On the Regularity Problem for Parabolic Operators and the Role of Half-Time Derivative.

IF 1.2 2区数学 Q1 MATHEMATICS

Journal of Geometric Analysis Pub Date : 2025-01-01 Epub Date: 2025-04-02 DOI:10.1007/s12220-025-01991-9

Martin Dindoš

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引用次数: 0

Abstract

In this paper we present the following result on regularity of solutions of the second order parabolic equation $\partial_{t} u - div (A \nabla u) + B \cdot \nabla u = 0$ on cylindrical domains of the form $Ω = O \times R$ where $O \subset R^{n}$ is a uniform domain (it satisfies both interior corkscrew and Harnack chain conditions) and has a boundary that is $n - 1$ -Ahlfors regular. Let u be a solution of such PDE in $Ω$ and the non-tangential maximal function of its gradient in spatial directions $\tilde{N} (\nabla u)$ belongs to $L^{p} (\partial Ω)$ for some $p > 1$ . Furthermore, assume that for ${u |}_{\partial Ω} = f$ we have that $D_{t}^{1 / 2} f \in L^{p} (\partial Ω)$ . Then both $\tilde{N} (D_{t}^{1 / 2} u)$ and $\tilde{N} (D_{t}^{1 / 2} H_{t} u)$ also belong to $L^{p} (\partial Ω)$ , where $D_{t}^{1 / 2}$ and $H_{t}$ are the half-derivative and the Hilbert transform in the time variable, respectively. We expect this result will spur new developments in the study of solvability of the $L^{p}$ parabolic Regularity problem as thanks to it it is now possible to formulate the parabolic Regularity problem on a large class of time-varying domains.

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抛物算子的正则性问题及半时间导数的作用。

本文给出了二阶抛物方程∂t u - div (A∇u) + B·∇u = 0在形式为Ω = O × R的柱面上解的正则性的结果，其中O∧R n是一致定域（满足内螺旋条件和哈纳克链条件），边界为n - 1 - ahlfors正则。设u是这种PDE在Ω中的解，并且其梯度在空间方向N ~（∇u）的非切极大函数在某个p bbb1中属于L p（∂Ω）。进一步，假设对于u |∂Ω = f，我们有d1 / 2f∈L p（∂Ω）。那么N ~ （dt 1 / 2 u）和N ~ （dt 1 / 2 H t u）也属于L p（∂Ω），其中dt 1 / 2和ht分别是时间变量的半导数和希尔伯特变换。我们期望这一结果将促进L p抛物正则性问题可解性研究的新发展，因为它使在大的一类时变域上表述抛物正则性问题成为可能。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Geometric Analysis 数学-数学

CiteScore

2.00

自引率

9.10%

发文量

290

审稿时长

3 months

期刊介绍： JGA publishes both research and high-level expository papers in geometric analysis and its applications. There are no restrictions on page length.