Representation of Finite Abelian Group Elements by Subsequence Sums

Abstract

Let G Cn1 ... Cnr be a finite and nontrivial abelian group with n1|n2|...|nr. A conjecture of Hamidoune says that if W=w1... wn is a sequence of integers, all but at most one relatively prime to |G|, and S is a sequence over G with |S|≥ |W|+|G|-1≥ |G|+1, the maximum multiplicity of S at most |W|, and σ(W) 0 |G|, then there exists a nontrivial subgroup H such that every element g∈ H can be represented as a weighted subsequence sum of the form g=Σi=1nwisi, with s1... sn a subsequence of S. We give two examples showing this does not hold in general, and characterize the counterexamples for large |W|≥ 1/2|G|. A theorem of Gao, generalizing an older result of Olson, says that if G is a finite abelian group, and S is a sequence over G with |S|≥ |G|+D(G)-1, then either every element of G can be represented as a |G|-term subsequence sum from S, or there exists a coset g+H such that all but at most |G/H|-2 terms of S are from g+H. We establish some very special cases in a weighted analog of this theorem conjectured by Ordaz and Quiroz, and some partial conclusions in the remaining cases, which imply a recent result of Ordaz and Quiroz. This is done, in part, by extending a weighted setpartition theorem of Grynkiewicz, which we then use to also improve the previously mentioned result of Gao by showing that the hypothesis |S|≥ |G|+D(G)-1 can be relaxed to |S|≥ |G|+d*(G), where d*(G)=i=1r(ni-1). We also use this method to derive a variation on Hamidoune's conjecture valid when at least d*(G) of the wi are relatively prime to |G|.