Stochastic variational inequalities and applications to the total variation flow perturbed by linear multiplicative noise

Abstract

In this work, we introduce a new method to prove the existence and uniqueness of a variational solution to the stochastic nonlinear diffusion equation dX(t)= div [∇ X(t)|∇ X(t)|]dt+X(t)dW(t) in (0,∞)×O, where O is a bounded and open domain in RN, N 1, and W(t) is a Wiener process of the form W(t)=Σ∞k=1μk ekβk(t), ek ∈ C2() H10(O), and βk, k∈N, are independent Brownian motions. This is a stochastic diffusion equation with a highly singular diffusivity term and one main result established here is that, for all initial conditions in L2(O), it is well posed in a class of continuous solutions to the corresponding stochastic variational inequality. Thus one obtains a stochastic version of the (minimal) total variation flow. The new approach developed here also allows to prove the finite time extinction of solutions in dimensions 1 N 3, which is another main result of this work. Keywords: stochastic diffusion equation, Brownian motion, bounded variation, convex functions, bounded variation flow.