TAKAYAMA , Nobuki: see SEKIGUCHI, Jiro and TAKAYAMA , Nobuki, 49(1997), 379–413
TAKAYAMA , Shigeharu: A differential geometric property of big linebundles.......................................................................... . . . . 46 (1994), 281–291
TAKEDA, Kazuaki: On the Abel summability of multiple Fourier seriesby spherical means............................................................ . . . . 10 (1958), 253–261
92 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TAKEDA, Kazuaki and TAKEDA, Zirô: A certain series of multiplicativelyorthogonal functions.......................................................... . . . . 16 (1964), 34– 59
TAKEDA, Yoshifumi: Vector fields and differential forms on generalizedRaynaud surfaces.............................................................. . . . . 44 (1992), 359–364
TAKEDA, Z.: see NAKAMURA , M., TAKEDA, Z. and TURUMARU, T., 5(1953), 190–193
TAKEDA, Z.: see FUKAMIYA , M., MISONOU, Y. and TAKEDA, Z., 6(1954), 89–93
TAKEDA, Zirô: see NAKAMURA , Masahiro and TAKEDA, Zirô, 3 (1951),132–135
TAKEDA, Zirô: see NAKAMURA , Masahiro and TAKEDA, Zirô, 4 (1952),275–283
TAKEDA, Zirô: see NAKAMURA , Masahiro and TAKEDA, Zirô, 5 (1953),109–121
TAKEDA, Zirô: On the represesentations of operator algebras, II.......... . . . . . 6 (1954), 212–219
TAKEDA, Zirô: Inductive limit and infinite direct product of operator al-gebras............................................................................ . . . . . 7 (1955), 67– 86
TAKEDA, Zirô: see TAKEDA, Kazuaki and TAKEDA, Zirô, 16 (1964),34–59
TAKEDA, Zirô: see HAGA, Yoshinori and TAKEDA, Zirô, 24 (1972), 167–190
TAKEMOTO, Hideo:W ∗-algebra with a non-separable cyclic representa-tion ............................................................................... . . . . 20 (1968), 567–576
TAKEMOTO, Hideo: On the homomorphism of von Neumann algebra. . . . . . . 21 (1969), 152–157
TAKEMOTO, Hideo: On the integral representation of some functional ona von Neumann algebra....................................................... . . . . 21 (1969), 237–248
TAKEMOTO, Hideo: A complement to “On the homomorphism of vonNeumann algebra”............................................................. . . . . 22 (1970), 210–211
TAKEMOTO, Hideo: On theCp-classes in the maximalCCR ideal of avon Neumann algebra......................................................... . . . . 23 (1971), 301–311
TAKEMOTO, Hideo and TOMIYAMA , Jun: On the topological reductionof finite von Neumann algebras............................................. . . . . 25 (1973), 273–289
TAKEMOTO, Hideo: Decomposable operators in continuous fields ofHilbert spaces.................................................................. . . . . 27 (1975), 413–435
TAKEMOTO, Hideo: On the weakly continuous constant field of Hilbertspace and its application to the reduction theory of von Neumann al-gebra............................................................................. . . . . 28 (1976), 479–496
TAKENAKA , Toshiharu and OKAZAWA , Noboru: A Phillips-Miyaderatype perturbation theorem for cosine functions of operators............ . . . . 30 (1978), 107–115
TAKENOUCHI, Osamu: On the maximal Hilbert algebras.................. . . . . . 3 (1951), 123–131
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 93
TAKESAKI , Masamichi: On the direct product ofW ∗-factors.............. . . . . 10 (1958), 116–119
TAKESAKI , Masamichi: On the conjugate space of operator algebra. . . . . . . . . 10 (1958), 194–203
TAKESAKI , Masamichi: see TOMIYAMA , Jun and TAKESAKI ,Masamichi, 13 (1961), 498–522
TAKESAKI , Masamichi: On some representations ofC∗-algebras. .. . . . . . . . . . 15 (1963), 79– 95
TAKESAKI , Masamichi: On the unitary equivalence among the compo-nents of decompositions of representations of involutive Banach alge-bras and the associated diagonal algebras.................................. . . . . 15 (1963), 365–393
TAKESAKI , Masamichi: On the cross-norm of the direct product ofC∗-algebras......................................................................... . . . . 16 (1964), 111–122
TAKESAKI , Masamichi: A complement to “On the unitary equivalenceamong the components of decompositions of representations of invo-lutive Banach algebras and the associated diagonal algebras”.......... . . . . 16 (1964), 226–227
TAKESAKI , Masamichi: see OKAYASU, Takateru and TAKESAKI ,Masamichi, 18 (1966), 332–337
TAKESAKI , Masamichi:see CONNES, Alain and TAKESAKI , Masamichi,29 (1977), 473–575
TAKESAKI , Masamichi:see CONNES, Alain and TAKESAKI , Masamichi,30 (1978), 653–655
TAKETA, Kiyosi: Über die Struktur der Metabelschen Gruppen, III.. ... . . . . . . 4 (1952), 10– 32
TAKEUCHI, Kensuke: On free modular lattices II............................ . . . . 11 (1959), 1– 12
TAKEUCHI, Masaru: see OZEKI, Hideki and TAKEUCHI, Masaru, 27(1975), 515–559
TAKEUCHI, Masaru: see OZEKI, Hideki and TAKEUCHI, Masaru, 28(1976), 7–55
TAKEUCHI, Masaru:see NISHIKAWA , Seiki and TAKEUCHI, Masaru, 30(1978), 307–335
TAKEUCHI, Masaru: Stability of certain minimal submanifolds of com-pact Hermitian symmetric spaces........................................... . . . . 36 (1984), 293–314
TAKEUCHI, Mitsuhiro: On a semi-direct product decomposition of affinegroups over a field of characteristic 0....................................... . . . . 24 (1972), 453–456
TAKEUCHI, Teruo: Notes on the class field towers of cyclic fields of de-greel ............................................................................. . . . . 31 (1979), 301–307
TAKIZAWA , Seizi: On contact structures of real and complex manifolds. . . . . 15 (1963), 227–252
TAMIR , Boaz: On towers of liftings and hypercuspidality for unitarygroups........................................................................... . . . . 45 (1993), 147–157
TANAHASHI , Kôtarô: A characterization of decomposable operators. . . . . . . . 34 (1982), 295–300
TANAHASHI , Kôtarô: Characterizations ofS-decomposable operators ona complex Banach space...................................................... . . . . 35 (1983), 261–265
94 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TANAHASHI , Kôtarô: Duality of closedS-decomposable operators. . . . . . . . . . 41 (1989), 453–460
TANAKA , Chuji: Note on Dirichlet Series (I): On the singularities ofDirichlet series (I)............................................................. . . . . . 3 (1951), 285–291
TANAKA , Chuji: Note on Dirichlet Series (II): On the singularities ofDirichlet series (II)............................................................ . . . . . 3 (1951), 292–297
TANAKA , Chuji: Note on Dirichlet series (III) : On the singularities ofDirichlet series (III)........................................................... . . . . . 4 (1952), 49– 53
TANAKA , Chuji: Note on Dirichlet Series (V) : On the integral functionsdefined by Dirichlet series (I)................................................ . . . . . 5 (1953), 67– 78
TANAKA , Chuji: Note on Dirichlet series (XIV) On the singularities ofDirichlet series (VI)........................................................... . . . . . 7 (1955), 229–239
TANAKA , Hitoshi: An elementary proof of an estimate for the Kakeyamaximal operator on functions of product type........................... . . . . 48 (1996), 429–435
TANAKA , Minoru: see ITOH, Jin-ichi and TANAKA , Minoru, 50 (1998),571–575
TANG, Baorong and KUANG, Yang: Existence, uniqueness and asymp-totic stability of periodic solutions of periodic functional differentialsystems.......................................................................... . . . . 49 (1997), 217–239
TANI , Mariko: On a conformally flat Riemannian space with positiveRicci curvature................................................................. . . . . 19 (1967), 227–231
TANI , Mariko: An example of an odd dimensiorlal positively pinchedRiemannian manifold......................................................... . . . . 21 (1969), 532–538
TANIGAWA , Harumi: Orbits and their accumulation points of cyclic sub-groups of modular groups.................................................... . . . . 43 (1991), 289–299
TANIGAWA , Harumi: Discreteness of finite dimensional Teichmüllerspaces in the universal Teichmüller space................................. . . . . 46 (1994), 135–140
TANIGUCHI, Masahiko: Continuity of certain differentials on finitelyaugmented Teichmüller spaces and variational formulas of Schiffer-Spencer’s type.................................................................. . . . . 38 (1986), 281–295
TANISAKI , Toshiyuki: Defining ideals of the closures of the conjugacyclasses and representations of the Weyl groups........................... . . . . 34 (1982), 575–585
TANNAKA , Tadao: Some remarks concerning principal ideal theorem. . . . . . . . 1 (1950), 270–278
TANNAKA , Tadao: Obituary..................................................... . . . . 39 (1987)
TANNO, Shukichi: Note on infinitesimal transformations over contactmanifolds....................................................................... . . . . 14 (1962), 416–430
TANNO, Shukichi: see HATAKEYAMA , Yoji, OGAWA, Yosuke andTANNO, Shukichi, 15 (1963), 42–48
TANNO, Shûkichi: Some transformations on manifolds with almost con-tact and contact metric structures........................................... . . . . 15 (1963), 140–147
TANNO, Shûkichi: On fiberings of some non-compact contact manifolds. . . . 15 (1963), 289–297
