It\o-Stratonovich Conversion in Infinite Dimensions for Unbounded, Time-Dependent, Nonlinear Operators

Abstract

We prove that a solution, in a variational framework, to the Stratonovich stochastic partial differential equation with noise G(t, t) dWt is given by a solution to the It\o equation with It\o-Stratonovich corrector 12Σi=1∞ DuGi(t, t)[Gi(t,t)]dt. Here Gi denotes the action of G on the ith component of the cylindrical noise, and DuGi its Fr\'echet partial derivative in the Hilbert space for which the It\o form is satisfied. The noise operator G may be time-dependent, nonlinear, and unbounded in the sense of differential operators; in the latter case, one must pass to a larger space in order to solve the Stratonovich equation. Our proof relies on martingale techniques, and the results apply to fluid equations with time-dependent and nonlinear transport noise.