Groups with all Subgroups Permutable [0.13cm]or Soluble of ... · Groups with all subgroups...
Transcript of Groups with all Subgroups Permutable [0.13cm]or Soluble of ... · Groups with all subgroups...
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Advances in Group Theory and Applications 2019June 28
Groups with all Subgroups Permutableor Soluble of Finite Rank
Maria FerraraUniversità degli Studi di Napoli Federico II
June 28, 2019
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1Introduction
The theory of groups all of whose subgroups satisfy some property has avery long history, beginning in 1897 with R. Dedekind
(1831 – 1916)
Richard Dedekind“Über Gruppen deren sämtliche Teiler
Normalteiler sind”,Math. Ann. 48 (1897), 548–561.
who studied groups all of whose subgroups are normal, the so-called Dedekindgroups.
Maria Ferrara | Groups with all subgroups permutable or soluble of finite rank
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2Introduction
The theory of groups all of whose subgroups satisfy some property has avery long history, beginning in 1897 with R. Dedekind
(1831 – 1916)
Richard Dedekind“Über Gruppen deren sämtliche Teiler
Normalteiler sind”,Math. Ann. 48 (1897), 548–561.
who studied groups all of whose subgroups are normal, the so-called Dedekindgroups.
Obviously all abelian groups are Dedekind groups and a non-abelian Dedekindgroup is called Hamiltonian group.
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3Introduction
The smallest example of a Hamiltonian group is the quaternion group oforder 8, denoted by Q8 and discovered by William R. Hamilton in 1843.
“Here as he walked by on the 16th ofOctober 1843 Sir William Rowan
Hamilton in a flash of genius discoveredthe fundamental formula for quaternionmultiplication i2 = j2 = k2 = ijk = −1
& cut it on a stone of this bridge”
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4Introduction
However, every Hamiltonian group contains a copy of Q8, in fact and aclassical result of R. Baer and R. Dedekind (in the infinite and respectivelyfinite order case). . .
(1902 – 1979)
Reinhold Baer“Situation der Untergruppen und
Struktur der Gruppe”,S.B. Heidelberg. Akad. Wiss. 2
(1933), 12–17.
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5Introduction
. . . shows that every Hamiltonian group is a direct product of the form
G = Q8 × B × D
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6Introduction
shows that every Hamiltonian group is a direct product of the form
G = Q8 × B × D
where
I B is an elementary abelian 2-group
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7Introduction
shows that every Hamiltonian group is a direct product of the form
G = Q8 × B × D
and
I D is a periodic abelian group with all elements of odd order
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8Introduction
Normal subgroups have several useful generalizations, one of which is thepermutability.
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9Introduction
Normal subgroups have several useful generalizations, one of which is thepermutability.
A subgroup H of a group G is said to be permutable in G if
HK = KH
for every subgroup K of G .
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9Introduction
Normal subgroups have several useful generalizations, one of which is thepermutability.
A subgroup H of a group G is said to be permutable in G if
HK = KH
for every subgroup K of G .
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9Introduction
Normal subgroups have several useful generalizations, one of which is thepermutability.
A subgroup H of a group G is said to be permutable in G if
HK = KH
for every subgroup K of G .
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10Introduction
These subgroups had been introduced by Øystein Ore in 1937, who calledthem “quasinormal”.
(1899 – 1968)
Øystein Ore“Structures and group theory”,
I. Duke Math. J.3 (1937), 149–173.
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11Introduction
Obviously, normal subgroups are always permutable, but the converse isnot true.
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12Introduction
Obviously, normal subgroups are always permutable, but there are numer-ous example of non-normal permutable subgroups.
ExampleLet p be an odd prime, and let G be an extraspecial group of order p3 andexponent p2.
I G has all subgroups permutableI G has non-normal subgroups
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12Introduction
Obviously, normal subgroups are always permutable, but there are numer-ous example of non-normal permutable subgroups.
ExampleLet p be an odd prime, and let G be an extraspecial group of order p3 andexponent p2.
I G has all subgroups permutable
I G has non-normal subgroups
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12Introduction
Obviously, normal subgroups are always permutable, but there are numer-ous example of non-normal permutable subgroups.
ExampleLet p be an odd prime, and let G be an extraspecial group of order p3 andexponent p2.
I G has all subgroups permutableI G has non-normal subgroups
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13Introduction
Groups with all subgroups permutable are called quasi-Hamiltonian (orquasi-Abelian) groups and they were studied by Kenkichi Iwasawa whoclassified them.
(1917– 1998)
Kenkichi Iwasawa“Einege sätze über freie gruppen”,Proc. Imp. Acad.Tokyo 19 (1943),
272–274.
