Differentiability at lateral boundary for fully nonlinear parabolic equations

Feiyao Ma; Diego R Moreira; Lihe Wang

doi:10.1016/j.jde.2017.04.011

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Differentiability at lateral boundary for fully nonlinear parabolic equations

Journal article

Open access

Peer reviewed

Differentiability at lateral boundary for fully nonlinear parabolic equations

Feiyao Ma, Diego R Moreira and Lihe Wang

Journal of Differential Equations, Vol.263(5), pp.2672-2686

09/05/2017

DOI: 10.1016/j.jde.2017.04.011

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Abstract

For fully nonlinear uniformly parabolic equations, the first derivatives regularity of viscosity solutions at lateral boundary is studied under new Dini type conditions for the boundary, which is called Reifenberg Dini conditions and is weaker than usual Dini conditions.

Reifenberg Dini conditions

Fully nonlinear parabolic equations

Differentiability

Lateral boundary

Viscosity solutions

Details

Title: Subtitle: Differentiability at lateral boundary for fully nonlinear parabolic equations
Creators: Feiyao Ma - Department of Mathematics, Ningbo University, Zhejiang Province, China
Diego R Moreira - Department of Mathematics, Universidade Federal do Ceará (UFC), Brazil
Lihe Wang - CAFR and School of Mathematics, Shanghai Jiao Tong University, Shanghai, 200240, China
Resource Type: Journal article
Publication Details: Journal of Differential Equations, Vol.263(5), pp.2672-2686
Publisher: Elsevier Inc
DOI: 10.1016/j.jde.2017.04.011
ISSN: 0022-0396
eISSN: 1090-2732
Grant note: name: NSF-China, award: 11201250; DOI: 10.13039/501100004731, name: Zhejiang Provincial Natural Science Foundation, award: LY16A010002; DOI: 10.13039/501100003593, name: CNPq; name: NSF-China, award: 11371249
Language: English
Date published: 09/05/2017
Academic Unit: Mathematics
Record Identifier: 9984083816902771

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