Infinite Families of Partitions into MSTD Subsets

Abstract

A set A is MSTD (more-sum-than-difference) if |A+A|>|A-A|. Though MSTD sets are rare, Martin and O'Bryant proved that there exists a positive constant lower bound for the proportion of MSTD subsets of \1,2,… ,r\ as r→∞. Later, Asada et al. showed that there exists a positive constant lower bound for the proportion of decompositions of \1,2,…,r\ into two MSTD subsets as r→∞. However, the method is probabilistic and does not give explicit decompositions. Continuing this work, we provide an efficient method to partition \1,2,…,r\ (for r sufficiently large) into k 2 MSTD subsets, positively answering a question raised by Asada et al. as to whether this is possible for all such k. Next, let R(k) be the smallest integer such that for all r R(k), \1,2,…,r\ can be k-decomposed into MSTD subsets. We establish rough lower and upper bounds for R(k). Lastly, we provide a sufficient condition on when there exists a positive constant lower bound for the proportion of decompositions of \1,2,…,r\ into k MSTD subsets as r→ ∞.