Positive-definite Functions, Exponential Sums and the Greedy Algorithm: a curious Phenomenon

Abstract

We describe a curious dynamical system that results in sequences of real numbers in [0,1] with seemingly remarkable properties. Let the function f:T → R satisfy f(k) ≥ c|k|-2 and define a sequence via xn = x Σk=1n-1f(x-xk). Such sequences (xn)n=1∞ seem to be astonishingly regularly distributed in various ways (satisfying favorable exponential sum estimates; every interval J ⊂ [0,1] contains |J|n elements). We prove W2( 1n Σk=1nδxk, dx) ≤ cn, where W2 is the 2-Wasserstein distance. Much stronger results seem to be true and it seems like an interesting problem to understand this dynamical system better. We obtain optimal results in dimension d ≥ 3: using G(x,y) to denote the Green's function of the Laplacian on a compact manifold, we show that xn = x ∈ M Σk=1n-1G(x,xk) satisfies W2( 1n Σk=1nδxk, dx) 1n1/d.