English

A geometric perspective on the MSTD question

Combinatorics 2017-09-05 v1 Number Theory

Abstract

A more sums than differences (MSTD) set AA is a subset of Z\mathbb{Z} for which A+A>AA|A+A| > |A-A|. Martin and O'Bryant used probabilistic techniques to prove that a non-vanishing proportion of subsets of {1,,n}\{1, \dots, n\} are MSTD as nn \to \infty. However, to date only a handful of explicit constructions of MSTD sets are known. We study finite collections of disjoint intervals on the real line, I\mathbb{I}, and explore the MSTD question for such sets, as well as the relation between such sets and MSTD subsets of Z\mathbb{Z}. In particular we show that every finite subset of Z\mathbb{Z} can be transformed into an element of I\mathbb{I} with the same additive behavior. Using tools from discrete geometry, we show that there are no MSTD sets in I\mathbb{I} consisting of three or fewer intervals, but there are MSTD sets for four or more intervals. Furthermore, we show how to obtain an infinite parametrized family of MSTD subsets of Z\mathbb{Z} from a single such set AA; these sets are parametrized by lattice points satisfying simple congruence relations contained in a polyhedral cone associated to AA.

Keywords

Cite

@article{arxiv.1709.00606,
  title  = {A geometric perspective on the MSTD question},
  author = {Steven J. Miller and Carsten Peterson},
  journal= {arXiv preprint arXiv:1709.00606},
  year   = {2017}
}

Comments

22 pages

R2 v1 2026-06-22T21:31:26.692Z