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Main Authors: Dong, Rong, Li, Dongsheng, Wang, Lihe
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2401.09841
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author Dong, Rong
Li, Dongsheng
Wang, Lihe
author_facet Dong, Rong
Li, Dongsheng
Wang, Lihe
contents Global second order Hölder regularity for Stokes systems can be obtained by global Schauder estimates, which are actually a priori estimates and were established by Solonnikov [20] and [23] with appropriate compatible conditions. This paper will investigate the corresponding interior regularity which unfortunately may fail in general from Serrin's counterexample (cf. [19]). However, we discover interior $C^{2,α}$ regularity for velocity and interior $C^{1,α}$ regularity for pressure in spatial variables, and furthermore, for curl of velocity, we find its gradient belongs to $C^{α, \fracα2}$, that is, possesses Hölder continuity in both space and time directions. The interesting phenomenon here is that no continuity in time variable is assumed for both the coefficients and the righthand side terms. The estimates for velocity and its curl are achieved pointwisely and the results are sharp indicated by a counterexample.
format Preprint
id arxiv_https___arxiv_org_abs_2401_09841
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Interior Second Order Hölder Regularity for Stokes systems
Dong, Rong
Li, Dongsheng
Wang, Lihe
Analysis of PDEs
Global second order Hölder regularity for Stokes systems can be obtained by global Schauder estimates, which are actually a priori estimates and were established by Solonnikov [20] and [23] with appropriate compatible conditions. This paper will investigate the corresponding interior regularity which unfortunately may fail in general from Serrin's counterexample (cf. [19]). However, we discover interior $C^{2,α}$ regularity for velocity and interior $C^{1,α}$ regularity for pressure in spatial variables, and furthermore, for curl of velocity, we find its gradient belongs to $C^{α, \fracα2}$, that is, possesses Hölder continuity in both space and time directions. The interesting phenomenon here is that no continuity in time variable is assumed for both the coefficients and the righthand side terms. The estimates for velocity and its curl are achieved pointwisely and the results are sharp indicated by a counterexample.
title Interior Second Order Hölder Regularity for Stokes systems
topic Analysis of PDEs
url https://arxiv.org/abs/2401.09841