Embedded Surfaces of Arbitrary Genus Minimizing the Willmore Energy Under Isoperimetric Constraint

Laura Gioia Andrea Keller; Andrea Mondino; Tristan Rivière; S. Müller

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Embedded Surfaces of Arbitrary Genus Minimizing the Willmore Energy Under Isoperimetric Constraint

机译：在等规约束下，任意属的嵌入式表面将Willmore能量最小化

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The isoperimetric ratio of an embedded surface in ?~3 is defined as the ratio of the area of the surface to power three to the squared enclosed volume. The aim of the present work is to study the minimization of the Willmore energy under fixed isoperimetric ratio when the underlying abstract surface has fixed genus g ≧ 0. The corresponding problem in the case of spherical surfaces, that is g = 0, was recently solved by Schygulla (see Schygulla, Arch Ration Mech Anal 203:901-941, 2012) with different methods.

机译：埋入表面的等压比在〜3中定义为该表面的面积乘以三的幂与封闭体积的平方之比。本工作的目的是研究当下层抽象表面具有固定的属g≥0时，在固定的等压比下的Willmore能量的最小化。最近解决了球面情况下的相应问题，即g = 0由Schygulla撰写（请参见Schygulla，Arch Ration Mech Anal 203：901-941，2012）。

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《Archive for Rational Mechanics and Analysis》 |2014年第2期|共38页
作者
Laura Gioia Andrea Keller; Andrea Mondino; Tristan Rivière; S. Müller;
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正文语种 eng
中图分类理论力学（一般力学）;
关键词
Surfaces; Willmore; Constraint;

机译：表面;Willmore;约束;

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专利

1. Embedded Surfaces of Arbitrary Genus Minimizing the Willmore Energy Under Isoperimetric Constraint [J] . Laura Gioia Andrea Keller, Andrea Mondino, Tristan Rivière, Archive for Rational Mechanics and Analysis . 2014,第2期

机译：在等规约束下，任意属的嵌入式表面将Willmore能量最小化
2. Energy Minimization Under Area and Performance Constraints for Multimedia Applications Realized on Embedded Cores [J] . N. D.Zervas, K.Masselos, Y. A.Karayiannis, VLSI Design . 2002,第3期

机译：在嵌入式内核上实现的多媒体应用在面积和性能约束下的能量最小化
3. Folding-Free Global Conformal Mapping for Genus-0 Surfaces by Harmonic Energy Minimization [J] . Rongjie Lai, Zaiwen Wen, Wotao Yin, Journal of Scientific Computing . 2014,第3期

机译：通过谐波能量最小化对Gens-0曲面进行免折全局保形映射
4. A Simpler Linear Time Algorithm for Embedding Graphs into an Arbitrary Surface and the Genus of Graphs of Bounded Tree-Width [C] . Kawarabayashi Ken-ichi, Mohar Bojan, Reed Bruce Annual Symposium on Foundations of Computer Science . 2008

机译：一种更简单的线性时间算法将图形嵌入到任意曲面和有界树宽的图形中
5. An Energy Formulation of Surface Tension or Willmore Force for Two-Phase Flow [D] . Patty, Spencer Robert. 2017

机译：两相流动的表面张力或将力的能量配方
6. EXISTENCE OF COMPLETE MINIMAL SURFACES OF ARBITRARY CONNECTIVITY AND GENUS [O] . Tilla Klotz, Leo Sario 1965

机译：任意连通性和类的完全最小曲面的存在
7. Embedded surfaces of arbitrary genus minimizing the Willmore energy under isoperimetric constraint [O] . Keller, Laura Gioia Andrea, Mondino, Andrea, Rivière, Tristan 2013

机译：任意属的嵌入表面使Willmore能量最小化在等周约束下
8. Non-Linear sigma Models on Arbitrary Genus Riemann Surfaces [R] . Aldazabal, G. , Diaz, A. H. , Zhang, R. B. 1987

机译：任意种黎曼曲面上的非线性sigma模型

Embedded Surfaces of Arbitrary Genus Minimizing the Willmore Energy Under Isoperimetric Constraint

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