Approximate McKean-Vlasov Representations for a class of SPDEs
Abstract
The solution =(t)t≥ 0 of a class of linear stochastic partial differential equations is approximated using Clark's robust representation approach (c, cc). The ensuing approximations are shown to coincide with the time marginals of solutions of a certain McKean-Vlasov type equation. We prove existence and uniqueness of the solution of the McKean-Vlasov equation. The result leads to a representation of as a limit of empirical distributions of systems of equally weighted particles. In particular, the solution of the Zakai equation and that of the Kushner-Stratonovitch equation (the two main equations of nonlinear filtering) are shown to be approximated the empirical distribution of systems of particles that have equal weights (unlike those presented in kj1 and kj2) and do not require additional correction procedures (such as those introduced in dan3, dan4, dmm, etc).
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