On sensitivity of mixing times and cutoff

Abstract

A sequence of chains exhibits (total-variation) cutoff (resp., pre-cutoff) if for all 0<ε< 1/2, the ratio tmix(n)(ε)/tmix(n)(1-ε) tends to 1 as n ∞ (resp., the of this ratio is bounded uniformly in ε), where tmix(n)(ε) is the ε-total-variation mixing-time of the nth chain in the sequence. We construct a sequence of bounded degree graphs Gn, such that the lazy simple random walks (LSRW) on Gn satisfy the "product condition" gap(Gn) tmix(n)(ε) ∞ as n ∞, where gap(Gn) is the spectral gap of the LSRW on Gn (a known necessary condition for pre-cutoff that is often sufficient for cutoff), yet this sequence does not exhibit pre-cutoff. Recently, Chen and Saloff-Coste showed that total-variation cutoff is equivalent for the sequences of continuous-time and lazy versions of some given sequence of chains. Surprisingly, we show that this is false when considering separation cutoff. We also construct a sequence of bounded degree graphs Gn=(Vn,En) that does not exhibit cutoff, for which a certain bounded perturbation of the edge weights leads to cutoff and increases the order of the mixing-time by an optimal factor of ( |Vn|). Similarly, we also show that "lumping" states together may increase the order of the mixing-time by an optimal factor of ( |Vn|). This gives a negative answer to a question asked by Aldous and Fill.