Sets Characterized by Missing Sums and Differences in Dilating Polytopes
Abstract
A sum-dominant set is a finite set of integers such that . As a typical pair of elements contributes one sum and two differences, we expect sum-dominant sets to be rare in some sense. In 2006, however, Martin and O'Bryant showed that the proportion of sum-dominant subsets of is bounded below by a positive constant as . Hegarty then extended their work and showed that for any prescribed , the proportion of subsets of that are missing exactly sums in and exactly differences in also remains positive in the limit. We consider the following question: are such sets, characterized by their sums and differences, similarly ubiquitous in higher dimensional spaces? We generalize the integers in a growing interval to the lattice points in a dilating polytope. Specifically, let be a polytope in with vertices in , and let now denote the proportion of subsets of that are missing exactly sums in and exactly differences in . As it turns out, the geometry of has a significant effect on the limiting behavior of . We define a geometric characteristic of polytopes called local point symmetry, and show that is bounded below by a positive constant as if and only if is locally point symmetric. We further show that the proportion of subsets in that are missing exactly sums and at least differences remains positive in the limit, independent of the geometry of . A direct corollary of these results is that if is additionally point symmetric, the proportion of sum-dominant subsets of also remains positive in the limit.
Cite
@article{arxiv.1406.2052,
title = {Sets Characterized by Missing Sums and Differences in Dilating Polytopes},
author = {Thao Do and Archit Kulkarni and Steven J. Miller and David Moon and Jake Wellens and James Wilcox},
journal= {arXiv preprint arXiv:1406.2052},
year = {2014}
}
Comments
Version 1.1, 23 pages, 7 pages, fixed some typos