Cutoffs for exclusion and interchange processes on finite graphs

Abstract

We prove a general theorem on cutoffs for symmetric exclusion and interchange processes on finite graphs GN=(VN,EN), under the assumption that either the graphs converge geometrically and spectrally to a compact metric measure space, or they are isomorphic to discrete Boolean hypercubes. Specifically, cutoffs occur at times tN= (2γ1N)-1 |VN|, where γ1N is the spectral gap of the symmetric random walk process on GN. Under the former assumption, our theorem is applicable to the said processes on graphs such as: the d-dimensional discrete grids and tori for any integer dimension d; the L-th powers of cycles for fixed L, a.k.a. the L-adjacent transposition shuffle; and self-similar fractal graphs and products thereof.