Transition density estimates for diagonal systems of SDEs driven by cylindrical α-stable processes

Abstract

We consider the system of stochastic differential equation dXt = A(Xt-) \, dZt, X0 = x, driven by cylindrical α-stable process Zt in Rd. We assume that A(x) = (aij(x)) is diagonal and aii(x) are bounded away from zero, from infinity and H\"older continuous. We construct transition density pA(t,x,y) of the process Xt and show sharp two-sided estimates of this density. We also prove H\"older and gradient estimates of x pA(t,x,y). Our approach is based on the method developed by Chen and Zhang.