English

Drift reduction method for SDEs driven by inhomogeneous singular L{\'e}vy noise

Probability 2022-08-16 v1

Abstract

We study SDE dXt=b(Xt)dt+A(Xt)dZt,X0=xRd,t0 d X_t = b(X_t) \, dt + A(X_{t-}) \, d Z_t, \quad X_{0} = x \in \mathbb{R}^d, \quad t \geq 0 where Z=(Z1,,Zd)TZ=(Z^1, \dots, Z^d)^T, with Zi,i=1,,dZ^i, i=1,\dots, d being independent one-dimensional symmetric jump L\'evy processes, not necessarily identically distributed. In particular, we cover the case when each ZiZ^i is one-dimensional symmetric αi\alpha_i-stable process (αi(0,2)\alpha_i \in (0,2) and they are not necessarily equal). Under certain assumptions on bb, AA and ZZ 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{\"o}lder 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.

Keywords

Cite

@article{arxiv.2208.06595,
  title  = {Drift reduction method for SDEs driven by inhomogeneous singular L{\'e}vy noise},
  author = {Tadeusz Kulczycki and Oleksii Kulyk and Michał Ryznar},
  journal= {arXiv preprint arXiv:2208.06595},
  year   = {2022}
}
R2 v1 2026-06-25T01:40:57.483Z