The popularity gap
Abstract
Suppose that A is a finite, nonempty subset of a cyclic group of either infinite or prime order. We show that if the difference set A-A is ``not too large'', then there is a nonzero group element with at least as many as (2+o(1))|A|2/|A-A| representations as a difference of two elements of A; that is, the second largest number of representations is, essentially, twice the average. Here the coefficient 2 is the best possible. We also prove continuous and multidimensional versions of this result, and obtain similar results for sufficiently dense subsets of an arbitrary abelian group.
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