Conjugacy conditions for supersoluble complements of an abelian base and a fixed point result for non-coprime actions

Abstract

We demonstrate that two supersoluble complements of an abelian base in a finite split extension are conjugate if and only if, for each prime p, a Sylow p-subgroup of one complement is conjugate to a Sylow p-subgroup of the other. As a corollary, we find that any two supersoluble complements of an abelian subgroup N in a finite split extension G are conjugate if and only if, for each prime p, there exists a Sylow p-subgroup S of G such that any two complements of S N in S are conjugate in G. In particular, restricting to supersoluble groups allows us to ease D. G. Higman's stipulation that the complements of S N in S be conjugate within S. We then consider group actions and obtain a fixed point result for non-coprime actions analogous to Glauberman's lemma.

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