MSTD sets and Freiman isomorphisms

Abstract

An MSTD set is a finite set with more pairwise sums than differences. (,)-ismorphisms are generalizations of Freiman isomorphisms to arbitrary linear forms. These generalized isomorphisms are used to prove that every finite set of real numbers is Freiman isomorphic to a finite set of integers. This implies that there exists no MSTD set A of real numbers with |A| ≤ 7, and, up to Freiman isomorphism, there exists exactly one MSTD set A of real numbers with |A| = 8.