High-Dimensional Expanders, the Sparsest Cut Problem, and Steurer's Conjecture

Abstract

In 2010, Steurer conjectured that any family of n unit-norm vectors v1,…,vn with polynomially small average correlation Ei,j| vi,vj|≤ n-ε contains linear-sized constant-separated sets. We refute this conjecture in a strong sense using the machinery of sparse high-dimensional expanders: such vector families do not even have linear-sized 11/4-o(1)(n)-separated sets. Consequently, we show that there are families of vertex expanders on n vertices for which the (average) L2-mixing time to the uniform distribution of any reweighted simple random walk is at least 5/4-o(1) n.