Malliavin derivative of random functions and applications to L\'evy driven BSDEs

Abstract

We consider measurable F: × Rd R where F(·, x) belongs for any x to the Malliavin Sobolev space D1,2 (with respect to a L\'evy process) and provide sufficient conditions on F and G1,…,Gd ∈ D1,2 such that F(·, G1,…,Gd) ∈ D1,2. The above result is applied to show Malliavin differentiability of solutions to BSDEs (backward stochastic differential equations) driven by L\'evy noise where the generator is given by a progressively measurable function f(ω,t,y,z).