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 95
TANNO, Shûkichi: Some transformations on manifolds with almost con-tact and contact metric structures, II........................................ . . . . 15 (1963), 322–331
TANNO, Shûkichi: A remark on transformations of aK-contact manifold. . . . 16 (1964), 173–175
TANNO, Shûkichi: An almost complex structure of the tangent bundle ofan almost contact manifold................................................... . . . . 17 (1965), 7– 15
TANNO, Shûkichi: A theorem on regular vector fields and its applicationsto almost contact structures.................................................. . . . . 17 (1965), 235–238
TANNO, Shûkichi: Sur une variété munie d’une structure de contact ad-mettant certaines transformations........................................... . . . . 17 (1965), 239–243
TANNO, Shûkichi: Partially conformal transformations with respect to(m− 1)-dimensional distributios ofm-dimensional Riemannian man-ifolds ............................................................................. . . . . 17 (1965), 358–409
TANNO, Shûkichi: A conformal transformation of certain contact Rie-mannian manifolds............................................................ . . . . 18 (1966), 270–273
TANNO, Shûkichi: Partially conformal transformations with respect to(m−1)-dimensional distributions ofm-dimensional Riemannian man-ifolds II .......................................................................... . . . . 18 (1966), 378–392
TANNO, Shûkichi: Strongly curvature-preserving transformations ofpseudo-Riemannian manifolds.............................................. . . . . 19 (1967), 245–250
TANNO, Shûkichi: The automorphism groups of almost contact Riemann-ian manifolds................................................................... . . . . 21 (1969), 21– 38
TANNO, Shûkichi: Hypersurfaces satisfying a certain condition on theRicci tensor..................................................................... . . . . 21 (1969), 297–303
TANNO, Shûkichi: Sasakian manifolds with constantφ-holomorphic sec-tional curvature................................................................ . . . . 21 (1969), 501–507
TANNO, Shûkichi and BAIK , Yong-Bai: φ-holomorphic special bisec-tional curvature................................................................ . . . . 22 (1970), 184–190
TANNO, Shûkichi and TAKAHASHI , Toshio: Some hypersurfaces of asphere............................................................................ . . . . 22 (1970), 212–219
TANNO, Shûkichi: Killing vectors on contact Riemannian manifolds andfiberings related to the Hopf fibrations..................................... . . . . 23 (1971), 313–333
TANNO, Shûkichi: see TAKAHASHI , Toshio and TANNO, Shûkichi, 23(1971), 535–539
TANNO, Shûkichi: 2-dimensional complex submanifolds immersed incomplex projective spaces.................................................... . . . . 24 (1972), 71– 78
TANNO, Shûkichi: 4-dimensional conformally flat Kähler manifolds. . . . . . . . 24 (1972), 501–504
TANNO, Shûkichi: Euler-Poincaré characteristics and curvature tensors. . . . . 25 (1973), 33– 52
TANNO, Shûkichi: Eigenvalues of the Laplacian of Riemannian mani-folds ............................................................................. . . . . 25 (1973), 391–403
TANNO, Shûkichi: Mean curvatures for holomorphic 2p-planes in Käh-lerian manifolds................................................................ . . . . 25 (1973), 417–423
96 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TANNO, Shûkichi: Deformations of Riemannian metrics on 3-dimensional manifolds........................................................ . . . . 27 (1975), 437–444
TANNO, Shûkichi: Some system of differential equations on Riemannianmanifolds and its applications to contact structures...................... . . . . 29 (1977), 125–136
TANNO, Shûkichi: The first eigenvalue of the Laplacian on spheres...... . . . . 31 (1979), 179–185
TANNO, Shukichi: Ricci curvatures of contact Riemannian manifolds. . . . . . . 40 (1988), 441–448
TANNO, Shukichi: The standard CR structure on the unit tangent bundle. . . . 44 (1992), 535–543
TANNO, Shukichi: Remarks on a triple ofK-contact structures........... . . . . 48 (1996), 519–531
TANNO, Yûkichi: On a class of convolution transforms.................... . . . . 18 (1966), 156–173
TANNO, Yûkichi: On a class of convolution transform II................... . . . . 19 (1967), 168–186
TANNO, Yûkichi: On dual integral equations as convolution transforms. . . . . 20 (1968), 554–566
TANNO, Yûkichi: On the analyticity of the kernel of a class of convolutiontransform........................................................................ . . . . 24 (1972), 331–345
TASAKI , Hiroyuki: Quaternionic submanifolds in quaternionic symmet-ric spaces........................................................................ . . . . 38 (1986), 513–538
TASHIRO, Yoshihiro: Sur la Dérivée de LIE de L’être Géométrique et SonGroupe D’invariance.......................................................... . . . . . 2 (1950), 166–181
TASHIRO, Yoshihiro: On conformal and projective transformations inKählerian manifolds........................................................... . . . . 14 (1962), 317–320
TASHIRO, Yoshihiro: On contact structure of hypersurfaces in complexmanifolds, I..................................................................... . . . . 15 (1963), 62– 78
TASHIRO, Yoshihiro: On contact structure of hypersurfaces in complexmanifolds, II.................................................................... . . . . 15 (1963), 167–175
TASHIRO, Yoshihiro: On contact structures of tangent sphere bundles. . . . . . . 21 (1969), 117–143
TAYA , Hisao: Onp-adic zeta functions andZp-extensions of certain to-tally real number fields........................................................ . . . . 51 (1999), 21– 33
TEIXIDOR I BIGAS, Montserrat: Brill-Noether theory for vector bundlesof rank 2......................................................................... . . . . 43 (1991), 123–126
TERADA, Fumiyuki: On a generalization of the principal ideal theorem. . . . . . 1 (1950), 229–269
TERADA, Fumiyuki: On the principal genus theorem concerning theAbelian extensions............................................................ . . . . . 4 (1952), 141–152
TERADA, Fumiyuki: A note on the principal genus theorem............... . . . . . 5 (1953), 211–213
TERADA, Fumiyuki: Complex multiplication and principal ideal theorem. . . . . 6 (1954), 21– 25
TERADA, Fumiyuki: On a generalized principal ideal theorem............ . . . . . 6 (1954), 95–100
TERADA, Fumiyuki: A principal ideal theorem in the genus field......... . . . . 23 (1971), 697–718
TERAO, Hiroaki: The Jacobians and the discriminants of finite reflectiongroups........................................................................... . . . . 41 (1989), 237–247
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 97
TERAO, Hiroaki: see ORLIK , Peter and TERAO, Hiroaki, 45 (1993), 369–383
THANGAVELU, Sundaram: Transplantation, summability and multipliersfor multiple Laguerre expansions........................................... . . . . 44 (1992), 279–298
THOMSEN, Jesper F.:see BUCH, Anders, THOMSEN, Jesper F., LAU-RITZEN, Niels and MEHTA, Vikram, 49 (1997), 355–366
TIK , Han Khwat and KUIPERS, L.: Some remarks on the Cauchy indextheorem.......................................................................... . . . . . 9 (1957), 238–242
TODA, Nobushige: Sur quelques fonctions méromorphes d’ordre nul dans|z| < ∞ ......................................................................... . . . . 20 (1968), 384–393
TODA, Nobushige: Comparison betweenT (r, f ) and logM(r, f ) . . . . . . . . . . . 21 (1969), 291–296
TODA, Nobushige: Sur quelques fonctions entières ou méromorphes àl’égard de la conjecture de Paley............................................ . . . . 21 (1969), 654–667
TODA, Nobushige: Sur les combinaisons exceptionnelles de fonctionsholomorphes ; applications aux fonctions algébroïdes................... . . . . 22 (1970), 290–319
TODA, Nobushige: Sur le nombre de combinaisons exceptionnelles ; ap-plications aux fonctions algébroïdes........................................ . . . . 22 (1970), 480–491
TODA, Nobushige: On a modified deficiency of meromorphic functions. . . . 22 (1970), 635–658
TODA, Nobushige: Sur quelques combinaisons linéares exceptionnellesau sens de Nevanlinna........................................................ . . . . 23 (1971), 67– 95
TODA, Nobushige: Sur une généralisation du Théorème de Picard-Borel-Rémoundos..................................................................... . . . . 23 (1971), 105–115
TODA, Nobushige: On the functional equation∑p
i=0 aifnii = 1 .......... . . . . 23 (1971), 289–299
TODA, Nobushige: Le défaut modifié de systèmes et ses applications.... . . . . 23 (1971), 491–524
TODA, Nobushige: On the growth of meromorphic solutions of somealgebraic differential equations.............................................. . . . . 38 (1986), 599–608
TODOROV, Andrey N.:see KOBAYASHI, Ryoichi and TODOROV, AndreyN., 39 (1987), 341–363
TOJEIRO, Ruy: see DAJCZER, Marcos and TOJEIRO, Ruy, 45 (1993),43–49
TOJEIRO, Ruy: see DAJCZER, Marcos and TOJEIRO, Ruy, 47 (1995),117–123
TOKUNAGA, Hiro-o: Construction of triple coverings of a certain type ofalgebraic surfaces.............................................................. . . . . 42 (1990), 561–585
