Small separations in vertex transitive graphs

Abstract

Let k be an integer. We prove a rough structure theorem for separations of order at most k in finite and infinite vertex transitive graphs. Let G = (V,E) be a vertex transitive graph, let A ⊂eq V be a finite vertex-set with |A| |V|/2 and |\v ∈ V A : u v for some u ∈ A \| k. We show that whenever the diameter of G is at least 31(k+1)2, either |A| 2k3+k2, or G has a ring-like structure (with bounded parameters), and A is efficiently contained in an interval. This theorem may be viewed as a rough characterization, generalizing an earlier result of Tindell, and has applications to the study of product sets and expansion in groups.