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A Zvonkin's transformation for stochastic differential equations with singular drift and applications

Shao-Qin Zhang, Chenggui Yuan Orcid Logo

Journal of Differential Equations, Volume: 297, Pages: 277 - 319

Swansea University Author: Chenggui Yuan Orcid Logo

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Abstract

In this paper, a new Zvonkin-type transformation is given for stochastic differential equations with singular and Lipschitz drifts by establishing the localized $L^p$-$L^q$ estimate and Sobolev estimates for parabolic partial differential equations with a singular first order term and a Lipschitz fi...

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Published in: Journal of Differential Equations
ISSN: 0022-0396
Published: Elsevier BV 2021
Online Access: Check full text

URI: https://cronfa.swan.ac.uk/Record/cronfa57821
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Abstract: In this paper, a new Zvonkin-type transformation is given for stochastic differential equations with singular and Lipschitz drifts by establishing the localized $L^p$-$L^q$ estimate and Sobolev estimates for parabolic partial differential equations with a singular first order term and a Lipschitz first order term. The associated Krylov's estimate is established. As applications, dimension-free Harnack inequalities are established for stochastic equations with H\"older continuous diffusion coefficient and singular drift term without regularity assumption.
Keywords: Zvonkin's transformation; singular diffusion processes; Krylov's estimate; Harnack inequality
College: Faculty of Science and Engineering
Start Page: 277
End Page: 319