Generalized More Sums Than Differences Sets
Abstract
A More Sums Than Differences (MSTD, or sum-dominant) set is a finite set such that . Though it was believed that the percentage of subsets of that are sum-dominant tends to zero, in 2006 Martin and O'Bryant \cite{MO} proved a positive percentage are sum-dominant. We generalize their result to the many different ways of taking sums and differences of a set. We prove that a positive percent of the time for all nontrivial choices of . Previous approaches proved the existence of infinitely many such sets given the existence of one; however, no method existed to construct such a set. We develop a new, explicit construction for one such set, and then extend to a positive percentage of sets. We extend these results further, finding sets that exhibit different behavior as more sums/differences are taken. For example, notation as above we prove that for any , a positive percentage of the time. We find the limiting behavior of for an arbitrary set as and an upper bound of for such behavior to settle down. Finally, we say is -generational sum-dominant if , , ..., are all sum-dominant. Numerical searches were unable to find even a 2-generational set (heuristics indicate the probability is at most , and almost surely significantly less). We prove the surprising result that for any a positive percentage of sets are -generational, and no set can be -generational for all .
Cite
@article{arxiv.1108.4500,
title = {Generalized More Sums Than Differences Sets},
author = {Geoffrey Iyer and Oleg Lazarev and Steven J. Miller and Liyang Zhang},
journal= {arXiv preprint arXiv:1108.4500},
year = {2011}
}
Comments
version 1.1, 20 pages, 2 figures, to appear in the Journal of Number Theory