REGULARITY RESULTS FOR A CLASS OF NONLOCAL DOUBLE PHASE EQUATIONS WITH VMO COEFFICIENTS

Sun-Sig Byun; Kyeongbae Kim; Deepak Kumar

doi:10.5565/PUBLMAT6822407

2024 REGULARITY RESULTS FOR A CLASS OF NONLOCAL DOUBLE PHASE EQUATIONS WITH VMO COEFFICIENTS

Sun-Sig Byun, Kyeongbae Kim, Deepak Kumar

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Abstract

We study a class of nonlocal double phase problems with discontinuous coefficients. A local self-improving property and a higher Hölder continuity result for weak solutions to such problems are obtained under the assumptions that the associated coefficient functions are of VMO (vanishing mean oscillation) type and that the principal coefficient depends not only on the variables but also on the solution itself.

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Sun-Sig Byun. Kyeongbae Kim. Deepak Kumar. "REGULARITY RESULTS FOR A CLASS OF NONLOCAL DOUBLE PHASE EQUATIONS WITH VMO COEFFICIENTS." Publ. Mat. 68 (2) 507 - 544, 2024. https://doi.org/10.5565/PUBLMAT6822407

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Received: 7 November 2022; Accepted: 6 March 2023; Published: 2024

First available in Project Euclid: 20 June 2024

Digital Object Identifier: 10.5565/PUBLMAT6822407

Subjects:

Primary: 35B65 , 35J60 , 35R11

Keywords: higher Hölder regularity results , nonlocal double phase operators , self-improving property , VMO coefficients

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