Localized Quantitative Criteria for Equidistribution

Abstract

Let (xn)n=1∞ be a sequence on the torus T (normalized to length 1). We show that if there exists a sequence of positive real numbers (tn)n=1∞ converging to 0 such that N → ∞ 1N2 Σm,n = 1N 1tN (- 1tN (xm - xn)2 ) = π, then (xn)n=1∞ is uniformly distributed. This is especially interesting when tN is close to N-2 since the size of the sum is then mostly determined by local gaps at scale N-1. A similar argument can then be used to show equidistribution of sequences with Poissonian pair correlation, which recovers a recent result of Aistleitner, Lachmann \& Pausinger and Grepstad \& Larcher. The general form of the result is proven on arbitrary compact manifolds (M,g) where the role of the exponential function is played by the heat kernel et: for all x1, …, xN ∈ M and all t>0 1N2 Σm,n=1N [etδxm](xn) ≥ 1vol(M) and equality is attained as N → ∞ if and only if (xn)n=1∞ equidistributes.