On covers of abelian groups by cosets

Abstract

Let G be any abelian group and asGss=1k be a finite system of cosets of subgroups G1,...,Gk. We show that if asGss=1k covers all the elements of G at least m times with the coset atGt irredundant then [G:Gt] 2k-m and furthermore k m+f([G:Gt]), where f(Πi=1r pialphai)=Σi=1r alphai(pi-1) if p1,...,pr are distinct primes and alpha1,...,alphar are nonnegative integers. This extends Mycielski's conjecture in a new way and implies a conjecture of Gao and Geroldinger. Our new method involves algebraic number theory and characters of abelian groups.

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