Weighted Zero-Sum Problems Over C3r
Abstract
Let Cn be the cyclic group of order n and set sA(Cnr) as the smallest integer such that every sequence S in Cnr of length at least has an A-zero-sum subsequence of length equal to (Cnr), for A=\-1,1\. In this paper, among other things, we give estimates for sA(C3r), and prove that sA(C33)=9, sA(C34)=21 and 41≤ sA(C35)≤45.
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