Dimension reduction for maximum matchings and the Fastest Mixing Markov Chain

Abstract

Let G = (V,E) be an undirected graph with maximum degree and vertex conductance *(G). We show that there exists a symmetric, stochastic matrix P, with off-diagonal entries supported on E, whose spectral gap γ*(P) satisfies \[*(G)2/ γ*(P) *(G).\] Our bound is optimal under the Small Set Expansion Hypothesis, and answers a question of Olesker-Taylor and Zanetti, who obtained such a result with replaced by |V|. In order to obtain our result, we show how to embed a negative-type semi-metric d defined on V into a negative-type semi-metric d' supported in RO(), such that the (fractional) matching number of the weighted graph (V,E,d) is approximately equal to that of (V,E,d').