Sharp bound for the Erdos-Straus non-averaging set problem

Abstract

A set of integers A is non-averaging if there is no element a in A which can be written as an average of a subset of A not containing a. We show that the largest non-averaging subset of \1, …, n\ has size n1/4+o(1), thus solving the Erdos-Straus problem. We also determine the largest size of a non-averaging set in a d-dimensional box for any fixed d. Our main tool includes the structure theorem for the set of subset sums due to Conlon, Fox and the first author, together with a result about the structure of a point set in nearly convex position.

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