Existence, uniqueness and stability of L1 solutions for multidimensional BSDEs with generators of one-sided Osgood type

Abstract

We establish a general existence and uniqueness result of L1 solution for a multidimensional backward stochastic differential equation (BSDE for short) with generator g satisfying a one-sided Osgood condition as well as a general growth condition in y, and a Lipschitz condition together with a sublinear growth condition in z, which improves some existing results. In particular, we put forward and prove a stability theorem of the L1 solutions for the first time. A new type of L1 solution is also investigated. Some delicate techniques involved in the relationship between convergence in L1 and in probability and dividing appropriately the time interval play crucial roles in our proofs.