Cutoff for generalised Bernoulli-Laplace urn models
Abstract
We introduce a multi-colour multi-urn generalisation of the Bernoulli-Laplace urn model, consisting of d urns, m colours, and dmn balls, with dn balls of each colour and mn balls in each urn. At each step, one ball is drawn uniformly at random from each urn, and the chosen balls are redistributed among the urns based on a permutation drawn from a distribution μ on the symmetric group Sd. We study the mixing time of this Markov chain for fixed m, d, and μ, as n → ∞. We show that there is cutoff whenever the chain on [d] corresponding to the evolution of a single ball is irreducible, and that the same holds for a labeled version of the model. As an application, we also obtain partial results on cutoff for a card shuffling version of the model in which the cards are labeled and their ordering within each stack matters.
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