Computational Physics || References
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Computationyal Physics. Problem Solving with Computers (2nd edn). Rubin H. Landau, Manuel José Páez, Cristian C. Bordeianu Copyright © 2007 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim ISBN: 978-3-527-40626-5 583 References 1 UNDERGRADUATE COMPUTA- TIONAL ENGINEERING AND SCIENCE, http://www.krellinst.org/UCES/. 2 LANDAU, R. H. (2005), A First Course in Scientific Computing, Princeton Univer- sity Press, Princeton. 3 LANDAU, R. H., LANDAU, M. J. PÁEZ, AND C. C. BORDEIANU, (2007), A Sur- vey of Computational Physics, Princeton University Press, Princeton. 4 FOSDICK L. D, E. R. J ESSUP, C. J. C. SCHAUBLE, AND G. DOMIK (1996), An Introduction to High Performance Scientific Computing, MIT Press, Cambridge. 5 PINSON, L. J. AND R. S. WIENER (19991), Objective-C Object-Oriented Programming Techniques, Addison-Wesley, Reading, MA. 6 SMITH, D. N. (1991), Concepts of Object- Oriented Programming, McGraw-Hill, New York. 7 ABRAMOWITZ,M. AND I. A. STEGUN (1972), Handbook of Mathematical Func- tions, 10th ed. U.S. Government Printing Office, Washington. 8 GOTTFRIED, K. (1966), Quantum Mechan- ics, Benjamin, New York. 9 PRESS, W. H., B. P. FLANNERY, S. A. TEUKOLSKY, AND W. T. VETTERLING (1994), Numerical Recipes, Cambridge University Press, Cambridge, UK. 10 PRESS, W. H., B. P. FLANNERY, S. A. TEUKOLSKY, AND W. T. VETTERLING (2000), Numerical Recipes in C++, 2nd ed., Cambridge University Press, Cambridge, UK. 11 JAMA, A Java matrix package; Java Numerics, http://math.nist.gov/javanumerics/ jama/. 12 PENNA, T. J. P. (1994), Comput. Phys. 9, 341. 13 BEVINGTON, P. R. AND D. K. ROBINSON (2002), Data Reduction and Error Analysis for the Physical Sciences, 3rd ed., McGraw- Hill, New York. 14 THOMPSON, W. J. (1992), Computing for Scientists and Engineers, Wiley, New York. 15 STETZ, A., J. CARROLL, N. CHIRAPATPI - MOL, M. DIXIT, G. I GO, M. NASSER, D. ORTENDAHL, AND V. PEREZ-MENDEZ (1973), “Determination of the Axial Vec- tor Form Factor in the Radiative Decay of the Pion”, LBL 1707, invited paper at the Symposium of the Division of Nuclear Physics, Washington, DC, April. 16 MATHEWS, J. AND R. L. WALKER (1965), Mathematical Methods of Physics, Ben- jamin, Reading, MA. 17 GOULD, H., J. TOBOCHNIK, AND W. CHRISTIAN (2006), An Introduction to Computer Simulation Methods, 3rd ed., Addison-Wesley, Reading, MA. 18 PLISCHKE,M. AND B. BERGERSEN (1994), Equilibrium Statistical Physics, 2nd ed., World Scientific, Singapore. 19 HUNAG, K. (1987), Statistical Mechanics, Wiley, New York. 20 YANG, C. N. (1952), The Spontaneous Magnetization of a Two-Dimensional Ising Model Phys. Rev. 85, 809. 21 METROPOLIS, M., A. W. ROSENBLUTH, M. N. ROSENBLUTH, A. H. TELLER, AND E. TELLER (1953), J. Chem. Phys. 21, 1087. 22 J OSÉ, J. V AND E. J. SALATAN, (1988) Classical Dynamics, Cambridge University Press, Cambridge, UK. Computational Physics Rubin H. Landau, Manuel J. Páez and Cristian C. Bordeianu © 2007 WILEY-VCH Verlag GmbH & Co
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Transcript of Computational Physics || References
Computationyal Physics. Problem Solving with Computers (2nd edn).Rubin H. Landau, Manuel José Páez, Cristian C. BordeianuCopyright © 2007 WILEY-VCH Verlag GmbH & Co. KGaA, WeinheimISBN: 978-3-527-40626-5
583
References
1 UNDERGRADUATE COMPUTA-TIONAL ENGINEERING AND SCIENCE,http://www.krellinst.org/UCES/.
2 LANDAU, R. H. (2005), A First Course inScientific Computing, Princeton Univer-sity Press, Princeton.
3 LANDAU, R. H., LANDAU, M. J. PÁEZ,AND C. C. BORDEIANU, (2007), A Sur-vey of Computational Physics, PrincetonUniversity Press, Princeton.
4 FOSDICK L. D, E. R. JESSUP, C. J. C.SCHAUBLE, AND G. DOMIK (1996), AnIntroduction to High Performance ScientificComputing, MIT Press, Cambridge.
5 PINSON, L. J. AND R. S. WIENER (19991),Objective-C Object-Oriented ProgrammingTechniques, Addison-Wesley, Reading,MA.
6 SMITH, D. N. (1991), Concepts of Object-Oriented Programming, McGraw-Hill, NewYork.
7 ABRAMOWITZ, M. AND I. A. STEGUN
(1972), Handbook of Mathematical Func-tions, 10th ed. U.S. Government PrintingOffice, Washington.
8 GOTTFRIED, K. (1966), Quantum Mechan-ics, Benjamin, New York.
9 PRESS, W. H., B. P. FLANNERY, S. A.TEUKOLSKY, AND W. T. VETTERLING
(1994), Numerical Recipes, CambridgeUniversity Press, Cambridge, UK.
10 PRESS, W. H., B. P. FLANNERY, S. A.TEUKOLSKY, AND W. T. VETTERLING
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11 JAMA, A Java matrixpackage; Java Numerics,http://math.nist.gov/javanumerics/
jama/.12 PENNA, T. J. P. (1994), Comput. Phys. 9,
341.13 BEVINGTON, P. R. AND D. K. ROBINSON
(2002), Data Reduction and Error Analysisfor the Physical Sciences, 3rd ed., McGraw-Hill, New York.
14 THOMPSON, W. J. (1992), Computing forScientists and Engineers, Wiley, New York.
15 STETZ, A., J. CARROLL, N. CHIRAPATPI-MOL, M. DIXIT, G. IGO, M. NASSER, D.ORTENDAHL, AND V. PEREZ-MENDEZ
(1973), “Determination of the Axial Vec-tor Form Factor in the Radiative Decay ofthe Pion”, LBL 1707, invited paper at theSymposium of the Division of NuclearPhysics, Washington, DC, April.
16 MATHEWS, J. AND R. L. WALKER (1965),Mathematical Methods of Physics, Ben-jamin, Reading, MA.
17 GOULD, H., J. TOBOCHNIK, AND W.CHRISTIAN (2006), An Introduction toComputer Simulation Methods, 3rd ed.,Addison-Wesley, Reading, MA.
18 PLISCHKE, M. AND B. BERGERSEN
(1994), Equilibrium Statistical Physics,2nd ed., World Scientific, Singapore.
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E. TELLER (1953), J. Chem. Phys. 21,1087.
22 JOSÉ, J. V AND E. J. SALATAN, (1988)Classical Dynamics, Cambridge UniversityPress, Cambridge, UK.
Computational P hysicsRubin H . Landau, Manuel J. Páez and Cr istian C. Bordeianu
© 2007 W I LEY- VCH Ver la g Gmb H & Co
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