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Bibliographic Details
Main Authors: Ponomarenko, Ilia, Ryabov, Grigory
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2410.22998
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Table of Contents:
  • Following Wielandt, a finite group $G$ is called a $B$-group (Burnside group) if every primitive group containing a regular subgroup isomorphic to $G$ is doubly transitive. Using a method of Schur rings, Wielandt proved that every abelian group of composite order which has at least one cyclic Sylow subgroup is a $B$-group. Since then, other infinite families of $B$-groups were found by the same method. A simple analysis of the proofs of these results shows that in all of them a stronger statement was proved for the group $G$ under consideration: every primitive Schur ring over $G$ is trivial. A finite group $G$ possessing the latter property, we call $BS$-group (Burnside-Schur group). In the present note, we give infinitely many examples of $B$-groups which are not $BS$-groups.