Doubly-weighted zero-sum constants

Abstract

Let A,B⊂eq Zn be given and S=(x1,…, xk) be a sequence in Zn. We say that S is an (A,B)-weighted zero-sum sequence if there exist a1,…,ak∈ A and b1,…,bk∈ B such that a1x1+·s+akxk=0 and b1a1+·s+bkak=0. We show that if S has length 2n-1, then S has an (A,B)-weighted zero-sum subsequence of length n. The constant EA,B is defined to be the smallest positive integer k such that every sequence of length k in Zn has an (A,B)-weighted zero-sum subsequence of length n. A sequence in Zn of length EA,B-1 which does not have any (A,B)-weighted zero-sum subsequence of length n is called an E-extremal sequence for (A,B). We determine the constant EA,B and characterize the E-extremal sequences for some pairs (A,B). We also study the related constants CA,B and DA,B which are defined in the article.

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