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14Introduction
What about the structure of groups in which the set of all non-permutablesubgroups is “small” in some sense?
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15Introduction
I examined this problem together with Martyn R. Dixon
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16Introduction
I examined this problem together with Martyn R. Dixon, Z. Yalcin Karatas
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17Introduction
I examined this problem together with Martyn R. Dixon, Zekeriya YalcinKaratas and Marco Trombetti
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18Introduction
I examined this problem together withMartyn R. Dixon, Zekeriya YalcinKaratas and Marco Trombetti in the wake of the following paper
S. Franciosi, F. de Giovanni and M. L. Newell“Groups with Polycyclic Non-Normal Subgroups”,
Algebra Colloq. 7 (2000), no. 1, 33-42.
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19Preliminaries
Dually to their results for the non-normal subgroups, we have proved that
I If G is a group whose non-permutable subgroups are periodic, thenG is quasihamiltonian or periodic
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20Preliminaries
Dually to their results for the non-normal subgroups, we have proved that
I If G is a group whose non-permutable subgroups are periodic, thenG is quasihamiltonian or periodic
I If G is locally graded group and the non-permutable subgroups of Gare locally finite, then G is quasihamiltonian or locally finite
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21Preliminaries
Dually to their results for the non-normal subgroups, we have proved that
I If G is a group whose non-permutable subgroups are periodic, thenG is quasihamiltonian or periodic
I If G is locally graded group and the non-permutable subgroups of Gare locally finite, then G is quasihamiltonian or locally finite
I If G a locally graded group whose subgroups are permutable orČernikov, then G is quasihamiltonian or Černikov
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22Preliminaries
I If G is locally graded group and the non-permutable subgroups of Gare locally finite, then G is quasihamiltonian or locally finite
I If G a locally graded group whose subgroups are permutable orČernikov, then G is quasihamiltonian or Černikov
Why a locally gradedgroup?
A group G is said to be locally gradedif all its finitely generated nontrivial
subgroups have a nontrivial finite imageand the consideration of Tarski groups
shows that a requirement of this type isnecessary for this kind of problem
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22Preliminaries
I If G is locally graded group and the non-permutable subgroups of Gare locally finite, then G is quasihamiltonian or locally finite
I If G a locally graded group whose subgroups are permutable orČernikov, then G is quasihamiltonian or Černikov
Why a locally gradedgroup?
A group G is said to be locally gradedif all its finitely generated nontrivial
subgroups have a nontrivial finite imageand the consideration of Tarski groups
shows that a requirement of this type isnecessary for this kind of problem
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23Preliminaries
In 1967, S.N. Černikov showed that an infinite locally graded group whoseinfinite subgroups are normal
(1912 – 1987)
S.N. Černikov“Groups with given properties of
system of infinite subgroups”,Ukrain. Math. J. 19 (1967), 715-731.
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24Preliminaries
In 1967, S.N. Černikov showed that an infinite locally graded group whoseinfinite subgroups are normal is either a Dedekind group
(1912 – 1987)
S.N. Černikov“Groups with given properties of
system of infinite subgroups”,Ukrain. Math. J. 19 (1967), 715-731.
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25Preliminaries
In 1967, S.N. Černikov showed that an infinite locally graded group whoseinfinite subgroups are normal is either a Dedekind group or an extensionof a Prüfer group by a finite Dedekind group
(1912 – 1987)
S.N. Černikov“Groups with given properties of
system of infinite subgroups”,Ukrain. Math. J. 19 (1967), 715-731.
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26Preliminaries
Generalizing this result, we have proved that in an infinite locally gradedgroup G ,
every infinite subgroup is permutable if and only if G is quasihamiltonian
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27Preliminaries
Generalizing this result, we have proved that in an infinite locally gradedgroup G ,
every infinite subgroup is permutable if and only if G is quasihamiltonianor G is an extension of a Prüfer group by a finite quasihamiltonian group
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28Preliminaries
Ok! But, it didn’t occur to you itmight exist further generalizations?
Of course!
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28Preliminaries
Ok! But, it didn’t occur to you itmight exist further generalizations?
Of course!
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29Finite abelian section rank
The first more general property we consider is the finiteness for abeliansection rank.
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30Finite abelian section rank
The first more general property we consider is the finiteness for abeliansection rank.
A group G has finite abelian section rank if every abelian section of G hasfinite 0-rank and finite p-rank for all primes p.
