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Centralizers of finite $p$-subgroups in simple locally finite groups
Mahmut Kuzucuoğlu Department of Mathematics,
Middle East Technical University,
Ankara, 06531,
Turkey
Abstract:
We are interested in the following questions of B. Hartley: (1) Is it true that, in an infinite, simple locally finite group, if the centralizer of a finite subgroup is linear, then
$G$ is linear? (2) For a finite subgroup
$F$ of a non-linear simple locally finite group is the order
$|CG(F)|$ infinite? We prove the following: Let
$G$ be a non-linear simple locally finite group which has a Kegel sequence
$\mathcal{K}=\{(G_{i},1): \; i \in \mathbf{N} \}$ consisting of finite simple subgroups. Let
$p$ be a fixed prime and
$s\in \mathbf{N}$. Then for any finite
$p-$subgroup
$F$ of
$G$, the centralizer
$C_{G}(F)$ contains subgroups isomorphic to the homomorphic images of
$SL(s,\mathbf{F}_q)$. In particular
$C_G(F)$ is a non-linear group. We also show that if
$F$ is a finite
$p$-subgroup of the infinite locally finite simple group
$G$ of classical type and given
$s\in \mathbf{N}$ and the rank of
$G$ is sufficiently large with respect to
$|F|$ and
$s$, then
$C_G(F)$ contains subgroups which are isomorphic to homomorphic images of
$SL(s,K)$.
Keywords:
centralizer, simple locally finite, non-linear group.
UDC:
512 Received: 26.10.2016
Received in revised form: 06.12.2016
Accepted: 08.03.2017
Language: English
DOI:
10.17516/1997-1397-2017-10-3-281-286
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