Uniformly distributed distances: A geometric application of Jansen's inequality

Abstract

Let d1≤ d2≤…≤ dn 2 denote the distances determined by n points in the plane. It is shown that Σi (di+1-di)2=O(n-6/7), where the minimum is taken over all point sets with minimal distance d1 ≥ 1. This bound is asymptotically tight.

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