A stochastically perturbed mean curvature flow by colored noise

Abstract

We study the motion of the hypersurface (γt)t≥ 0 evolving according to the mean curvature perturbed by wQ, the formal time derivative of the Q-Wiener process wQ, in a two dimensional bounded domain. Namely, we consider the equation describing the evolution of γt as a stochastic partial differential equation (SPDE) with a multiplicative noise in the Stratonovich sense, whose inward velocity V is determined by V=\,+\,G wQ, where is the mean curvature and G is a function determined from γt. Already known results in which the noise depends on only time variable is not applicable to our equation. To construct a local solution of the equation describing γt, we will derive a certain second order quasilinear SPDE with respect to the signed distance function determined from γ0. Then we construct the local solution making use of probabilistic tools and the classical Banach fixed-point theorem on suitable Sobolev spaces.