Random walks and quadratic number fields

Abstract

We establish a novel type of connection between random walks and analytic number theory. Working with a random walk on the circle group R/Z in which each step is a random integer multiple of a given quadratic irrational α, we show that the rate of convergence to uniformity in the quadratic Wasserstein metric (also known as the periodic L2 discrepancy) is governed by deep arithmetic invariants of the ring of algebraic integers of the real quadratic field Q(α), such as fundamental units and special values of zeta functions.

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