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31Finite abelian section rank
Let G be a locally graded group. Then all subgroups are permutable orsoluble of finite abelian section rank if and only if either
1. G is quasihamiltonian;
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31Finite abelian section rank
Let G be a locally graded group. Then all subgroups are permutable orsoluble of finite abelian section rank if and only if either
1. G is quasihamiltonian;
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32Finite abelian section rank
Let G be a locally graded group. Then all subgroups are permutable orsoluble of finite abelian section rank if and only if either
1. G is quasihamiltonian;
2. G is soluble of finite abelian section rank;
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33Finite abelian section rank
Let G be a locally graded group. Then all subgroups are permutable orsoluble of finite abelian section rank if and only if either
1. G is quasihamiltonian;
2. G is soluble of finite abelian section rank;
3. G has finite abelian section rank and G ′′ is a finite perfect minimalnon-soluble group such that G/G ′′ is quasihamiltonian.
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34Finite rank
A group G is said to have finite (Prüfer) rank r = r(G) if every finitelygenerated subgroup of G can be generated by at most r elements, and ris the least positive integer with such property.
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35Finite rank
As a corollary, we have that in a locally graded group G , all subgroups arepermutable or soluble of finite rank if and only if either
1. G is quasihamiltonian;
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35Finite rank
As a corollary, we have that in a locally graded group G , all subgroups arepermutable or soluble of finite rank if and only if either
1. G is quasihamiltonian;
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36Finite rank
As a corollary, we have that in a locally graded group G , all subgroups arepermutable or soluble of finite rank if and only if either
1. G is quasihamiltonian;
2. G is soluble of finite rank;
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37Finite rank
As a corollary, we have that in a locally graded group G , all subgroups arepermutable or soluble of finite rank if and only if either
1. G is quasihamiltonian;
2. G is soluble of finite rank;
3. G has finite rank and G ′′ is a finite perfect minimal non-solublegroup such that G/G ′′ is quasihamiltonian.
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S1-group
Do you also knowwhat happens in a
S1-group?
A group G is called an S1-group ifG is a hyperabelian group with finiteabelian section rank and G contains
elements of only finitely manydistinct prime orders.
Thus, in particular, S1-groups are certain types of soluble group with finitespecial rank.
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38
S1-group
Do you also knowwhat happens in a
S1-group?
A group G is called an S1-group ifG is a hyperabelian group with finiteabelian section rank and G contains
elements of only finitely manydistinct prime orders.
Thus, in particular, S1-groups are certain types of soluble group with finitespecial rank.
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S1-group
Let G be a locally graded group. Then all subgroups are permutable orS1 if and only if either
1. G is quasihamiltonian;
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S1-group
Let G be a locally graded group. Then all subgroups are permutable orS1 if and only if either
1. G is quasihamiltonian;
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S1-group
Let G be a locally graded group. Then all subgroups are permutable orS1 if and only if either
1. G is quasihamiltonian;
2. G is an S1-group;
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S1-group
Let G be a locally graded group. Then all subgroups are permutable orS1 if and only if either
1. G is quasihamiltonian;
2. G is an S1-group;
3. G is a finite extension of an S1-group and G ′′ is a finite perfectminimal non-soluble group such that G/G ′′ is quasihamiltonian.
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Minimax groups
Next we recall that a group G is called minimax if it has a finite subnormalseries whose factors either satisfy min or max.
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Minimax groups
Next we recall that a group G is called minimax if it has a finite subnormalseries whose factors either satisfy min or max.
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Minimax groups
Next we recall that a group G is called minimax if it has a finite subnormalseries whose factors either satisfy min or max.
Clearly every soluble minimax group is an S1-group.
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Minimax groups
Let G be a locally graded group. Then all subgroups are permutable orsoluble minimax if and only if either
1. G is quasihamiltonian;
2. G is a soluble minimax group;
3. G is a minimax group and G ′′ is a finite perfect minimal non-solublegroup such that G/G ′′ is quasihamiltonian.
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Minimax groups
Let G be a locally graded group. Then all subgroups are permutable orsoluble minimax if and only if either
1. G is quasihamiltonian;
2. G is a soluble minimax group;
3. G is a minimax group and G ′′ is a finite perfect minimal non-solublegroup such that G/G ′′ is quasihamiltonian.
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Minimax groups
Let G a soluble minimax group all of whose non-permutable subgroups arepolycyclic.
If the finite residual R of G is a direct product of at least two Prüfersubgroups, then G is quasihamiltonian.
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Minimax groups
Let G a soluble minimax group all of whose non-permutable subgroups arepolycyclic.
If the finite residual R of G is a direct product of at least two Prüfersubgroups, then G is quasihamiltonian.
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48Periodic case
Periodic groups of the type we are interested in are now easy to describe.
