Construction and heat kernel estimates of general stable-like Markov processes

Publikation: Beitrag in FachzeitschriftForschungsartikelBeigetragenBegutachtung

Beitragende

  • Victoria Knopova - , Kyiv National Taras Shevchenko University (Autor:in)
  • Alexei Kulik - , Wrocław University of Science and Technology (Autor:in)
  • René L. Schilling - , Professur für Wahrscheinlichkeitstheorie (Autor:in)

Abstract

A stable-like process is a Feller process (Xt)t≥0 taking values in Rd and whose generator behaves, locally, like an α-stable Lévy generator, but the index α and all other characteristics may depend on the state space. More precisely, the jump measure need not be symmetric, and it strongly depends on the current state of the process; moreover, we do not require the gradient term to be dominated by the pure jump part. Our approach is to understand the above phenomena as suitable microstructural perturbations. We show that the corresponding martingale problem is well-posed, and its solution is a strong Feller process which admits a transition density. For the transition density we obtain a representation as a sum of an explicitly given principal term—this is essentially the density of an α-stable random variable whose parameters depend on the current state x—and a residual term; the L ⊗ L1-norm of the residual term is negligible and so is, under an additional struc-tural assumption, the L ⊗ L-norm. Concrete examples illustrate the relation between the assumptions and possible transition density estimates.

Details

OriginalspracheEnglisch
Seiten (von - bis)4-86
Seitenumfang83
FachzeitschriftDissertationes Mathematicae
Jahrgang569
PublikationsstatusVeröffentlicht - 2021
Peer-Review-StatusJa

Schlagworte

ASJC Scopus Sachgebiete

Schlagwörter

  • Fundamental solution, Heat kernel estimate, Lévy process, Para-metrix construction, Stable-like process, Variable order of differentiation

Bibliotheksschlagworte