Well-posedness of stochastic continuity equations on Riemannian manifolds

Abstract

We analyze continuity equations with Stratonovich stochasticity, ∂ + divh [ (u(t,x)+Σi=1N ai(x) Wi(t) ) ]=0, defined on a smooth closed Riemannian manifold M with metric h. The velocity field u is perturbed by Gaussian noise terms W1(t),…, WN(t) driven by smooth spatially dependent vector fields a1(x),…,aN(x) on M. The velocity u belongs to L1t W1,2x with divh u bounded in Lpt,x for p>d+2, where d is the dimension of M (we do not assume divh u ∈ L∞t,x). We show that by carefully choosing the noise vector fields ai (and the number N of them), the initial-value problem is well-posed in the class of weak L2 solutions, although the problem can be ill-posed in the deterministic case because of concentration effects. The proof of this "regularization by noise" result reveals a link between the nonlinear structure of the underlying domain M and the noise, a link that is somewhat hidden in the Euclidian case (ai constant) Beck:2019,Flandoli-Gubinelli-Priola,Neves:2015aa. The proof is based on an a priori estimate in L2, which is obtained by a duality method, and a weak compactness argument.

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