Ollivier-Ricci curvature and the spectrum of the normalized graph Laplace operator

Abstract

We prove the following estimate for the spectrum of the normalized Laplace operator on a finite graph G, equation*1- (1- k[t])1t≤ λ1 ≤ ·s ≤ λN-1≤ 1+ (1- k[t])1t, \,∀ \,\,integers\,\, t≥ 1. equation* Here k[t] is a lower bound for the Ollivier-Ricci curvature on the neighborhood graph G[t], which was introduced by Bauer-Jost. In particular, when t=1 this is Ollivier's estimates k≤ λ1≤ … ≤ λN-1≤ 2-k. For sufficiently large t we show that, unless G is bipartite, our estimates for λ1 and λN-1 are always nontrivial and improve Ollivier's estimates for all graphs with k≤ 0. By definition neighborhood graphs are weighted graphs which may have loops. To understand the Ollivier-Ricci curvature on neighborhood graphs, we generalize a sharp estimate of the Ricci curvature given by Jost-Liu to weighted graphs with loops and relate it to the relative local frequency of triangles and loops.