Cutoff for Ramanujan graphs via degree inflation

Abstract

Recently Lubetzky and Peres showed that simple random walks on a sequence of d-regular Ramanujan graphs Gn=(Vn,En) of increasing sizes exhibit cutoff in total variation around the diameter lower bound dd-2d-1|Vn| . We provide a different argument under the assumption that for some r(n) 1 the maximal number of simple cycles in a ball of radius r(n) in Gn is uniformly bounded in n.