Stochastic intrinsic gradient flows on the Wasserstein space

Abstract

We construct stochastic gradient flows on the 2-Wasserstein space P2 over Rd for energy functionals of the type WF( d x)=∫ RdF(x,(x))d x. The functions F and ∂2 F are assumed to be locally Lipschitz on Rd× (0,∞). This includes the relevant examples of WF as the entropy functional or more generally the Lyapunov function of generalized porous media equations. First we define a class of Gaussian-based measures on P2 together with a corresponding class of symmetric Markov processes (Rt)t≥ 0. Next, using Dirichlet form techniques we perform stochastic quantization for the perturbations of these objects which result from multiplying such a measure by a density proportional to e-WF. Finally we show that the intrinsic gradient DWF(μ) is defined for -a.e. μ and that the Gaussian-based reference measure can be chosen in such way that the distorted process (μt)t≥ 0 is a martingale solution for the equation dμt=-DWF(μt) d t+d Rt, t≥ 0.