On the exponent of a finite group admitting a fixed-point-free   four-group of automorphisms

E. Romano; P. Shumyatsky

arXiv:1101.5367·math.GR·January 28, 2011·1 cites

On the exponent of a finite group admitting a fixed-point-free four-group of automorphisms

E. Romano, P. Shumyatsky

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TL;DR

This paper investigates how the structure of a finite group with specific automorphism groups influences the bounds on its exponent, especially under fixed-point-free actions by groups isomorphic to S4 or D8.

Contribution

It establishes bounds on the exponent of a finite group or its derived subgroup based on the automorphism group's structure and fixed-point conditions.

Findings

01

Exponent of G is e-bounded when A ≅ S4.

02

Exponent of G' is e-bounded when A ≅ D8.

03

Results extend understanding of automorphism actions on finite groups.

Abstract

Let $A$ be a group isomorphic with either $S_{4}$ , the symmetric group on four symbols, or $D_{8}$ , the dihedral group of order 8. Let $V$ be a normal four-subgroup of $A$ and $α$ an involution in $A ∖ V$ . Suppose that $A$ acts on a finite group $G$ in such a manner that $C_{G} (V) = 1$ and $C_{G} (α)$ has exponent $e$ . We show that if $A ≅ S_{4}$ then the exponent of $G$ is $e$ -bounded and if $A ≅ D_{8}$ then the exponent of the derived group $G^{'}$ is $e$ -bounded. This work was motivated by recent results on the exponent of a finite group admitting an action by a Frobenius group of automorphisms.

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Taxonomy

TopicsFinite Group Theory Research · Advanced Topics in Algebra · Advanced Differential Equations and Dynamical Systems