The structure of Sidon set systems

Abstract

A family F⊂ 2G of subsets of an abelian group G is a Sidon system if the sumsets A+B with A,B∈ F are pairwise distinct. Cilleruelo, Serra and the author previously proved that the maximum size Fk(n) of a Sidon system consisting of k-subsets of the first n positive integers satisfies Ck nk-1≤ Fk(n) ≤ n-1k-1+n-k for some constant Ck only depending on k. We close the gap by proving an essentially tight structural result that in particular implies Fk(n)≥ (1-o(1))nk-1. We also use this to establish a result about the size of the largest Sidon system in the binomial random family [n]kp. Extensions to h-fold sumsets for any fixed h≥ 3 are also obtained.

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