Arithmetic-Progression-Weighted Subsequence Sums

Abstract

Let G be an abelian group, let S be a sequence of terms s1,s2,...,sn∈ G not all contained in a coset of a proper subgroup of G, and let W be a sequence of n consecutive integers. Let W S=\w1s1+...+wnsn:\;wi a term of W,\, wi≠ wjfor i≠ j\, which is a particular kind of weighted restricted sumset. We show that |W S|≥ \|G|-1,\,n\, that W S=G if n≥ |G|+1, and also characterize all sequences S of length |G| with W S≠ G. This result then allows us to characterize when a linear equation a1x1+...+arxr α n, where α,a1,..., ar∈ are given, has a solution (x1,...,xr)∈ r modulo n with all xi distinct modulo n. As a second simple corollary, we also show that there are maximal length minimal zero-sum sequences over a rank 2 finite abelian group G Cn1 Cn2 (where n1 n2 and n2≥ 3) having k distinct terms, for any k∈ [3,\n1+1,\,(G)\]. Indeed, apart from a few simple restrictions, any pattern of multiplicities is realizable for such a maximal length minimal zero-sum sequence.