Connections between covers of Z and subset sums

Abstract

In this paper we establish connections between covers of Z by residue classes and subset sums in a field. Suppose that A0=\as(ns)\s=0k covers each integer at least p times with the residue class a0(n0)=a0+n0 Z irredundant, where p is a prime not dividing any of n1,…,nk. Let m1,…,mk∈ Z be relatively prime to n1,…,nk respectively. For any c,c1,…,ck∈ Z/p Z with c1·s ck=0, we show that the set \\Σs∈ Imsns\:\, I⊂eq\1,…,k\ \ and\ Σs∈ Ics=c\ contains an arithmetic progression of length n0 with common difference 1/n0, where \x\ denotes the fractional part of a real number x.