Solutions of SPDE's associated with a stochastic flow

Abstract

We consider the following stochastic partial differential equation, align* &dYt=L Ytdt+A Yt· dBt\\ &Y0=, align* associated with a stochastic flow \X(t,x)\, for t ≥ 0, x ∈ Rd, as in [Rajeev \& Thangavelu, Probabilistic representations of solutions of the forward equations, Potential Anal. 28 (2008), no.~2, 139--162]. We show that the strong solutions constructed there are `locally of compact support'. Using this notion,we define the mild solutions of the above equation and show the equivalence between strong and mild solutions in the multi Hilbertian space S. We show uniqueness of solutions in the case when is smooth via the `monotonicity inequality' for (L,A), which is a known criterion for uniqueness.