On the Bipartiteness Constant and Expansion of Cayley Graphs

Abstract

Let G be a finite, undirected d-regular graph and A(G) its normalized adjacency matrix, with eigenvalues 1 = λ1(A)≥ … λn -1. It is a classical fact that λn = -1 if and only if G is bipartite. Our main result provides a quantitative separation of λn from -1 in the case of Cayley graphs, in terms of their expansion. Denoting hout by the (outer boundary) vertex expansion of G, we show that if G is a non-bipartite Cayley graph (constructed using a group and a symmetric generating set of size d) then λn -1 + chout2/d2\,, for c an absolute constant. We exhibit graphs for which this result is tight up to a factor depending on d. This improves upon a recent result by Biswas and Saha who showed λn -1 + hout4/(29d8)\,. We also note that such a result could not be true for general non-bipartite graphs.