Mean-field backward stochastic Volterra integral equations: well-posedness and related particle system

Abstract

This paper studies the mean-field backward stochastic Volterra integral equations (mean-field BSVIEs) and associated particle systems. We establish the existence and uniqueness of solutions to mean-field BSVIEs when the generator g is of linear growth or quadratic growth with respect to Z, respectively. Moreover, the propagation of chaos is analyzed for the corresponding particle systems under two conditions. When g is of linear growth in Z, the convergence rate is proven to be of order Q(N). When g is of quadratic growth in Z and is independent of the law of Z, we not only establish the convergence of the particle systems but also derive a convergence rate of order O(N-12λ), where λ>1.

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