Strong Feller property for SDEs driven by multiplicative cylindrical stable noise

Abstract

We consider the stochastic differential equation dXt = A(Xt-) \, dZt, X0 = x, driven by cylindrical α-stable process Zt in Rd, where α ∈ (0,1) and d 2. We assume that the determinant of A(x) = (aij(x)) is bounded away from zero, and aij(x) are bounded and Lipschitz continuous. We show that for any fixed γ ∈ (0,α) the semigroup Pt of the process Xt satisfies |Pt f(x) - Pt f(y)| c t-γ/α |x - y|γ ||f||∞ for arbitrary bounded Borel function f. Our approach is based on Levi's method.