On Cherny's results in infinite dimensions: A theorem dual to Yamada-Watanabe

Abstract

We prove that joint uniqueness in law and the existence of a strong solution imply pathwise uniqueness for variational solutions to stochastic partial differential equations of the form align* dXt=b(t,X)dt+σ(t,X)dWt, \,\,\,t≥ 0, align* and show that for such equations uniqueness in law is equivalent to joint uniqueness in law. Here W is a cylindrical Wiener process in a separable Hilbert space U and the equation is considered in a Gelfand triple V ⊂eq H ⊂eq E, where H is some separable (infinite-dimensional) Hilbert space. This generalizes the corresponding results of A. Cherny for the case of finite-dimensional equations.