Analytic properties of Markov semigroup generated by Stochastic Differential Equations driven by L\'evy processes

Abstract

We consider the stochastic differential equations of the form equation* cases dX x(t) = σ(X(t-)) dL(t) \\ X x(0)=x, x∈R d, cases equation* where σ:R d R d is Lipschitz continuous and L=\L(t):t 0\ is a L\'evy process. Under this condition on σ it is well known that the above problem has a unique solution X. Let (Pt)t0 be the Markovian semigroup associated to X defined by ( Pt f) (x) := E [ f(X x(t))], t 0, x∈ Rd, f∈ Bb(Rd). Let B be a pseudo--differential operator characterized by its symbol q. Fix ∈R. In this article we investigate under which conditions on σ, L and q there exist two constants γ>0 and C>0 such that B Pt u H2 C \, t-γ \, u H2, ∀ u ∈ H2(Rd ),\, t>0.