TOKUNO, Yasushi: The adjointness of the maps between the space ofJacobi forms and the space of modular forms............................. . . . . 46 (1994), 27– 34
TOMIYAMA , Jun: A remark on the invariants ofW ∗-algebras............. . . . . 10 (1958), 37– 41
TOMIYAMA , Jun: Generalized dimension function forW ∗-algebras ofinfinite type..................................................................... . . . . 10 (1958), 121–129
TOMIYAMA , Jun: On the projection of norm one inW ∗-algebras II..... . . . . . 10 (1958), 204–209
98 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TOMIYAMA , Jun: On the projection of norm one inW ∗-algebras, III. . . . . . . . 11 (1959), 125–129
TOMIYAMA , Jun: On the product projection of norm one in the directproduct of operator algebras................................................. . . . . 11 (1959), 305–313
TOMIYAMA , Jun: Tensor products of commutative Banach algebras. . . . . . . . . 12 (1960), 147–154
TOMIYAMA , Jun: see SAITÔ, Teishirô and TOMIYAMA , Jun, 12 (1960),455–458
TOMIYAMA , Jun and TAKESAKI , Masamichi: Applications of fibre bun-dles to the certain class ofC∗-algebras..................................... . . . . 13 (1961), 498–522
TOMIYAMA , Jun: Topological representation ofC∗-algebras.............. . . . . 14 (1962), 187–204
TOMIYAMA , Jun: A characterization ofC∗-algebras whose conjugatespaces are separable........................................................... . . . . 15 (1963), 96–102
TOMIYAMA , Jun: Some remarks on antisymmetric decompositions offunction algebras............................................................... . . . . 16 (1964), 340–344
TOMIYAMA , Jun: Applications of Fubini type theorem to the tensor prod-ucts ofC∗-algebras............................................................ . . . . 19 (1967), 213–226
TOMIYAMA , Jun:see HAKEDA, Jôsuke and TOMIYAMA , Jun, 19 (1967),315–323
TOMIYAMA , Jun: see ISHIKAWA, Hiroshi, TOMIYAMA , Jun and WADA,Junzô, 22 (1970), 48–55
TOMIYAMA , Jun: see TAKEMOTO, Hideo and TOMIYAMA , Jun, 25(1973), 273–289
TOMIYAMA , Jun and YABUTA, Kôzô: Toeplitz operators for uniform al-gebras............................................................................ . . . . 30 (1978), 117–129
TOMIYAMA , Jun: Inner derivations in the tensor products of operatoralgebras......................................................................... . . . . 32 (1980), 91– 97
TOMONAGA, Yasurô: Coefficients of cobordism decomposition.......... . . . . 13 (1961), 75– 93
TOMONAGA, Yasurô: Differentiable imbedding and cobordisrn of ori-entable manifolds.............................................................. . . . . 14 (1962), 15– 23
TOMONAGA, Yasurô: Generalized Hirzebruch polynomials............... . . . . 14 (1962), 321–327
TOMONAGA, Yasurô: Indecomposability of differentiable manifolds. . . . . . . . 14 (1962), 328–331
TOMONAGA, Yasurô: A-genus and differentiable imbedding.............. . . . . 15 (1963), 203–211
TOMONAGA, Yasurô: Mod 3 Pontryagin class and indecomposability ofdifferentiable manifolds...................................................... . . . . 16 (1964), 252–256
TOMONAGA, Yasurô: Monifolds admitting continuous field of frames... . . . . 16 (1964), 334–339
TOMONAGA, Yasurô: Onk-parallelizable manifolds........................ . . . . 17 (1965), 1– 6
TOMONAGA, Yasurô: Manifolds with constantp-sectional curvature.. . . . . . . 17 (1965), 223–226
TOMONAGA, Yasurô: Some properties of powers of manifolds........... . . . . 18 (1966), 362–367
TOMONAGA, Yasurô: Index and cobordism.................................. . . . . 19 (1967), 462–466
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 99
TOMONAGA, Yasurô: Pseudo-Jacobi fields on minimal varieties.......... . . . . 21 (1969), 539–547
TOMURO, Tomoji: SmoothSL(n,H ), Sp(n,C )-actions on(4n − 1)-manifolds....................................................................... . . . . 44 (1992), 243–250
TONDEUR, Philippe: see KAMBER, Franz W. and TONDEUR, Philippe,30 (1978), 373–422
TONDEUR, Philippe: see KAMBER, Franz W. and TONDEUR, Philippe,34 (1982), 525–538
TONDEUR, Philippe:see NISHIKAWA , Seiki and TONDEUR, Philippe, 40(1988), 599–611
TONDEUR, Philippe and VANHECKE, Lieven: Transversally symmetricRiemannian foliations......................................................... . . . . 42 (1990), 307–317
TOP, Jaap: A remark on the rank of jacobians of hyperelliptic curves overQ over certain elementary abelian 2-extensions........................... . . . . 40 (1988), 613–616
TOTH, Gabor:see GOLDBERG, Samuel I. and TOTH, Gabor, 39 (1987),365–372
TOTH, Gabor:see GOLDBERG, Samuel I. and TOTH, Gabor, 41 (1989),259–262
TRAUTNER, Rolf: Density properties of Hausdorff moment sequences. . . . . . 24 (1972), 347–352
TRAVAGLINI , Giancarlo:see BRANDOLINI , Luca and TRAVAGLINI , Gi-ancarlo, 49 (1997), 323–336
TREBELS, W.: see BUTZER, P. L., NESSEL, R. J. and TREBELS, W., 24(1972), 127–140
TREBELS, W.: see BUTZER, P. L., NESSEL, R. J. and TREBELS, W., 24(1972), 551–569
TREBELS, W.: see BUTZER, P. L., NESSEL, R. J. and TREBELS, W., 27(1975), 213–223
TREBELS, Walter: The principle of subordination and comparison theo-rems for approximation processes of Abel-bounded orthogonal expan-sions............................................................................. . . . . 35 (1983), 393–401
TSUBOI, Shôji and ÔKAWA , Masaki: Some results on the local moduli ofnon-singular normalizations of surfaces with ordinary singularities. . . . . . . 40 (1988), 269–291
TSUCHIDA, Kisuke: Operation and co-operation in the general categories. . . . 16 (1964), 15– 33
TSUCHIDA, Kisuke: Principal cofibrations.................................... . . . . 16 (1964), 321–333
TSUCHIDA, Kisuke: The homology decomposition for a cofibration. . .. . . . . . 17 (1965), 117–129
TSUCHIDA, Kisuke: Generalized James product and the Hopf construc-tion ............................................................................... . . . . 17 (1965), 319–334
TSUCHIDA, Kisuke: Cotriad and triad......................................... . . . . 18 (1966), 1– 12
TSUCHIDA, Kisuke: Generalized Puppe sequence and Spanier-Whitehead duality............................................................. . . . . 23 (1971), 37– 48
100 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TSUCHIHASHI, Hiroyasu: Compactifications of the moduli spaces of hy-perelliptie surfaces............................................................. . . . . 31 (1979), 319–347
TSUCHIHASHI, Hiroyasu: Higher dimensional analogues of periodic con-tinued fractions and cusp singularities...................................... . . . . 35 (1983), 607–639
TSUCHIHASHI, Hiroyasu: Deformations of three dimensional cusp sin-gularities........................................................................ . . . . 38 (1986), 379–385
TSUCHIHASHI, Hiroyasu: Certain compact complex manifolds with infi-nite cyclic fundamental groups.............................................. . . . . 39 (1987), 519–532
TSUCHIKURA, T.: see IZUMI , S., MATSUYAMA , N. and TSUCHIKURA,T., 5 (1953), 43–51
TSUCHIKURA, Tamotsu: Quelques propositions équivalentes àl’hypothèse du continu........................................................ . . . . . 1 (1949), 69– 76
TSUCHIKURA, Tamotsu: Notes on Fourier analysis (XXVI): Lipschitzcondition of partial sums of Fourier series................................. . . . . . 2 (1950), 24– 29
TSUCHIKURA, Tamotsu: On scme divergence problems................... . . . . . 2 (1950), 30– 39
TSUCHIKURA, Tamotsu: On the functionsCi(x, y) andSi(x, y) ......... . . . . . 2 (1950), 68– 73
TSUCHIKURA, Tamotsu: Arithmetic Means of Subsequences............. . . . . . 2 (1950), 188–191
TSUCHIKURA, Tamotsu: On the theory of series with function terms. . . . . . . . . 3 (1951), 104–113
TSUCHIKURA, Tamotsu: Some remarks on the Riemann sums............ . . . . . 3 (1951), 197–202
TSUCHIKURA, Tamotsu: On asymptotically absolute convergence....... . . . . . 3 (1951), 203–207
TSUCHIKURA, Tamotsu: On the functiont − [t] − 1/2 .................... . . . . . 3 (1951), 208–211
TSUCHIKURA, Tamotsu:see SUNOUCHI, Gen-ichiro and TSUCHIKURA,Tamotsu, 4 (1952), 153–156
TSUCHIKURA, Tamotsu: Absolute Cesàro summability of orthogonal se-ries............................................................................... . . . . . 5 (1953), 52– 66
TSUCHIKURA, Tamotsu: Absolute Cesàro Summability of orthogonal se-ries II (Coreection and remark to the previous paper).................... . . . . . 5 (1954), 302–312
TSUCHIKURA, Tamotsu: see IZUMI , Shin-ichi and TSUCHIKURA, Ta-motsu, 7 (1955), 243–251
TSUCHIKURA, Tamotsu: Some theorems on Fourier series................ . . . . . 8 (1956), 188–200
TSUCHIKURA, Tamotsu: Absolute summability of Rademacher series. . . . . . 10 (1958), 49– 59
TSUCHIKURA, Tamotsu:see KANNO, Kosi and TSUCHIKURA, Tamotsu,11 (1959), 456–479
TSUCHIKURA, Tamotsu: An application of a method of Marcinkiewiczto the absolute summability of Fourier series............................. . . . . 13 (1961), 491–497
TSUCHIKURA, Tamotsu:see KAZAMAKI , Norihiko and TSUCHIKURA,Tamotsu, 19 (1967), 297–302
TSUCHIKURA, Tamotsu: Sample properties of martingales and theirarithmetic means............................................................... . . . . 20 (1968), 400–415
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 101
TSUCHIKURA, Tamotsu and YAMASAKI , Motohiro: Martingale se-quence of bounded variation................................................. . . . . 28 (1976), 123–127
