Varadhan Asymptotics for the Heat Kernel on Finite Graphs

Abstract

Let G be a simple, finite graph and let pt(x,y) denote the heat kernel on G. The purpose of this short note is to show that for t → 0+ pt(x,y) = \# \paths of length~d(x,y)~between~x~and~y\ td(x,y)d(x,y)! + O(td(x,y)+1), where d(x,y) is the usual Graph distance. This is the discrete analogue of the classical Varadhan asymptotic for the heat kernel on manifolds and refines a result of Keller, Lenz, M\"unch, Schmidt and Telcs. The asymptotic behavior encapsulates additional geometric information: if the Graph is bipartite, then the next term in the expansion is negative.