Continuity and estimates of the Liouville heat kernel with applications to spectral dimensions

Abstract

The Liouville Brownian motion (LBM), recently introduced by Garban, Rhodes and Vargas and in a weaker form also by Berestycki, is a diffusion process evolving in a planar random geometry induced by the Liouville measure Mγ, formally written as Mγ(dz)=eγ X(z)-γ2 E[X(z)2]/2\, dz, γ∈(0,2), for a (massive) Gaussian free field X. It is an Mγ-symmetric diffusion defined as the time change of the two-dimensional Brownian motion by the positive continuous additive functional with Revuz measure Mγ. In this paper we provide a detailed analysis of the heat kernel pt(x,y) of the LBM. Specifically, we prove its joint continuity, a locally uniform sub-Gaussian upper bound of the form pt(x,y)≤ C1 t-1 (t-1) (-C2((|x-y|β 1)/t)1β -1) for t∈(0,12] for each β>12(γ+2)2, and an on-diagonal lower bound of the form pt(x,x)≥ C3t-1((t-1))-η for t∈(0,tη(x)], with tη(x)∈(0,12] heavily dependent on x, for each η>18 for Mγ-almost every x. As applications, we deduce that the pointwise spectral dimension equals 2 Mγ-a.e.\ and that the global spectral dimension is also 2.