TSUCHIYA, Nobuo: Leaves with non-exact polynomial growth........... . . . . 32 (1980), 71– 77
TSUCHIYA, Nobuo: The Nishimori decompositions of codimension-onefoliations and the Godbillon-Vey classes................................... . . . . 34 (1982), 343–365
TSUJI, Hajime: Complex structures onS3 × S3 ............................. . . . . 36 (1984), 351–376
TSUJI, Hajime: Complete negatively pinched Kähler surfaces of finitevolume.......................................................................... . . . . 40 (1988), 591–590
TSUJI, Masatsugu: On Borel’s Driections of Meromorphic Functions ofFinite Order..................................................................... . . . . . 2 (1950), 97–112
TSUJI, Masatsugu: Beuling’s Theorem on Exceptional Sets............... . . . . . 2 (1950), 113–125
TSUJI, Masatsugu: On Positive Definite Sequences and Functions. . . . . . . . . . . . 2 (1950), 142–165
TSUJI, Masatsugu: On meromorphic functions with essential singularitiesof logarithmic capacity zero................................................. . . . . . 3 (1951), 1– 6
TSUJI, Masatsugu: A deformation theorem on conformal mapping....... . . . . . 3 (1951), 7– 12
TSUJI, Masatsugu: A theorem on the majoration of harmonic measureand its applications............................................................ . . . . . 3 (1951), 13– 23
TSUJI, Masatsugu: On a regular function which is of constant absolutevalue on the boundary of an infinite domain............................... . . . . . 3 (1951), 24– 38
TSUJI, Masatsugu: On the uniformization of an algebraic function ofgenusp ≥ 2 .................................................................... . . . . . 3 (1951), 277–281
TSUJI, Masatsugu: On the order of the derivative of a meromorphic func-tion ............................................................................... . . . . . 3 (1951), 282–284
TSUJI, Masatsugu: Existence of a potential function with a prescribedsingularity on any Riemann surface......................................... . . . . . 4 (1952), 54– 68
TSUJI, Masatsugu: On F. Riesz’ fundamental theorem on subharmonicfunctions........................................................................ . . . . . 4 (1952), 131–140
TSUJI, Masatsugu: An extension of Bloch’s theorem and its applicationsto normal family............................................................... . . . . . 4 (1952), 203–205
TSUJI, Masatsugu: On covering surfaces of a closed Riemann surface ofgenusp ≥ 2 .................................................................... . . . . . 5 (1953), 185–188
TSUJI, Tadashi: The irreducibility of an affine homogeneous convex do-main............................................................................. . . . . 36 (1984), 203–216
TSUJI, Tadashi and SHIMIZU , Satoru: The irreducible decomposition ofan affine homogeneous convex domain.................................... . . . . 38 (1986), 371–378
TSUKADA, Kazumi: Locally symmetric Einstein Kaehler manifolds andspectral geometry.............................................................. . . . . 31 (1979), 255–259
TSUKADA, Kazumi: The first eigenvalue of the Laplacian on tori. . . . . . . . . . . . 33 (1981), 395–407
102 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
TSUKADA, Kazumi: Curvature homogeneous hypersurfaces immersed ina real space form............................................................... . . . . 40 (1988), 221–244
TSUKAMOTO, Yôtarô: On certain Riemannian manifolds of positivecurvture......................................................................... . . . . 18 (1966), 44– 49
TSUKAMOTO, Yôtarô: Closed geodesics on certain Riemannian mani-folds of positive curvature.................................................... . . . . 18 (1966), 138–143
TSUKAMOTO, Yôtarô: Some corrections to “Closed geodesics on certainRiemannian manifolds of positive curvature”............................. . . . . 21 (1969), 674–675
TSUKAMOTO, Yôtarô: see NAGAYOSHI, Takatoshi and TSUKAMOTO,Yôtarô, 25 (1973), 213–218
TSUNODA, Hiroshi: Complete special affine flows without closed orbitson 3-dimensional torus bundle over circle................................. . . . . 49 (1997), 537–555
TSURUMI, Shigeru: On the ergodic theorem.................................. . . . . . 6 (1954), 53– 68
TSURUMI, Shigeru: On general ergodic theorems........................... . . . . . 6 (1954), 264–273
TSURUMI, Shigeru: Errata : On the ergodic theorem........................ . . . . . 6 (1954), 275
TSURUMI, Shigeru: On the strong law of large numbers................... . . . . . 7 (1955), 166–170
TSURUMI, Shigeru: On general ergodic theorems II........................ . . . . . 9 (1957), 1– 12
TSURUMI, Shigeru: On the ergodic theorems concerning Markov pro-cesses............................................................................ . . . . 10 (1958), 146–164
TSURUMI, Shigeru: On the construction of a probability measure on thespace of Borel-Radon measures............................................. . . . . 29 (1977), 601–605
TSURUMI, Shigeru:see HASEGAWA, Shigeru, SATO, Ryotaro and TSU-RUMI, Shigeru, 30 (1978), 95–106
TSURUMI, Shigeru: see YAMADA , Atsushi and TSURUMI, Shigeru, 35(1983), 53–63
TUCKER, Don H.: see PETERSON, G. E. and TUCKER, Don H., 21(1969), 170–189
TURNER, T. Rolf: Double commutants of isometries....................... . . . . 24 (1972), 547–549
TURUMARU, T.: see NAKAMURA , M., TAKEDA, Z. and TURUMARU, T.,5 (1953), 190–193
TURUMARU, Takasi: see NAKAMURA , Masahiro and TURUMARU,Takasi, 4 (1952), 1–9
TURUMARU, Takasi: On the direct-product of operator algebras I........ . . . . . 4 (1952), 242–451
TURUMARU, Takasi: see NAKAMURA , Masahiro and TURUMARU,Takasi, 4 (1952), 303–308
TURUMARU, Takasi: On the direct-product of operator algebras II....... . . . . . 5 (1953), 1– 7
TURUMARU, Takasi: see NAKAMURA , Masahiro and TURUMARU,Takasi, 6 (1954), 174–176
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 103
TURUMARU, Takasi: see NAKAMURA , Masahiro and TURUMARU,Takasi, 6 (1954), 182–188
TURUMARU, Takasi: On the direct-product of operator algebras, III. . . . . . . . . . 6 (1954), 208–211
TURUMARU, Takasi: see NAKAMURA , Masahiro and TURUMARU,Takasi, 6 (1954), 253–257
TURUMARU, Takasi: On the direct product of operator algebras IV.. .. .. . . . . . 8 (1956), 281–285
TURUMARU, Takasi: Crossed product of operator algebra................. . . . . 10 (1958), 355–365
UCHIDA, Fuichi: A note on the generalized homology theory............. . . . . 16 (1964), 81– 89
UCHIDA, Fuichi: Immersions and embeddings of tangent bundles........ . . . . 17 (1965), 161–170
UCHIDA, Fuichi: Immersions of lens spaces.................................. . . . . 18 (1966), 393–397
UCHIDA, Fuichi: K-theory of Lens-Like spaces andS1-actions onS2m+1 × S2n+1 ................................................................. . . . . 25 (1973), 201–211
UCHIDA, Fuichi: Real analyticSL(n,R) actions on spheres.............. . . . . 33 (1981), 145–175
UCHIDA, Fuichi: see NAKANISHI , Akio and UCHIDA, Fuichi, 36 (1984),81–98
UCHIDA, Fuichi: On a method to construct analytic actions of non-compact Lie groups on a sphere............................................. . . . . 39 (1987), 61– 69
UCHIDA, Fuichi: Certain aspects of twisted linear actions, II.............. . . . . 41 (1989), 561–573
UCHIDA, Fuichi: On smoothSO0(p, q)-actions onSp+q−1, II ............ . . . . 49 (1997), 185–202
UCHIDA, Kôji: Remarks on Grothendieck rings............................. . . . . 19 (1967), 341–348
UCHIDA, Kôji: On Tate’s duality theorems in Galois cohomology........ . . . . 21 (1969), 92–101
UCHIDA, Kôji: Unramified extensions of quadratic number fields, I. . . . . . . . . 22 (1970), 138–141
UCHIDA, Kôji: Unramified extensions of quadratic number fields, II. . . . . . . . 22 (1970), 220–224
UCHIDA, Kôji: Galois group of an equationXn − aX + b = 0 ........... . . . . 22 (1970), 670–678
UCHIDA, Kôji: Class numbers of imaginary abelian number fields, I. . . . . . . . 23 (1971), 97–104
UCHIDA, Kôji: Class numbers of imaginary abelian number fields, II. . . . . . . 23 (1971), 335–348
UCHIDA, Kôji: Class numbers of imaginary abelian number fields, III. . . . . . 23 (1971), 573–580
UCHIDA, Kôji: Imaginary abelian number fields with class number 1.... . . . . 24 (1972), 487–499
UCHIDA, Kôji: Relative class numbers of normalCM-fields.............. . . . . 25 (1973), 347–353
UCHIDA, Kôji: On Artin L-functions.......................................... . . . . 27 (1975), 75– 81
UCHIDA, Kôji and YOSHIHARA, Hisao: Discontinuous groups of affinetransformations ofC3 ......................................................... . . . . 28 (1976), 89– 94
UCHIDA, Kôji: Isomorphisms of Galois groups of solvably closed Galoisextensions....................................................................... . . . . 31 (1979), 359–362
UCHIDA, Kôji: Galois groups of unramified solvable extensions.......... . . . . 34 (1982), 311–317
104 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
UCHIDA, Kôji: On Silverman’s estimate of regulators...................... . . . . 46 (1994), 141–145
UCHIYAMA , Akihito: On the compactness of operators of Hankel type.. . . . . 30 (1978), 163–171
UCHIYAMA , Akihito: Weight functions on probability spaces............. . . . . 30 (1978), 463–470
