Optimal variational principle for backward stochastic control systems associated with Lévy processes

The paper is concerned with optimal control of backward stochastic differential equation (BSDE) driven by Teugel’s martingales and an independent multi-dimensional Brownian motion, where Teugel’s martingales are a family of pairwise strongly orthonormal martingales associated with Levy processes (see e.g., Nualart and Schoutens’ paper in 2000). We derive the necessary and sufficient conditions for the existence of the optimal control by means of convex variation methods and duality techniques. As an application, the optimal control problem of linear backward stochastic differential equation with a quadratic cost criteria (or backward linear-quadratic problem, or BLQ problem for short) is discussed and characterized by a stochastic Hamilton system.