Liouville Brownian motion

Abstract

We construct a stochastic process, called the Liouville Brownian motion, which is the Brownian motion associated to the metric eγ X(z)\,dz2, γ<γc=2 and X is a Gaussian Free Field. Such a process is conjectured to be related to the scaling limit of random walks on large planar maps eventually weighted by a model of statistical physics which are embedded in the Euclidean plane or in the sphere in a conformal manner. The construction amounts to changing the speed of a standard two-dimensional Brownian motion Bt depending on the local behavior of the Liouville measure "Mγ(dz)=eγ X(z)\,dz". We prove that the associated Markov process is a Feller diffusion for all γ<γc=2 and that for all γ<γc, the Liouville measure Mγ is invariant under Pt. This Liouville Brownian motion enables us to introduce a whole set of tools of stochastic analysis in Liouville quantum gravity, which will be hopefully useful in analyzing the geometry of Liouville quantum gravity.