Quadratic BSDEs with rough drivers and L2--terminal condition

Abstract

In this paper, we study the existence and uniqueness of solutions to quadratic Backward Stochastic Differential Equations (QBSDEs for short) with rough driver and square integrable terminal condition. The main idea consists in using both Doss-Sussman and Zvonkin type transformations. As an application we study connection between QBSDEs and quadratic PDEs with rough drivers. We also obtain Backward Doubly SDEs and QBSDEs driven by Fractional Brownian with Hurst parameter greater than 14 as particular cases of our QBSDEs with rough drivers. A probabilistic representation of a class of rough quadratic PDE is also proved.