On an application of higher energies to Sidon sets
Abstract
We show that for any finite set A and an arbitrary >0 there is k=k() such that the higher energy Ek(A) is at most |A|k+ unless A has a very specific structure. As an application we obtain that any finite subset A of the real numbers or the prime field either contains an additive Sidon--type subset of size |A|1/2+c or a multiplicative Sidon--type subset of size |A|1/2+c.
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