Uniform exclude distributions of Sidon sets

Abstract

A Sidon set S in F2n is a set such that the pairwise sums of distinct points are all distinct. The exclude points of a Sidon set S are the sums of three distinct points in S, and the exclude multiplicity of a point in F2n S is the number of such triples in S it is equal to. We call the function dS F2n S Z≥ 0 taking points in F2n S to their exclude multiplicity the exclude distribution of S. We say that dS is uniform on P if P is an equally-sized partition P of F2n S such that dS takes the same values an equal number of times on every element of P. In this paper, we use APN plateaued functions with all component functions unbalanced to construct Sidon sets S in (F2n)2 whose exclude distributions are uniform on natural partitions of (F2n)2 S into 2n elements. We use this result and a result of Carlet to determine exactly what values the exclude distributions of the graphs of the Gold and Kasami functions take and how often they take these values.

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