A geometric perspective on the Piola identity in Riemannian settings

IF 1 4区数学 Q3 MATHEMATICS, APPLIED

Journal of Geometric Mechanics Pub Date : 2018-05-31 DOI:10.3934/JGM.2019004

R. Kupferman, A. Shachar

引用次数: 3

Abstract

The Piola identity $\operatorname{div} \operatorname{cof} \nabla f=0$ is a central result in the mathematical theory of elasticity. We prove a generalized version of the Piola identity for mappings between Riemannian manifolds, using two approaches, based on different interpretations of the cofactor of a linear map: one follows the lines of the classical Euclidean derivation and the other is based on a variational interpretation via Null-Lagrangians. In both cases, we first review the Euclidean case before proceeding to the general Riemannian setting.

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黎曼背景下皮奥拉同一性的几何透视

Piola恒等式$\operatorname{div} \operatorname{cof} \nabla f=0$是弹性数学理论中的一个核心结果。我们证明了黎曼流形之间映射的Piola恒等式的一个广义版本，使用两种方法，基于线性映射的余因式的不同解释:一种是遵循经典欧几里得推导的路线，另一种是基于零拉格朗日的变分解释。在这两种情况下，我们首先回顾欧几里得情况，然后再讨论一般黎曼情况。

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 Mechanics MATHEMATICS, APPLIED-PHYSICS, MATHEMATICAL

CiteScore

1.70

自引率

12.50%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Geometric Mechanics (JGM) aims to publish research articles devoted to geometric methods (in a broad sense) in mechanics and control theory, and intends to facilitate interaction between theory and applications. Advances in the following topics are welcomed by the journal: 1. Lagrangian and Hamiltonian mechanics 2. Symplectic and Poisson geometry and their applications to mechanics 3. Geometric and optimal control theory 4. Geometric and variational integration 5. Geometry of stochastic systems 6. Geometric methods in dynamical systems 7. Continuum mechanics 8. Classical field theory 9. Fluid mechanics 10. Infinite-dimensional dynamical systems 11. Quantum mechanics and quantum information theory 12. Applications in physics, technology, engineering and the biological sciences.