The fundamental group of the p-subgroup complex

Abstract

We study the fundamental group of the p-subgroup complex of a finite group G. We show first that π1(A3(A10)) is not a free group (here A10 is the alternating group on 10 letters). This is the first concrete example in the literature of a p-subgroup complex with non-free fundamental group. We prove that, modulo a well-known conjecture of M. Aschbacher, π1(Ap(G)) = π1(Ap(SG)) * F, where F is a free group and π1(Ap(SG)) is free if SG is not almost simple. Here SG = 1(G)/Op'(1(G)). This result essentially reduces the study of the fundamental group of p-subgroup complexes to the almost simple case. We also exhibit various families of almost simple groups whose p-subgroup complexes have free fundamental group.