Cutoff for Rewiring Dynamics on Perfect Matchings

Abstract

We establish cutoff for a natural random walk (RW) on the set of perfect matchings (PMs). An n-PM is a pairing of 2n objects. The k-PM RW selects k pairs uniformly at random, disassociates the corresponding 2k objects, then chooses a new pairing on these 2k objects uniformly at random. The equilibrium distribution is uniform over the set of all n-PM. We establish cutoff for the k-PM RW whenever 2 k n. If k 1, then the mixing time is nk n to leading order. The case k = 2 was established by Diaconis and Holmes (2002) by relating the 2-PM RW to the random transpositions card shuffle and also by Ceccherini-Silberstein, Scarabotti and Tolli (2007, 2008) using representation theory. We are the first to handle k > 2. Our argument builds on previous work of Berestycki, Schramm, Seng\"ul and Zeitouni (2005, 2011, 2019) regarding conjugacy-invariant RWs on the permutation group.