Cutoff for product replacement on finite groups
Abstract
We analyze a Markov chain, known as the product replacement chain, on the set of generating n-tuples of a fixed finite group G. We show that as n → ∞, the total-variation mixing time of the chain has a cutoff at time 32 n n with window of order n. This generalizes a result of Ben-Hamou and Peres (who established the result for G = Z/2) and confirms a conjecture of Diaconis and Saloff-Coste that for an arbitrary but fixed finite group, the mixing time of the product replacement chain is O(n n).
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