UDAGAWA, Seiichi: Classification of pluriharmonic maps from compactcomplex manifolds with positive first Chern class into complex Grass-mann manifolds................................................................ . . . . 46 (1994), 367–391
UEDA, Tetsuo: Compactifications ofC × C∗ and(C∗)2 ................... . . . . 31 (1979), 81– 90
UEHARA, Hiroshi: see SHEKOURY, Raymond N. and UEHARA, Hiroshi,15 (1963), 299–314
UENO, Keisuke: The Dirichlet problem for harmonic maps betweenDamek-Ricci spaces........................................................... . . . . 49 (1997), 565–575
UENO, Kenji: An appendix to the paper of Ashikaga....................... . . . . 33 (1981), 210–214
UESU, Kagumi: Hadamard manifolds and the visibility axiom............ . . . . 40 (1988), 27– 34
UMEGAKI , Hisaharu: On the uniform space.................................. . . . . . 2 (1950), 57– 63
UMEGAKI , Hisaharu: Compact Set in Uniform Space and FunctionsSpaces........................................................................... . . . . . 2 (1951), 292–298
UMEGAKI , Hisaharu: Conditional expectation in an operator algebra.... . . . . . 6 (1954), 177–181
UMEGAKI , Hisaharu: Positive definite function and direct product ofHilbert spaces.................................................................. . . . . . 7 (1955), 206–211
UMEGAKI , Hisaharu: Conditional expectation in an operator algebra, II. . . . . 8 (1956), 86–100
UMEHARA, Masaaki: Einstein Kaehler submanifolds of a complex linearor hyperbolic space............................................................ . . . . 39 (1987), 385–389
UMEHARA, Masaaki:see ROSSMAN, Wayne, UMEHARA, Masaaki andYAMADA , Kotaro, 49 (1997), 449–484
UMEZAWA, Toshio: Analytic functions star-like of orderp in one direc-tion ............................................................................... . . . . . 4 (1952), 264–271
UMEZAWA, Toshio: On the theory of univalent functions.................. . . . . . 7 (1955), 212–228
UNNI, K. R.: Inequalities for weighted entire functions.................... . . . . 18 (1966), 274–282
UNNI, K. R. and GEETHA, P. K.: On multiplier transformations.......... . . . . 23 (1971), 155–168
UNO, Yoshikazu: Operating functions on some subspaces oflp ........... . . . . 20 (1968), 60– 72
UNO, Yoshikazu: see IGARI, Satoru and UNO, Yoshikazu, 21 (1969),668–673
UNO, Yoshikazu:see IGARI, Satoru and UNO, Yoshikazu, 22 (1970), 142
URAKAWA , Hajime:see BANDO, Shigetoshi and URAKAWA , Hajime, 35(1983), 155–172
URAKAWA , Hajime: Reflection groups and the eigenvalue problems ofvibrating membranes with mixed boundary conditions.................. . . . . 36 (1984), 175–183
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 105
URAKAWA , Hajime: Lower bounds for the eigenvalues of the fixed vi-brating membrane problems................................................. . . . . 36 (1984), 185–189
URAKAWA , Hajime: see MUTO, Hideo, OHNITA, Yoshihiro andURAKAWA , Hajime, 36 (1984), 253–267
URAKAWA , Hajime: see KATSUDA, Atsushi and URAKAWA , Hajime, 51(1999), 267–281
URATA, Toshio: Holomorphic mappings into taut complex analyticspaces............................................................................ . . . . 31 (1979), 349–353
URATA, Toshio: Holomorphic mappings onto a certain compact complexanalytic space.................................................................. . . . . 33 (1981), 573–585
URBANO, Francisco:see BARROS, Manuel and URBANO, Francisco, 39(1987), 575–588
URBANO, Francisco:see CASTRO, Ildefonso and URBANO, Francisco,45 (1993), 565–582
USUI, Sampei: A numerical criterion for admissibility of semi-simpleelements......................................................................... . . . . 45 (1993), 471–484
USUI, Sampei: Complex structures on partial compactifications of arith-metic quotients of classifying spaces of Hodge structures............... . . . . 47 (1995), 405–429
UTAGAWA, Masatomo: see SUNOUCHI, Gen-ichirô and UTAGAWA,Masatomo, 1 (1949), 95–99
VÄISÄLÄ , Jussi: Uniform domains............................................. . . . . 40 (1988), 101–118
VAISMAN, Izu: On the Sasaki-Hsu contact structure of the Brieskornmanifolds....................................................................... . . . . 30 (1978), 553–560
VALLI , Giorgio: Holomorphic maps from compact manifolds into loopgroups as Blaschke products................................................. . . . . 45 (1993), 393–422
VAMANAMURTHY , M. K.: see ANDERSON, G. D. and VAMANA -MURTHY, M. K., 23 (1971), 605–620
VAMANAMURTHY , Mavina K.: see ANDERSON, Glen D. and VAMANA -MURTHY, Mavina K., 34 (1982), 133–139
VAMANAMURTHY , Mavina K.: see ANDERSON, Glen D. and VAMANA -MURTHY, Mavina K., 37 (1985), 533–540
VAMANAMURTHY , Mavina K.: see ANDERSON, Glen D. and VAMANA -MURTHY, Mavina K., 40 (1988), 1–25
VAN DE WOESTIJNE, Ignace and VERSTRAELEN, Leopold: Semi-symmetric Lorentzian hypersurfaces....................................... . . . . 39 (1987), 81– 88
VANHECKE, Lieven: see BLAIR , David and VANHECKE, Lieven, 39(1987), 373–383
VANHECKE, Lieven: see TONDEUR, Philippe and VANHECKE, Lieven,42 (1990), 307–317
VANHECKE, Lieven: see PERRONE, Domenico and VANHECKE, Lieven,43 (1991), 243–248
106 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
VARAGNOLO, Michela: see BOFFI, Giandomenico and VARAGNOLO,Michela, 48 (1996), 303–316
VARMA, Arun Kumar: Inequalities for polynomials and their derivativesII ................................................................................. . . . . 20 (1968), 265–288
VÂRSAN, Constantin: Asymptotic almost periodic solutions for stochas-tic differential equations...................................................... . . . . 41 (1989), 609–618
VARSHNEY, O. P.: On the relation between harmonic summability andsummability by Riesz means of certain type.............................. . . . . 11 (1959), 20– 24
VARSHNEY, O. P.: On Iyengar’s tauberian theorem for Nörlund summa-bility ............................................................................. . . . . 16 (1964), 105–110
VASERSTEIN, Leonid N.: On full subgroups of Chevalley groups.. .. .. .. . . . . 37 (1985), 423–454
VASERSTEIN, Leonid N.: On normal subgroups of Chevalley groups overcommutative rings............................................................. . . . . 38 (1986), 219–230
VASILESCU, F.-H.: Residually decomposable operators in Banach spaces. . . . 21 (1969), 509–522
VASUDEVA, H.: see PYM, J. S. and VASUDEVA, H., 26 (1974), 25–33
VERNON, Micheal H.: Contact hypersurfaces of a complex hyperbolicspace............................................................................. . . . . 39 (1987), 215–222
VERSTRAELEN, Leopold: see VAN DE WOESTIJNE, Ignace and VER-STRAELEN, Leopold, 39 (1987), 81–88
VERSTRAELEN, Leopold:see CHEN, Bang-Yen, DILLEN, Franki, VER-STRAELEN, Leopold and VRANCKEN, Luc, 47 (1995), 185–198
VERSTRAELEN, Leopold:see DESZCZ, Ryszard, DILLEN, Franki, VER-STRAELEN, Leopold and VRANCKEN, Luc, 51 (1999), 461–478
VISHWANATH, Periyapatna A.:see RAGHAVENDRA, Nyshadham andVISHWANATH, Periyapatna A., 46 (1994), 321–340
VRANCEANU, G.: Sur les espaces à connexion proiective dont le grouped’holonomie fixe une quadrique............................................. . . . . . 4 (1952), 103–108
VRANCKEN, Luc: Affine surfaces with higher order parallel cubic form. . . . 43 (1991), 127–139
VRANCKEN, Luc: see CHEN, Bang-Yen, DILLEN, Franki, VERSTRAE-LEN, Leopold and VRANCKEN, Luc, 47 (1995), 185–198
VRANCKEN, Luc: see DESZCZ, Ryszard, DILLEN, Franki, VERSTRAE-LEN, Leopold and VRANCKEN, Luc, 51 (1999), 461–478
VRKOC, Ivo: Scorza-Dragoni property of Filippov mappings............. . . . . 32 (1980), 309–316
VUORINEN, Matti: see MIKLYUKOV , Vladimir M. and VUORINEN,Matti, 50 (1998), 503–511
WADA, Hidekazu: On the structure of a sphere bundle...................... . . . . . 3 (1951), 136–139
WADA, Hidekazu: On mappings from complexes into the complex pro-jective space.................................................................... . . . . . 4 (1952), 69– 76
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 107
WADA, Hidekazu: Über eine Vereinigung der Sätze von H. Hopf und N.Bruschlinsky.................................................................... . . . . . 4 (1952), 77– 79
WADA, Hidekazu: Über die Abbildungen vom Komplexe auf den unger-aden dimensionalen reellen projektiven Raum............................ . . . . . 4 (1952), 231–241
WADA, Hidekazu: Irrtümer...................................................... . . . . . 5 (1954), 313–313
WADA, Hidekazu: On the asphericity of the higher dimensional complex. . . . . 7 (1955), 9– 13
WADA, Hidekazu: Note on some mapping spaces........................... . . . . 10 (1958), 143–145
WADA, Junzô: see ISHIKAWA, Hiroshi, TOMIYAMA , Jun and WADA,Junzô, 22 (1970), 48–55
WADA, Ryoko: On the Fourier-Borel transformations of analytic func-tionals on the complex sphere............................................... . . . . 38 (1986), 417–432
WADA, Tôru: see IZUMI , Yosihisa and WADA, Tôru, 7 (1955), 132–135
WADA, Tôru: Note on a theorem of Hilton................................... . . . . . 8 (1956), 324–328
WADA, Toru: Note on suspension and Hopf invariant....................... . . . . 12 (1960), 361–368
WADA, Tôru: SmoothSp(n)-actions on cohomology quaternion projec-tive spaces...................................................................... . . . . 29 (1977), 375–384
WAKAKUWA , Hidekiyo: On Riemann spaces whose homogeneous holo-nomy groups are integrable.................................................. . . . . . 4 (1952), 96– 98
