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Generalized More Sums Than Differences Sets

A More Sums Than Differences (MSTD, or sum-dominant) set is a finite set $A\subset \mathbb{Z}$ such that $|A+A|<|A-A|$. Though it was believed that the percentage of subsets of $\{0,...,n\}$ that are sum-dominant tends to zero, in 2006 Martin and O&#39;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 $|ε_1A+...+ε_kA|>|δ_1A+...+δ_kA|$ a positive percent of the time for all nontrivial choices of $ε_j,δ_j\in \{-1,1\}$. 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 $m$, $|ε_1A + ... + ε_kA| - |δ_1A + ... + δ_kA| = m$ a positive percentage of the time. We find the limiting behavior of $kA=A+...+A$ for an arbitrary set $A$ as $k\to\infty$ and an upper bound of $k$ for such behavior to settle down. Finally, we say $A$ is $k$-generational sum-dominant if $A$, $A+A$, ...,$kA$ are all sum-dominant. Numerical searches were unable to find even a 2-generational set (heuristics indicate the probability is at most $10^{-9}$, and almost surely significantly less). We prove the surprising result that for any $k$ a positive percentage of sets are $k$-generational, and no set can be $k$-generational for all $k$.