On the Herzog-Sch\"onheim conjecture for uniform covers of groups

Abstract

Let G be any group and a1G1,...,akGk (k>1) be left cosets in G. In 1974 Herzog and Sch\"onheim conjectured that if A=\aiGi\i=1k is a partition of G then the (finite) indices n1=[G:G1],...,nk=[G:Gk] cannot be distinct. In this paper we show that if A covers all the elements of G the same times and G1,...,Gk are subnormal subgroups of G not all equal to G, then M=1 j k|\1 i k:ni=nj\| is not less than the smallest prime divisor of n1... nk, moreover 1 i k ni=O(M2 M) where the O-constant is absolute.

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