WAKAKUWA , Hidekiyo: Onn-dimensional Riemannian spaces admittingsome groups of motions of order less thann(n− 1)/2 .................. . . . . . 6 (1954), 121–134
WAKAKUWA , Hidekiyo: On Riemannian manifolds with homogeneousholonomy groupSp(n) ....................................................... . . . . 10 (1958), 274–303
WAKAKUWA , Hidekiyo: On affinely connected manifolds with homoge-neous holonomy groupsCL(n,Q)
⊗T 1 ................................. . . . . 11 (1959), 364–375
WAKAKUWA , Hidekiyo: On almost complex symplectic manifoldsand affine connections with restricted homogeneous holonomy groupSp(n,C) ........................................................................ . . . . 12 (1960), 175–202
WAKAKUWA , Hidekiyo: On linearly independent almost complex struc-tures in a differentiable manifold............................................ . . . . 13 (1961), 393–422
WAKAKUWA , Hidekiyo: Remarks on 4-dimensional differentiable mani-folds ............................................................................. . . . . 16 (1964), 154–172
WAKAKUWA , Hidekiyo: On 1st Chern form and holonomy algebra of aKähler manifold................................................................ . . . . 20 (1968), 248–253
WAKAKUWA , Hidekiyo: Subgroup of some Lie group as a Riemanniansubmanifold.................................................................... . . . . 25 (1973), 499–501
WALKER, John Andrew:see CARVALHO, Luis Antonio Viera, INFANTE,Ettore Ferrari and WALKER, John Andrew, 32 (1980), 283–297
WANG, Cecilia:see SARIO, Leo and WANG, Cecilia, 26 (1974), 85–93
108 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
WANG, Cecilia:see CHUNG, Lung Ock, SARIO, Leo and WANG, Cecilia,32 (1980), 439–445
WANG, Jian-pan:see BAI , Yuan-huai, WANG, Jian-pan and WEN, Ke-xin, 40 (1988), 633–643
WANG, Jian-pan:see PARSHALL, Brian and WANG, Jian-pan, 44 (1992),395–423
WANG, Junyu, ZHENG, Dawei and WANG, Xuekong: A free boundaryproblem for a nonlinear second order differential equation involving asmall parameter................................................................ . . . . 44 (1992), 233–242
WANG, Junyu, GAO, Wenjie and LIN, Zhenghua: Boundary value prob-lems for general second order equations and similarity solutions to theRayleigh problem.............................................................. . . . . 47 (1995), 327–344
WANG, Junyu and JIANG, Daqing: A singular nonlinear second-orderperiodic boundary value problem........................................... . . . . 50 (1998), 203–210
WANG, Junyu and GAO, Wenjie: Uniqueness, existence and nonexistenceof normal solutions to a problem in boundary layer theory............. . . . . 51 (1999), 539–553
WANG, Ke: The existence of limit cycles of nonlinear oscillation equa-tions.............................................................................. . . . . 42 (1990), 1– 16
WANG, Shengwang and ERDELYI, Ivan: The spectral decompositionproperty of the sum and product of two commuting operators. . . . . . . . . . . . . 41 (1989), 657–672
WANG, Shengwang and ERDELYI, Ivan: Abel-ergodic properties ofpseudo-resolvents and applications to semigroups....................... . . . . 45 (1993), 539–554
WANG, Xuekong: see WANG, Junyu, ZHENG, Dawei and WANG,Xuekong, 44 (1992), 233–242
WANG, Zhicheng: Comparison method and stability problem in func-tional differential equations.................................................. . . . . 35 (1983), 349–356
WANG, Zhicheng, LI, Zhixiang and WU, Jianhong: Stability propertiesof solutions of linear Volterra integrodifferential equations............. . . . . 37 (1985), 455–462
WANG, Zhicheng: Periodic solutions of linear neutral integrodifferentialequations........................................................................ . . . . 38 (1986), 71– 83
WANG, Zhicheng: A necessary and sufficient condition for the oscillationof higher-order neutral equations............................................ . . . . 41 (1989), 575–588
WANG, Zhicheng:see MA, Shiwang, YU, Jianshe and WANG, Zhicheng,50 (1998), 513–529
WARNER, Garth: A characterization of the stable invariant integral. . . . . . . . . . 38 (1986), 179–197
WATABE, Tsuyoshi: Semisimple degree of symmetry and maps of non-zero degree into a product of 1-spheres and 2-shperes................... . . . . 37 (1985), 33– 42
WATANABE, Hideaki: L’uniformisation et la séparabilité des ensemblesplans I: Théorèmes fondamentaux.......................................... . . . . . 4 (1952), 38– 48
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 109
WATANABE, Hideaki: L’uniformisation et la séparabilité des ensemblesplans II, Applications aux problèmes de l’uniformisation et de la sé-parabilité........................................................................ . . . . . 4 (1952), 257–263
WATANABE, Hideaki: Une remarque sur l’uniformisation des ensemblesanalytiques plans............................................................... . . . . . 5 (1953), 79– 82
WATANABE, Hiroshi: Summability of double Fourier series............... . . . . 17 (1965), 150–160
WATANABE, Kimio: Distribution formula for terminal singularities on theminimal resolution of a quasi-homogeneous simpleK3 singularity... . . . . 43 (1991), 275–288
WATANABE, Kimio: see ISHII, Shihoko and WATANABE, Kimio, 44(1992), 19–24
WATANABE, Kinji: On the uniqueness of the Cauchy problem for certainelliptic equations with triple characteristics............................... . . . . 23 (1971), 473–490
WATANABE, Kinji: On the boundedness of pseudo-differential operatorsof typeρ, δ with 0 ≤ ρ = δ < 1 ............................................ . . . . 25 (1973), 339–345
WATANABE, Kinji: Sur l’unicité dans le problème de Cauchy pour lesopérateurs différentiels à caractéristiques de multiplicité constante. . . . . . . 31 (1979), 151–164
WATANABE, Kinji: Sur l’unicité du prolongement des solutions des équa-tions elliptiques dégénérées.................................................. . . . . 34 (1982), 239–249
WATANABE, Satoshi:see SUZUKI , Yoshiya and WATANABE, Satoshi, 21(1969), 65–83
WATANABE, Shôichi: An integral basis for a field generated byl-th rootsof rational numbers over the rational number field....................... . . . . 44 (1992), 219–231
WATANABE, Sin-ichi: The Galois groups of local fields.................... . . . . 29 (1977), 385–416
WATANABE, Takao: Hypercuspidality of automorphic cuspidal represen-tations of the unitary groupU(2, 2) ......................................... . . . . 39 (1987), 259–279
WATANABE, Takao: Euler factors attached to unramified principal seriesrepresentations................................................................. . . . . 40 (1988), 491–534
WATANABE, Takao: The local theta correspondence of irreducible type 2dual reductive pairs............................................................ . . . . 47 (1995), 521–540
WATANABE, Yoshiyuki: see TAKAMATSU , Kichiro and WATANABE,Yoshiyuki, 24 (1972), 435–440
WATANABE, Yoshiyuki: see TAKAGI , Hitoshi and WATANABE,Yoshiyuki, 25 (1973), 185–195
WATANABE, Yoshiyuki: On the characteristic function of harmonic Käh-lerian spaees.................................................................... . . . . 27 (1975), 13– 24
WATARI , Chinami: A generalization of Haar functions..................... . . . . . 8 (1956), 286–290
WATARI , Chinami: On generalized Walsh Fourier series................... . . . . 10 (1958), 211–241
WATARI , Chinami: see SUNOUCHI, Gen-ichiro and WATARI , Chinami,11 (1959), 480–488
WATARI , Chinami: Best approximation by Walsh polynomials............ . . . . 15 (1963), 1– 5
110 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
WATARI , Chinami: A note on saturation and best approximation. .... ... . . . . . 15 (1963), 273–276
WATARI , Chinami: Mean convergence of Walsh Fourier series............ . . . . 16 (1964), 183–188
WATARI , Chinami: Multipliers for Walsh Fourier series.................... . . . . 16 (1964), 239–251
WATARI , Chinami: On decomposition of Walsh Fourier series............ . . . . 17 (1965), 76– 86
WATARI , Chinami and OKUYAMA , Yasuo: Approximation property offunctions and absolute convergenee of Fourier series.................... . . . . 27 (1975), 129–134
WATSON, Bill: δ-commuting mappings and Betti numbers................ . . . . 27 (1975), 135–152
WEI, Juncheng: On the interior spike layer solutions to a singularly per-turbed Neumann problem.................................................... . . . . 50 (1998), 159–178
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WELTERS, Gerald E.: On the etale cohomology of torsors for abelianschemes......................................................................... . . . . 47 (1995), 297–326
WEN, Ke-xin: see BAI , Yuan-huai, WANG, Jian-pan and WEN, Ke-xin,40 (1988), 633–643
WENG, Lin: Singular moduli and the Arakelov intersection............... . . . . 47 (1995), 345–356
WILLIAMS , Floyd L.: see FISCHER, Hans R. and WILLIAMS , Floyd L.,36 (1984), 233–251
WILLIAMS , J. P.:see STAMPFLI, J. G. and WILLIAMS , J. P., 20 (1968),417–424
WILLIG , Paul: Generators and direct integral decompositions ofW ∗-algebras......................................................................... . . . . 26 (1974), 35– 37
WILLIG , Paul: ContinuousW ∗-algebras are non-normal................... . . . . 26 (1974), 483–486
WOLK, E. S.: A characterization of distributive lattices.................... . . . . 10 (1958), 32– 36
