Wen Lu, Yong Ren, Lanying Hu
Published 2013-10-22Version 1
In this paper, we deal with a class of mean-field backward stochastic differential equations with subdifferrential operator corresponding to a lower semi-continuous convex function. By means of Yosida approximation, the existence and uniqueness of the solution is established. As an application, we give a probability interpretation for the viscosity solutions of a class of nonlocal parabolic variational inequalities.
Maximum principle for SPDEs and its applications
A new formula for some linear stochastic equations with applications
Oscillation of harmonic functions for subordinate Brownian motion and its applications
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