Fringe pairs in generalized MSTD sets

Abstract

A More Sums Than Differences (MSTD) set is a set A for which |A+A|>|A-A|. Martin and O'Bryant proved that the proportion of MSTD sets in \0,1,…,n\ is bounded below by a positive number as n goes to infinity. Iyer, Lazarev, Miller and Zhang introduced the notion of a generalized MSTD set, a set A for which |sA-dA|>|σ A-δ A| for a prescribed s+d=σ+δ. We offer efficient constructions of k-generational MSTD sets, sets A where A, A+A, …, kA are all MSTD. We also offer an alternative proof that the proportion of sets A for which |sA-dA|-|σ A-δ A|=x is positive, for any x ∈ Z. We prove that for any ε>0, (1-ε< |sA-dA|/|σ A-δ A|<1+ε) goes to 1 as the size of A goes to infinity and we give a set A which has the current highest value of |A+A|/ |A-A|. We also study decompositions of intervals \0,1,…,n\ into MSTD sets and prove that a positive proportion of decompositions into two sets have the property that both sets are MSTD.