Lower bounds for the isoperimetric numbers of random regular graphs

Abstract

The vertex isoperimetric number of a graph G=(V,E) is the minimum of the ratio |∂VU|/|U| where U ranges over all nonempty subsets of V with |U|/|V| u and ∂VU is the set of all vertices adjacent to U but not in U. The analogously defined edge isoperimetric number---with ∂VU replaced by ∂EU, the set of all edges with exactly one endpoint in U---has been studied extensively. Here we study random regular graphs. For the case u=1/2, we give asymptotically almost sure lower bounds for the vertex isoperimetric number for all d3. Moreover, we obtain a lower bound on the asymptotics as d∞. We also provide asymptotically almost sure lower bounds on |∂EU|/|U| in terms of an upper bound on the size of U and analyse the bounds as d∞.