Iterated Sumsets and Setpartitions
Abstract
Let be a finite abelian group with . The -term subsums version of Kneser's Theorem, obtained either via the DeVos-Goddyn-Mohar Theorem or the Partition Theorem, has become a powerful tool used to prove numerous zero-sum and subsequence sum questions. It provides a structural description of sequences having a small number of -term subsequence sums, ensuring this is only possible if most terms of the sequence are contained in a small number of -cosets. For large or , where is the smallest prime divisor of , the structural description is particularly strong. In particular, most terms of the sequence become contained in a single -coset, with additional properties holding regarding the representation of elements of as subsequence sums. This strengthened form of the subsums version of Kneser's Theorem was later to shown to hold under the weaker hypothesis , where . In this paper, we reduce the restriction on even further to an optimal, best-possible value, showing we need only assume to obtain the same conclusions, with the bound further improved for several classes of near-cyclic groups.
Cite
@article{arxiv.1709.09288,
title = {Iterated Sumsets and Setpartitions},
author = {David J. Grynkiewicz},
journal= {arXiv preprint arXiv:1709.09288},
year = {2017}
}
Comments
arXiv admin note: text overlap with arXiv:1709.09285