A study of 2-ended graphs via harmonic functions

Abstract

We prove that every recurrent graph G quasi-isometric to R admits an essentially unique Lipschitz harmonic function h. If G is vertex-transitive, then the action of Aut(G) preserves ∂ h up to a sign, a fact that we exploit to prove various combinatorial results about G. As a consequence, we prove the 2-ended case of the conjecture of Grimmett & Li that the connective constant of a non-degenerate vertex-transitive graph is at least the golden mean. Moreover, answering a question of Watkins from 1990, we construct a cubic, 2-ended, vertex-transitive graph which is not a Cayley graph.