WONG, Pui-Kei: Wirtinger type inequalities and elliptic differential in-equalities........................................................................ . . . . 23 (1971), 117–127
WONG, Yung-Chow: Fields of isocline tangent planes along a curve in aEuclidean 4-space............................................................. . . . . . 3 (1951), 322–329
WONG, Yung-Chow: Linear connections and quasi-connections on a dif-ferentiable manifold........................................................... . . . . 14 (1962), 48– 63
WONG, Yung-Chow and YOUNG, Samuel S. H.: On the lengths and thenumbers of congruence classes of closed geodesics in Grassmann man-ifolds ............................................................................. . . . . 22 (1970), 604–612
WONG, Yung-chow and LAI , Hon-Fei: A critical examination of the the-ory of curves in three dimensional differential geometry................ . . . . 19 (1967), 1– 31
WU, Hongyou: On the dressing action of loop groups on constant meancurvature surfaces.............................................................. . . . . 49 (1997), 599–621
WU, Jianhong:see WANG, Zhicheng, LI, Zhixiang and WU, Jianhong,37 (1985), 455–462
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 111
WU, Jianhong:see HADDOCK, John R., NKASHAMA , M. N. and WU,Jianhong, 41 (1989), 689–710
WU, Jianhong: Global continua of periodic solutions to some difference-differential equations of neutral type....................................... . . . . 45 (1993), 67– 88
WU, Jianhong:see XIA, Huaxing and WU, Jianhong, 48 (1996), 391–416
WU, Yumei: see KARAKOSTAS, George, STAVROULAKIS , I. P. and WU,Yumei, 45 (1993), 583–605
XIA, Huaxing and WU, Jianhong: Nonlinear oscillations in a discretediffusive neutral logistic equation........................................... . . . . 48 (1996), 391–416
XU, Daoyi: Integro-differential equations and delay integral inequalities. . . . 44 (1992), 365–378
YABUTA, Kôzô: Some remarks on Wiener’s quasi-Tauberian theoremsand the summability of Fourier series...................................... . . . . 22 (1970), 109–116
YABUTA, Kôzô: Quasi-Tauberian theorems, applied to the summabilityof Fourier series by Riesz’s logarithmic means........................... . . . . 22 (1970), 117–129
YABUTA, Kôzô: Extreme points and outer functions inH 1(Un) .......... . . . . 22 (1970), 320–324
YABUTA, Kôzô: Remarks on extremum problems inH 1 ................... . . . . 23 (1971), 129–137
YABUTA, Kôzô: Some uniqueness theorems forHp(Un) functions...... . . . . 24 (1972), 353–357
YABUTA, Kôzô: On the distribution of values of functions in some func-tion classes in the abstract Hardy space theory............................ . . . . 25 (1973), 89–102
YABUTA, Kôzô: On bounded functions in the abstract Hardy space the-ory ............................................................................... . . . . 26 (1974), 77– 84
YABUTA, Kôzô: On bounded functions in the abstract Hardy space theoryII ................................................................................. . . . . 26 (1974), 513–533
YABUTA, Kôzô: On bounded functions in the abstract Hardy space theoryIII ................................................................................ . . . . 27 (1975), 111–128
YABUTA, Kôzô: On the distributions of bounded functions in the abstractHardy space theory and some of their applications....................... . . . . 29 (1977), 137–155
YABUTA, Kôzô: see TOMIYAMA , Jun and YABUTA, Kôzô, 30 (1978),117–129
YABUTA, Kôzô: see SATO, Hajime and YABUTA, Kôzô, 30 (1978), 153–162
YABUTA, Kôzô: Correction to “On the distributions of bounded functionsin the abstract Hardy space theory and some of their applications”.... . . . . 30 (1978), 173
YABUTA, Kôzô: A multilinearization of Littlewood-Paley’sg-functionand Carleson measures........................................................ . . . . 34 (1982), 251–275
YABUTA, Kôzô: Bilinear Fourier multipliers................................. . . . . 35 (1983), 541–555
YAJIMA, Kenji: Boundedness and continuity of the fundamental solutionof the time dependent Schrödinger equation with singular potentials. . . . . 50 (1998), 577–595
YAMADA , Asahiko: Small deformations of certain compact manifolds ofClassL .......................................................................... . . . . 38 (1986), 99–122
112 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
YAMADA , Atsushi and TSURUMI, Shigeru: Mathematical foundation ofgeneral cooperative fuzzy games............................................ . . . . 35 (1983), 53– 63
YAMADA , Kotaro:see ROSSMAN, Wayne, UMEHARA, Masaaki and YA-MADA , Kotaro, 49 (1997), 449–484
YAMAGUCHI , Seiichi: On the integrability of aD-Killing equation in aSasakian space................................................................. . . . . 22 (1970), 517–524
YAMAMOTO, Hiro-o: Limit sets of some Kleinian groups................. . . . . 27 (1975), 91– 97
YAMAMOTO, Hiro-o: A theorem on limits of kleinian groups............. . . . . 27 (1975), 273–283
YAMAMOTO, Hiro-o: Constructibility and geometric finiteness ofKleinian groups................................................................ . . . . 32 (1980), 353–362
YAMAMOTO, Hiro-o: Pinching deformations of Fuchsian groups......... . . . . 33 (1981), 443–452
YAMAMOTO, Hiro-o: see SEKIGAWA, Hisao and YAMAMOTO, Hiro-o,38 (1986), 365–370
YAMAMURO, Sadayuki: On the semigroup of differentiable mappings onMontel space................................................................... . . . . 24 (1972), 359–370
YAMAMURO, Sadayuki:see ROBINSON, Derek W. and YAMAMURO, Sa-dayuki, 35 (1983), 375–386
YAMASAKI , Hisashi: On products of Hochschild groups................... . . . . 11 (1959), 147–161
YAMASAKI , Masayuki: see KATO, Mitsuyoshi, KOJIMA, Sadayoshi,OHKAWA , Tetsusuke and YAMASAKI , Masayuki, 31 (1979), 525–535
YAMASAKI , Motohiro: Note on stopped averages of martingales......... . . . . 24 (1972), 41– 44
YAMASAKI , Motohiro: see TSUCHIKURA, Tamotsu and YAMASAKI ,Motohiro, 28 (1976), 123–127
YAMASAKI , Motohiro: Another convergence theorem of martingales inthe limit ......................................................................... . . . . 33 (1981), 555–559
YAMASHITA , Chitose: An elementary and purely synthetic proof for thedouble six theorem of Schläfli............................................... . . . . . 5 (1954), 215–219
YAMASHITA , Hitoshi: The second cohomology groups of the group ofunits of aZp-extension....................................................... . . . . 36 (1984), 75– 80
YAMASHITA , Shinji: Some remarks on analytic continuations............ . . . . 21 (1969), 328–335
YAMASHITA , Shinji: Cluster sets of algebroid functions................... . . . . 22 (1970), 273–289
YAMAZAKI , Tsutomu: A construction ofK-contact manifolds by a fiberjoin ............................................................................... . . . . 51 (1999), 433–446
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YANAGIDA , Eiji: see KABEYA, Yoshitsugu, YANAGIDA , Eiji and YOT-SUTANI, Shoji, 50 (1998), 1–22
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 113
YANAGIHARA , Niro: Generators and maximal ideals in some algebras ofholomorphie functions........................................................ . . . . 27 (1975), 31– 47
YANAGISAWA, Taku: see OHNO, Mayumi, SHIZUTA, Yasushi andYANAGISAWA, Taku, 46 (1994), 393–401
YANG, Chung-Chun: see GROSS, Fred and YANG, Chung-Chun, 26(1974), 65–71
YANG, Dachun:see FAN, Dashan, PAN, Yibiao and YANG, Dachun, 51(1999), 141–161
YANG, Jin-Gen: Sextic curves with simple singularities.................... . . . . 48 (1996), 203–227
YANO, Kenji: Notes on Tauberian theorems for Riemann summability. . . . . . 10 (1958), 19– 31
YANO, Kenji: On convergence criteria for Fourier series II................ . . . . 11 (1959), 54– 62
YANO, Kenji: A note on absolute Cesàro summability of Fourier series. . . . . 12 (1960), 293–300
YANO, Kenji: Convexity theorems for allied Fourier series................ . . . . 15 (1963), 49– 61
YANO, Kentarô:see SASAKI , Shigeo and YANO, Kentarô, 1 (1949), 31–39
YANO, Kentaro and AKO, Mitsue: Almost analytic vectors in almostcomplex spaces................................................................ . . . . 13 (1961), 24– 45
YANO, Kentaro: Tensor fields and connections on cross-sections in thecotangent bundle............................................................... . . . . 19 (1967), 32– 48
YANO, Kentaro and AKO, Mitsue: Notes on covariant almost analyticvector fields..................................................................... . . . . 19 (1967), 187–197
YANO, Kentaro: see GOLDBERG, Samuel I. and YANO, Kentaro, 22(1970), 362–370
YANO, Kentaro: On(f, g, u, v, λ)-structures induced on a hypersurfaceof an odd-dimensional sphere................................................ . . . . 23 (1971), 671–679
YANO, Kentaro and MUTO, Yosio: On almost cotangent structures. . . . . . . . . . 25 (1973), 111–127
YANO, Kentaro, ISHIHARA, Shigeru and KONISHI, Mariko: Normalityof almost contact 3-structure................................................. . . . . 25 (1973), 167–175
YANO, Kentaro: see CHEN, Bang-yen and YANO, Kentaro, 25 (1973),177–184
YANO, Kentaro and KON, Masahiro: Totally real submanifolds of com-plex space forms, I............................................................. . . . . 28 (1976), 215–225