Let G be an infinite non-quasihamiltonian periodic soluble minimax groupand let J be the finite residual of G .
Then all non-permutable subgroups of G are polycyclic if and only if J isa Prüfer p-group for some prime p and G/J is a finite quasihamiltoniangroup.
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48Periodic case
Periodic groups of the type we are interested in are now easy to describe.
Let G be an infinite non-quasihamiltonian periodic soluble minimax groupand let J be the finite residual of G .
Then all non-permutable subgroups of G are polycyclic if and only if J isa Prüfer p-group for some prime p and G/J is a finite quasihamiltoniangroup.
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48Periodic case
Periodic groups of the type we are interested in are now easy to describe.
Let G be an infinite non-quasihamiltonian periodic soluble minimax groupand let J be the finite residual of G .
Then all non-permutable subgroups of G are polycyclic if and only if J isa Prüfer p-group for some prime p and G/J is a finite quasihamiltoniangroup.
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Non-periodic case
Let G be a non-periodic soluble minimax group with nontrivial finite resid-ual J and suppose that G is not quasihamiltonian.If all non-permutable subgroups of G are polycyclic, then the followingconditions hold:
1. J is a Prüfer p-group for some prime p2. G/J is quasihamiltonian and the set T of elements of finite order in
G is a subgroup such that G/T is torsion-free abelian3. T/J is a finite abelian group
Furthermore either4. Every abelian subgroup is min-by-max, or5. G contains an infinitely generated torsion-free abelian subgroup.
Conversely, if G satisfies 1-4, then all non-permutable subgroups ofG are polycyclic.
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Non-periodic case
Let G be a non-periodic soluble minimax group with nontrivial finite resid-ual J and suppose that G is not quasihamiltonian.If all non-permutable subgroups of G are polycyclic, then the followingconditions hold:1. J is a Prüfer p-group for some prime p2. G/J is quasihamiltonian and the set T of elements of finite order in
G is a subgroup such that G/T is torsion-free abelian3. T/J is a finite abelian group
Furthermore either4. Every abelian subgroup is min-by-max, or5. G contains an infinitely generated torsion-free abelian subgroup.
Conversely, if G satisfies 1-4, then all non-permutable subgroups ofG are polycyclic.
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Non-periodic case
Let G be a non-periodic soluble minimax group with nontrivial finite resid-ual J and suppose that G is not quasihamiltonian.If all non-permutable subgroups of G are polycyclic, then the followingconditions hold:1. J is a Prüfer p-group for some prime p2. G/J is quasihamiltonian and the set T of elements of finite order in
G is a subgroup such that G/T is torsion-free abelian3. T/J is a finite abelian group
Furthermore either4. Every abelian subgroup is min-by-max, or5. G contains an infinitely generated torsion-free abelian subgroup.
Conversely, if G satisfies 1-4, then all non-permutable subgroups ofG are polycyclic.
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Non-periodic case
Let G be a non-periodic soluble minimax group with nontrivial finite resid-ual J and suppose that G is not quasihamiltonian.If all non-permutable subgroups of G are polycyclic, then the followingconditions hold:1. J is a Prüfer p-group for some prime p2. G/J is quasihamiltonian and the set T of elements of finite order in
G is a subgroup such that G/T is torsion-free abelian3. T/J is a finite abelian group
Furthermore either4. Every abelian subgroup is min-by-max, or5. G contains an infinitely generated torsion-free abelian subgroup.
Conversely, if G satisfies 1-4, then all non-permutable subgroups ofG are polycyclic.
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Non-periodic case
Let G be a non-periodic soluble minimax group with nontrivial finite resid-ual J and suppose that G is not quasihamiltonian.If all non-permutable subgroups of G are polycyclic, then the followingconditions hold:1. J is a Prüfer p-group for some prime p2. G/J is quasihamiltonian and the set T of elements of finite order in
G is a subgroup such that G/T is torsion-free abelian3. T/J is a finite abelian group
Furthermore either4. Every abelian subgroup is min-by-max, or5. G contains an infinitely generated torsion-free abelian subgroup.
Conversely, if G satisfies 1-4, then all non-permutable subgroups ofG are polycyclic.
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Non-periodic case
Let G be a non-periodic, residually finite soluble minimax group that isneither polycyclic nor quasihamiltonian.
If all non-permutable subgroups of G are polycyclic, then G is nilpotentand central-by-finite and splits over the torsion part.
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Non-periodic case
Let G be a non-periodic, residually finite soluble minimax group that isneither polycyclic nor quasihamiltonian.
If all non-permutable subgroups of G are polycyclic, then G is nilpotentand central-by-finite and splits over the torsion part.
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Thank you for your attention!