Aldous-type Spectral Gaps in Unitary Groups

Abstract

Aldous' spectral gap conjecture, proven by Caputo, Liggett and Richthammer, states the following: for any set of transpositions in the symmetric group Sym(n), the spectral gap of the corresponding random walk on the group -- an n!-state process -- coincides with that of the corresponding random walk of a single element -- an n-state process. This paper presents an analog of this conjecture in the unitary group U(n), and proves it in several non-trivial cases. The phenomenon we discover is that for some natural families of probability distributions on U(n), the spectral gap of the corresponding random walk, which has a continuous state space, is identical to that of a discrete KMP process (also known as the uniform reshuffling process) with two indistinguishable particles on a hypergraph on n vertices -- a discrete Markov chain with n+12 states.