Coupling for Ornstein--Uhlenbeck processes with jumps

Abstract

Consider the linear stochastic differential equation (SDE) on Rn: \[ dXt=AXt\,dt+B\,dLt,\] where A is a real n× n matrix, B is a real n× d real matrix and Lt is a L\'evy process with L\'evy measure on Rd. Assume that ( dz) 0(z)\,dz for some 0 0. If A 0, Rank(B)=n and ∫\|z-z0|\0(z)-1\,dz<∞ holds for some z0∈ Rd and some >0, then the associated Markov transition probability Pt(x, dy) satisfies \[\|Pt(x,·)-Pt(y,·)\|var C(1+|x-y|)t, x,y∈ Rd,t>0,\] for some constant C>0, which is sharp for large t and implies that the process has successful couplings. The Harnack inequality, ultracontractivity and the strong Feller property are also investigated for the (conditional) transition semigroup.