$C-(k, \ell)$-Sum-Free Sets
Combinatorics
2020-09-15 v3
Abstract
The Minkowski sum of two subsets and of a finite abelian group is defined as all pairwise sums of elements of and : . The largest size of a -sum-free set in has been of interest for many years and in the case has recently been computed by Bajnok and Matzke. Motivated by sum-free sets of the torus, Kravitz introduces the noisy Minkowski sum of two sets, which can be thought of as discrete evaluations of these continuous sumsets. That is, given a noise set , the noisy Minkowski sum is defined as . We give bounds on the maximum size of a -sum-free subset of under this new sum, for equal to an arithmetic progression with common difference relatively prime to and for any two element set .
Keywords
Cite
@article{arxiv.2001.00327,
title = {$C-(k, \ell)$-Sum-Free Sets},
author = {Rachel Zhang},
journal= {arXiv preprint arXiv:2001.00327},
year = {2020}
}