Average principles for forward-backward multivalued stochastic systems and homogenization for systems of nonlinear parabolic PDEs

Abstract

This work concerns about forward-backward multivalued stochastic systems. First of all, we prove one average principle for general stochastic differential equations in the L2p (p≥ 1) sense. Moreover, for p=1 a convergence rate is presented. Then combining general stochastic differential equations with backward stochastic variation inequalities, we establish the other average principle for backward stochastic variation inequalities in the L2 sense through a time discretization method. Finally, we apply our result to nonlinear parabolic partial differential equations and obtain the homogenization of them.

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