Parametrix construction of the transition probability density of the solution to an SDE driven by α-stable noise

Abstract

Let L:= -a(x) (-)α/2+ (b(x), ∇), where α∈ (0,2), and a: (0,∞), b: . Under certain regularity assumptions on the coefficients a and b, we associate with the C∞()-closure of (L, C∞2()) a Feller Markov process X, which possesses a transition probability density pt(x,y). To construct this transition probability density and to obtain the two-sided estimates on it, we develop a new version of the parametrix method, which allows us to handle the case 0<α≤ 1 and b≠ 0, i.e. when the gradient part of the generator is not dominated by the jump part..