YANO, Kentaro and KON, Masahiro: Anti-invariant submanifolds ofSasakian spaee forms I........................................................ . . . . 29 (1977), 9– 23
YANO, Koichi: C1 foliations which cannot be approximated byC2 folia-tions.............................................................................. . . . . 40 (1988), 95– 99
YANO, Shigeki: Notes on Fourier Analysis (XV): On the absolute con-vergence of trigonometrical series.......................................... . . . . . 1 (1949), 46– 49
YANO, Shigeki: Notes on Fourier Analysis (XIX) : A remark on Riemannsums............................................................................. . . . . . 2 (1950), 1– 3
114 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
YANO, Shigeki: On Walsh-Fourier series..................................... . . . . . 3 (1951), 223–242
YANO, Shigeki: A remark on absolute Cesàro summability of Fourierseries............................................................................. . . . . . 5 (1953), 194–195
YANO, Shigeki: Cesàro summability of Fourier series...................... . . . . . 5 (1953), 196–197
YANO, Shigeki: A convergence test for Walsh-Fourier series.............. . . . . . 6 (1954), 226–230
YANO, Shigeki: Cesàro summability of Walsh-Fourier series.............. . . . . . 9 (1957), 267–272
YANO, Shigeki: On a lemma of Marcinkiewicz and its applications toFourier series................................................................... . . . . 11 (1959), 191–215
YANO, Shigeki: On Marcinkiewicz integral.................................. . . . . 27 (1975), 381–388
YANO, Sigeki: Notes on Fourier Analysis(XVII): The integrated Lips-chitz condition of a function and Fejér mean of Fourier series.... ..... . . . . . 1 (1949), 50– 56
YAWATA , Makoto: see TAKAGI , Hitoshi and YAWATA , Makoto, 43(1991), 103–115
YAWATA , Makoto: see TAKAGI , Hitoshi and YAWATA , Makoto, 46(1994), 341–355
YEH, J. and HUDSON, W. N.: Transformation of the generalized Wienermeasure under a class of linear transformations.......................... . . . . 24 (1972), 423–433
YEH, J.: Stochastie integral ofL2-functions with respect to Gaussian pro-cesses............................................................................ . . . . 27 (1975), 175–186
YEH, J.: Correction to “Stochastic integral ofL2-functions with respectto Gaussian processes”........................................................ . . . . 28 (1976), 467
YEH, J.: Transformation of conditional Wiener integrals under translationand the Cameron-Martin translation theorem............................. . . . . 30 (1978), 505–515
YEN, Ti: Isomorphism of unitary groups inAW ∗-algebras................ . . . . . 8 (1956), 275–280
YI, Hong-Xun: On a result of Gross and Yang............................... . . . . 42 (1990), 419–428
YIM, Jin-Whan:see KIM, Chang-Wan and YIM, Jin-Whan, 47 (1995),461–474
YOKOYAMA , Akio: On the Gaussian sum and the Jacobi sum with itsapplication...................................................................... . . . . 16 (1964), 142–153
YOKOYAMA , Akio: On class numbers of finite algebraic number fields. . . . . 17 (1965), 349–357
YOKOYAMA , Akio: Über die Relativklassenzahl eines relativ-Galoisschen Zahlkörpers von Primzahlpotenzgrad....................... . . . . 18 (1966), 318–324
YONEDA, Kaoru: Dirichlet sets and some uniqueness theorems for Walshseries............................................................................. . . . . 38 (1986), 1– 14
YONEMITSU, Naoto: On systems of strict implication...................... . . . . . 3 (1951), 48– 58
YONEMURA, Takashi: Hypersurface simpleK3 singularities............. . . . . 42 (1990), 351–380
YONEYAMA, Toshiaki: Uniform stability for one-dimensional delay-differential equations with dominant delayed term....................... . . . . 41 (1989), 217–236
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 115
YOON, Joung-Hahn:see CHOI, Hyeong In, LEE, Doo Seok and YOON,Joung-Hahn, 50 (1998), 455–467
YORKE, James A.:see AUSLANDER, Joseph and YORKE, James A., 32(1980), 177–188
YOROZU, Shinsuke: Notes on harmonic transformations................... . . . . 24 (1972), 441–447
YOROZU, Shinsuke: The non-existence of Killing fields................... . . . . 36 (1984), 99–105
YOROZU, Shinsuke:see TAKAGI , Ryoichi and YOROZU, Shinsuke, 36(1984), 541–554
YOSHIDA, Hidenobu: On Plessner points of meromorphic functions..... . . . . 25 (1973), 23– 32
YOSHIDA, Masaaki: see SASAKI , Takeshi and YOSHIDA, Masaaki, 41(1989), 321–348
YOSHIHARA, Hisao: see UCHIDA, Kôji and YOSHIHARA, Hisao, 28(1976), 89–94
YOSHIMATSU, Yashiro: On the decomposition of generalizedS-curvature-like tensor fields................................................... . . . . 29 (1977), 235–254
YOSHINO, Masafumi: The Diophantine nature for the convergence offormal solutions................................................................ . . . . 38 (1986), 625–641
YOSHINO, Takashi: see SAITÔ, Teishirô and YOSHINO, Takashi, 16(1964), 309–312
YOSHINO, Takashi: see SAITÔ, Teishirô and YOSHINO, Takashi, 17(1965), 147–149
YOSHINO, Takashi: On the spectrum of a hyponormal operator........... . . . . 17 (1965), 305–309
YOSHINO, Takashi:see ISTRAT, Vasile, SAITÔ, Teishirô and YOSHINO,Takashi, 18 (1966), 410–413
YOSHINO, Takashi: Spectral resolution of a hyponormal operator withthe spectrum on a curve....................................................... . . . . 19 (1967), 86– 97
YOSHINO, Takashi: Correction : On the spectrum of a hyponormal oper-ator............................................................................... . . . . 19 (1967), 101
YOSHINO, Takashi: Nearly normal operators................................. . . . . 20 (1968), 1– 4
YOSHINO, Takashi: On a problem of Bonsall................................ . . . . 20 (1968), 5– 7
YOSHINO, Takashi: Subnormal operator with a cyclic vector.............. . . . . 21 (1969), 47– 55
YOSHINO, Takashi: Correction: On a problem of Bonsall.................. . . . . 21 (1969), 158
YOSHINO, Takashi: On the commuting extensions of nearly normal op-erators........................................................................... . . . . 25 (1973), 263–272
YOSHINO, Takashi: Note on Toeplitz operators.............................. . . . . 26 (1974), 535–540
YOSHINO, Takashi: Hyponormal operators in von Neumann algebras. . . . . . . 28 (1976), 129–134
YOSHIOKA, Masanori: Polarized surfaces of∆-genus 3 and degree 5. . . . . . . 44 (1992), 597–612
116 SECOND SERIES GENERAL INDEX, VOLS. 1– 51
YOSHIOKA, Masanori: Polarized surfaces of low degrees with respect tothe delta-genus................................................................. . . . . 47 (1995), 441–459
YOSHIZAWA, Taro: Existence of a globally uniform-asymptotically sta-ble periodic and almost periodic solution.................................. . . . . 19 (1967), 423–428
YOSHIZAWA, Taro: Oscillatory property of solutions of second order dif-ferential equations............................................................. . . . . 22 (1970), 619–634
YOSHIZAWA, Taro: see MURAKAMI , Satoru and YOSHIZAWA, Taro, 44(1992), 45–57
YOSHIZAWA, Taro: Obituary.................................................... . . . . 49 (1997)
YOSHIZAWA, Taro: see HINO, Yoshiyuki, MURAKAMI , Satoru andYOSHIZAWA, Taro, 49 (1997), 133–147
YOTSUTANI, Shoji: see KABEYA, Yoshitsugu, YANAGIDA , Eiji and YOT-SUTANI, Shoji, 50 (1998), 1–22
YOUKANA, Amar: see HARAUX, Alain and YOUKANA, Amar, 40(1988), 159–163
YOUNG, Samuel S. H.:see WONG, Yung-Chow and YOUNG, Samuel S.H., 22 (1970), 604–612
YU, Jianshe:see MA, Shiwang, YU, Jianshe and WANG, Zhicheng, 50(1998), 513–529
YU, Wen Neng: see TACHIBANA , Shun-ichi and YU, Wen Neng, 22(1970), 536–540
ZAIDMAN , Samuel: Sur un thérorème de I. Miyadera concernant lareprésentation des fonctions vectorielles par des intégrales de Laplace. . . . 12 (1960), 47– 51
ZAIDMAN , Samuel: La représentation des fonctions vectorielles par desintégrales de Laplace-Stieltjes (II).......................................... . . . . 12 (1960), 52– 70
ZELLER, Karl: see LORENTZ, George G. and ZELLER, Karl, 15 (1963),315–321
ZEMANIAN , A. H.: see PANDEY, J. N. and ZEMANIAN , A. H., 20 (1968),425–430
ZERLING, David: Some theorems on(CA) analytic groups II............. . . . . 29 (1977), 325–333
ZHANG, Binggen:see KUANG, Yang, ZHANG, Binggen and ZHAO, Tao,43 (1991), 509–528
ZHANG, Bo: see BURTON, Theodore Allen and ZHANG, Bo, 42 (1990),93–100
ZHANG, Bo: see HUANG, Qichang and ZHANG, Bo, 49 (1997), 503–516
ZHANG, De-Qi: Logarithmic del Pezzo surfaces with rational double andtriple singular points.......................................................... . . . . 41 (1989), 399–452
ZHANG, De-Qi: see OGUISO, Keiji and ZHANG, De-Qi, 50 (1998), 419–436
SECOND SERIES GENERAL INDEX, VOLS. 1– 51 117
ZHAO, Tao: see KUANG, Yang, ZHANG, Binggen and ZHAO, Tao, 43(1991), 509–528
ZHAO, Weili: Existence and uniqueness of solutions for third order non-linear boundary value problems............................................. . . . . 44 (1992), 545–555
ZHENG, Dawei: see WANG, Junyu, ZHENG, Dawei and WANG,Xuekong, 44 (1992), 233–242
ZHENG, Jian-hua and ZHOU, Zheng-zhong: Permutability of entire func-tions satisfying certain differential equations.............................. . . . . 40 (1988), 323–330
ZHOU, Zheng-zhong:see ZHENG, Jian-hua and ZHOU, Zheng-zhong, 40(1988), 323–330
ZSIDÓ, László:see CIORANESCU, Ioana and ZSIDÓ, László, 28 (1976),327–362