Cutoff for the Bernoulli-Laplace urn model with o(n) swaps

Abstract

We study the mixing time of the (n,k) Bernoulli--Laplace urn model, where k∈\0,1,…,n\. Consider two urns, each containing n balls, so that when combined they have precisely n red balls and n white balls. At each step of the process choose uniformly at random k balls from the left urn and k balls from the right urn and switch them simultaneously. We show that if k=o(n), this Markov chain exhibits mixing time cutoff at n4k n and window of the order nk n. This is an extension of a classical theorem of Diaconis and Shahshahani who treated the case k=1.