The space of coset partitions of Fn and Herzog-Sch\"onheim conjecture

Abstract

Let G be a group and H1,...,Hs be subgroups of G of indices d1,...,ds respectively. In 1974, M. Herzog and J. Sch\"onheim conjectured that if \Hiαi\i=1i=s, αi∈ G, is a coset partition of G, then d1,..,ds cannot be distinct. We consider the Herzog-Sch\"onheim conjecture for free groups of finite rank. We define Y the space of coset partitions of Fn and show Y is a metric space with interesting properties. In a previous paper, we gave some sufficient conditions on the coset partition of Fn that ensure the conjecture is satisfied. Here, we show that each coset partition of Fn, which satisfies one of these conditions, has a neighborhood U in Y such that all the partitions in U satisfy also the conjecture.