CONVERGENCE OF NONLOCAL GEOMETRIC FLOWS TO ANISOTROPIC MEAN CURVATURE MOTION

被引：2

作者：

Cesaroni, Annalisa ^{[1
]}

Pagliari, Valerio ^{[2
]}

机构：

[1] Univ Padua, Dept Stat Sci, Via Battisti 241-243, I-35121 Padua, Italy

[2] TU Wien, Inst Anal & Sci Comp, Wiedner Hauptstr 8-10, A-1040 Vienna, Austria

来源：

DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS | 2021年 / 41卷 / 10期

关键词：

anisotropic mean curvature flow; geometric equations; De Giorgi's barriers for geometric evolutions; level-set method; viscosity solutions; Nonlocal curvature flow; APPROXIMATION SCHEMES; HOMOGENIZATION; UNIQUENESS; EXISTENCE; ALGORITHM; EQUATIONS; DYNAMICS;

D O I：

10.3934/dcds.2021065

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We consider nonlocal curvature functionals associated with positive interaction kernels, and we show that local anisotropic mean curvature functionals can be retrieved in a blow-up limit from them. As a consequence, we prove that the viscosity solutions to the rescaled nonlocal geometric flows locally uniformly converge to the viscosity solution to the anisotropic mean curvature motion. The result is achieved by combining a compactness argument and a set-theoretic approach related to the theory of De Giorgi's barriers for evolution equations.

引用

页码：4987 / 5008

页数：22

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