The Weighted Davenport Constant of a group and a related extremal problem

Abstract

For a finite abelian group G written additively, and a non-empty subset A⊂ [1,(G)-1] the weighted Davenport Constant of G with respect to the set A, denoted DA(G), is the least positive integer k for which the following holds: Given an arbitrary G-sequence (x1,…,xk), there exists a non-empty subsequence (xi1,…,xit) along with aj∈ A such that Σj=1t ajxij=0. In this paper, we pose and study a natural new extremal problem that arises from the study of DA(G): For an integer k 2, determine G(k):=\|A|: DA(G) k\ (if the problem posed makes sense). It turns out that for k `not-too-small', this is a well-posed problem and one of the most interesting cases occurs for G=p, the cyclic group of prime order, for which we obtain near optimal bounds for all k (for sufficiently large primes p), and asymptotically tight (up to constants) bounds for k=2,4.