H\"older regularity and gradient estimates H\"older regularity and gradient estimates for SDEs driven by cylindrical α-stable processes

Abstract

We establish H\"older regularity and gradient estimates for the transition semigroup of the solutions to the following SDE: d Xt=σ (t, Xt-) d Zt+b (t, Xt) d t,\ \ X0=x∈ Rd, where ( Zt)t≥ 0 is a d-dimensional cylindrical α-stable process with α ∈ (0, 2), σ (t, x): R+× Rd Rd Rd is bounded measurable, uniformly nondegenerate and Lipschitz continuous in x uniformly in t, and b (t, x): R+× Rd Rd is bounded β-H\"older continuous in x uniformly in t with β∈[0,1] satisfying α+β>1. Moreover, we also show the existence and regularity of the distributional density of X (t, x). Our proof is based on Littlewood-Paley's theory.