Drift reduction method for SDEs driven by inhomogeneous singular L\'evy noise

Abstract

We study SDE d Xt = b(Xt) \, dt + A(Xt-) \, d Zt, X0 = x ∈ Rd, t ≥ 0 where Z=(Z1, …, Zd)T, with Zi, i=1,…, d being independent one-dimensional symmetric jump L\'evy processes, not necessarily identically distributed. In particular, we cover the case when each Zi is one-dimensional symmetric αi-stable process (αi ∈ (0,2) and they are not necessarily equal). Under certain assumptions on b, A and Z we show that the weak solution to the SDE is uniquely defined and Markov, we provide a representation of the transition probability density and we establish H\"older regularity of the corresponding transition semigroup. The method we propose is based on a reduction of an SDE with a drift term to another SDE without such a term but with coefficients depending on time variable. Such a method have the same spirit with the classic characteristic method and seems to be of independent interest.