English

Approximate factorizations for non-symmetric jump processes

Probability 2025-08-29 v2 Analysis of PDEs

Abstract

In this paper, we first extend the approximate factorization for purely discontinuous Markov process established in \cite{CKSV20} by getting rid of some of the conditions imposed in \cite{CKSV20}. Then we apply the approximate factorization to obtain sharp two-sided heat kernel estimates for three classes of processes: stable-like processes with critical killings in C1,DiniC^{1, {\rm Dini}} open sets; killed stable-like processes in the setting of \cite{KW24} in C1,εC^{1, \varepsilon} open sets; and non-symmetric stable processes in what we call C1,2-DiniC^{1,2{\text - \rm Dini}} open sets. In particular, we obtain explicit sharp two-sided heat kernel estimates of killed α\alpha-stable processes in C1,DiniC^{1, {\rm Dini}} open sets for all α(0,2)\alpha\in (0, 2) and of censored α\alpha-stable processes in C1,DiniC^{1, {\rm Dini}} open sets for all α(1,2)\alpha\in (1, 2).

Keywords

Cite

@article{arxiv.2504.14763,
  title  = {Approximate factorizations for non-symmetric jump processes},
  author = {Soobin Cho and Renming Song},
  journal= {arXiv preprint arXiv:2504.14763},
  year   = {2025}
}

Comments

56 pages; Minor changes were made

R2 v1 2026-06-28T23:04:59.380Z