A sumset version of a conjecture of Pilz
Abstract
Pilz's conjecture states that for any finite set A=\a1,a2,…,ak\ of positive integers and positive integer n in the union of the sets \a1,2a1,…,na1\,…, \ak,2ak,…,nak\ (considered as a multiset) at least n values appear an odd number of times. In this short note we consider a variant of this problem. Namely, we show that in the sumset \a1,2a1,…,na1\+…+\ak,2ak,…,nak\ (considered as a multiset) at least n values appear an odd number of times.
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