Multivalued backward stochastic differential equations with jumps and moving boundary

Abstract

We prove existence and uniqueness for a one-dimensional multivalued backward stochastic differential equation with jumps. The equation involves a time-indexed family of maximal monotone operators kt(·) associated with increasing functions k(t,·) taking values in R- and having domains that are intervals with time-dependent boundaries. Existence is obtained by a penalization method under a Lipschitz condition on the driver in (y,z), a monotonicity condition in the jump parameter , square-integrability of the terminal condition and the driver, and local-in-time integrability conditions on k(·,y). We also address the extension to the case where the operators kt(·) act on unbounded intervals.

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