Sets with large additive energy and symmetric sets
Abstract
We show that for any set A in a finite Abelian group G that has at least c |A|3 solutions to a1 + a2 = a3 + a4, where ai belong A there exist sets A' in A and L in G, |L| c-1 log |A| such that A' is contained in Span of L and A' has approximately c |A|3 solutions to a'1 + a'2 = a'3 + a'4, where a'i belong A'. We also study so-called symmetric sets or, in other words, sets of large values of convolution.
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