Profinite groups with complemented closed subgroups

Abstract

A group G is said to be a C-group if every subgroup H has a permutable complement, i.e. if there exists a subgroup K of G such that G=HK and H K=1. In this paper, we study the profinite counterpart of this concept. We say that a profinite group G is profinite-C if every closed subgroup admits a closed permutable complement. We first give some equivalent variants of this condition and then we determine the structure of profinite-C groups: they are the semidirect products G=B A of two closed subgroups A=Cri∈ I \, ai and B=Crj∈ J \, bj that are cartesian products of cyclic groups of prime order, and with every ai normal in G. Finally, we show that a profinite-C group is a C-group if and only if it is torsion and |G:Z(G)G'|<∞.