A Multiplicative Property for Zero-Sums II
Abstract
Let with and , and let . It is known that any sequence of terms from must contain a nontrivial zero-sum of length at most . The associated inverse question is to characterize those sequences with maximal length that fail to contain a nontrivial zero-sum subsequence of length at most . For , this is the inverse question for the Davenport Constant. For , this is the inverse question for the invariant concerning short zero-sum subsequences. The structure in both these cases is known, and the structure for when was studied previously with it conjectured that they must have the form for some basis , with the conjecture established in many cases. We focus on . Assuming the conjectured structure holds for in , we characterize the structure of all sequences of maximal length in that fail to contain a nontrivial zero-sum of length at most , showing they must have either have the form for some and basis with , or else have the form for some generating set with . Additionally, we give a new proof of the precise structure in the case for . Combined with known results, our results unconditionally establish the structure of extremal sequences in in many cases.
Cite
@article{arxiv.2109.10309,
title = {A Multiplicative Property for Zero-Sums II},
author = {David J. Grynkiewicz and Chao Liu},
journal= {arXiv preprint arXiv:2109.10309},
year = {2021}
}