BSDE and generalized Dirichlet forms: the infinite dimensional case
Abstract
We consider the following quasi-linear parabolic system of backward partial differential equations on a Banach space : on , where is a possibly degenerate second order differential operator with merely measurable coefficients. We solve this system in the framework of generalized Dirichlet forms and employ the stochastic calculus associated to the Markov process with generator to obtain a probabilistic representation of the solution by solving the corresponding backward stochastic differential equation. The solution satisfies the corresponding mild equation which is equivalent to being a generalized solution of the PDE. A further main result is the generalization of the martingale representation theorem in infinite dimension using the stochastic calculus associated to the generalized Dirichlet form given by . The nonlinear term satisfies a monotonicity condition with respect to and a Lipschitz condition with respect to .
Keywords
Cite
@article{arxiv.1201.3186,
title = {BSDE and generalized Dirichlet forms: the infinite dimensional case},
author = {Rongchan Zhu},
journal= {arXiv preprint arXiv:1201.3186},
year = {2012}
}