A PDE Approach to the Existence and Regularity of Surfaces of Minimum Mean Curvature Variation

IF 2.6 1区数学 Q1 MATHEMATICS, APPLIED

Archive for Rational Mechanics and Analysis Pub Date : 2024-08-05 DOI:10.1007/s00205-024-02016-5

Luis A. Caffarelli, Pablo Raúl Stinga, Hernán Vivas

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引用次数: 0

Abstract

We develop an analytic theory of existence and regularity of surfaces (given by graphs) arising from the geometric minimization problem

$$\begin{aligned} \min _\mathcal {M}\frac{1}{2}\int _\mathcal {M}|\nabla _{\mathcal {M}}H|^2\,{\text {d}}A, \end{aligned}$$

where $\mathcal {M}$ ranges over all n-dimensional manifolds in $\mathbb {R}^{n+1}$ with a prescribed boundary, $\nabla _{\mathcal {M}}H$ is the tangential gradient along $\mathcal {M}$ of the mean curvature H of $\mathcal {M}$ and dA is the differential of surface area. The minimizers, called surfaces of minimum mean curvature variation, are central in applications of computer-aided design, computer-aided manufacturing and mechanics. Our main results show the existence of both smooth surfaces and of variational solutions to the minimization problem together with geometric regularity results in the case of graphs. These are the first analytic results available for this problem.

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最小均方差曲面的存在性和规则性的 PDE 方法

我们发展了由几何最小化问题 $$\begin{aligned} 引起的曲面（由图给出）的存在性和规则性的解析理论。\min _\mathcal {M}\frac{1}{2}\int _\mathcal {M}|\nabla _{\mathcal {M}}H|^2\,{text {d}}A, \end{aligned}$$其中$\mathcal {M}$ 涵盖$\mathbb {R}^{n+1}$ 中所有具有规定边界的 n 维流形、$\nabla_{\mathcal {M}}H$是$\mathcal {M}$的平均曲率H沿$\mathcal {M}$的切向梯度，dA是表面积的微分。这些最小值被称为最小平均曲率变化曲面，是计算机辅助设计、计算机辅助制造和力学应用的核心。我们的主要结果表明了光滑曲面和最小化问题变分解的存在性，以及图形情况下的几何正则性结果。这是该问题的第一个解析结果。

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

Archive for Rational Mechanics and Analysis 物理-力学

CiteScore

5.10

自引率

8.00%

发文量

审稿时长

4-8 weeks

期刊介绍： The Archive for Rational Mechanics and Analysis nourishes the discipline of mechanics as a deductive, mathematical science in the classical tradition and promotes analysis, particularly in the context of application. Its purpose is to give rapid and full publication to research of exceptional moment, depth and permanence.