收敛到非局部自由边界演化的平面界面

IF 3.1 1区 数学 Q1 MATHEMATICS Communications on Pure and Applied Mathematics Pub Date : 2024-09-05 DOI:10.1002/cpa.22225
Felix Otto, Richard Schubert, Maria G. Westdickenberg
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引用次数: 0

摘要

我们捕捉 Mullins-Sekerka 演化的最佳衰减,这是材料科学中的一个非局部抛物自由边界问题。我们的主要结果证明,在环境空间维数为三的物理相关情况下,BV 解收敛于平面轮廓。我们不假定初始数据较小或准备充分,而是允许初始界面不具有图形结构且不相连,因此明确包括奥斯特瓦尔德熟化机制。仅就初始有限(不小于)过剩质量和过剩表面能而言,我们确定表面在一个固定的时间尺度(定量估计)内成为一个 Lipschitz 图形,并在此环境中保持困顿。为了获得图结构,我们利用了几何度量理论的正则性结果。同时,我们将以前用于一维 PDE 问题的对偶方法扩展到了更高维度的非局部几何演化。我们获得了过剩能量、耗散和图高度的最佳代数衰减率。
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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Convergence to the planar interface for a nonlocal free-boundary evolution

We capture optimal decay for the Mullins–Sekerka evolution, a nonlocal, parabolic free boundary problem from materials science. Our main result establishes convergence of BV solutions to the planar profile in the physically relevant case of ambient space dimension three. Far from assuming small or well-prepared initial data, we allow for initial interfaces that do not have graph structure and are not connected, hence explicitly including the regime of Ostwald ripening. In terms only of initially finite (not small) excess mass and excess surface energy, we establish that the surface becomes a Lipschitz graph within a fixed timescale (quantitatively estimated) and remains trapped within this setting. To obtain the graph structure, we leverage regularity results from geometric measure theory. At the same time, we extend a duality method previously employed for one-dimensional PDE problems to higher dimensional, nonlocal geometric evolutions. Optimal algebraic decay rates of excess energy, dissipation, and graph height are obtained.

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来源期刊
CiteScore
6.70
自引率
3.30%
发文量
59
审稿时长
>12 weeks
期刊介绍: Communications on Pure and Applied Mathematics (ISSN 0010-3640) is published monthly, one volume per year, by John Wiley & Sons, Inc. © 2019. The journal primarily publishes papers originating at or solicited by the Courant Institute of Mathematical Sciences. It features recent developments in applied mathematics, mathematical physics, and mathematical analysis. The topics include partial differential equations, computer science, and applied mathematics. CPAM is devoted to mathematical contributions to the sciences; both theoretical and applied papers, of original or expository type, are included.
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