Solenoidal difference quotients and their application to the regularity theory of the p-Stokes system

Krepela Martin; Ruzicka Michael

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Solenoidal difference quotients and their application to the regularity theory of the p-Stokes system

机译：电磁差异商及其在P-Stokes系统的规律性理论中的应用

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摘要

We prove existence of a solution to the divergence equation satisfying a new Bogovski-type estimate for the difference quotients. This enables us to give an alternative proof of the interior regularity of the solution to the p-Stokes problem, completely avoiding the pressure. Moreover, as a key preliminary result we prove boundedness of Calderon-Zygmund operators with standard kernels in weighted Lebesgue and Orlicz spaces over a general domain.

机译：我们证明了满足差分推销的新的Bogovski型估计的发散方程的解决方案的存在。这使我们能够为P-Stokes问题提供解决方案的内部规律性的替代证明，完全避免了压力。此外，作为一个关键初步结果，我们将Calderon-Zygmund运算符的界限与一般域中的加权LebEsgue和Orlicz空间中的标准内核。

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来源
《Calculus of variations and partial differential equations 》 |2020年第1期| 共24页
作者
Krepela Martin; Ruzicka Michael;
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作者单位

Univ Freiburg Dept Appl Math Ernst Zermelo Str 1 D-79104 Freiburg Germany;

Univ Freiburg Dept Appl Math Ernst Zermelo Str 1 D-79104 Freiburg Germany;

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原文格式 PDF
正文语种 eng
中图分类偏微分方程 ; 变分法 ;
关键词
42B20; 42B37; 35B65; 35B45; 35J92;

机译：42 0;42 BAHA;

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Solenoidal difference quotients and their application to the regularity theory of the p-Stokes system

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