Gauss-Codazzi-Ricci方程的整体弱刚性和低正则性黎曼流形的等距浸入。

IF 1.2 2区 数学 Q1 MATHEMATICS
Journal of Geometric Analysis Pub Date : 2018-01-01 Epub Date: 2017-08-18 DOI:10.1007/s12220-017-9893-1
Gui-Qiang G Chen, Siran Li
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引用次数: 25

摘要

研究了黎曼流形上gaus - codazzi - ricci (GCR)方程的全局弱刚性以及黎曼流形在欧几里德空间中的等距浸入。我们开发了一种统一的内在方法来建立GCR方程和黎曼流形的等长浸入的全局弱刚性,独立于局部坐标,并对先前的局部结果和论点提供了进一步的见解。并对危急情况进行了分析。为了实现这一目标,我们首先在黎曼流形上重新表述具有内在旋度结构的GCR方程,并开发了一个整体的、内在的版本的div旋度引理和其他非线性技术来解决流形上的整体弱刚度问题。特别地,建立了Banach空间上的一般泛函解析补偿紧性定理,其中包括黎曼流形上的内征旋度引理。建立了低正则性黎曼流形上全局等长浸没的等价性、Cartan形式和GCR方程。在此过程中,我们还证明了低正则性黎曼流形的一个新的弱刚性结果,属于Cartan形式,并推广了具有不同度量的黎曼流形的弱刚性结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Global Weak Rigidity of the Gauss-Codazzi-Ricci Equations and Isometric Immersions of Riemannian Manifolds with Lower Regularity.

We are concerned with the global weak rigidity of the Gauss-Codazzi-Ricci (GCR) equations on Riemannian manifolds and the corresponding isometric immersions of Riemannian manifolds into the Euclidean spaces. We develop a unified intrinsic approach to establish the global weak rigidity of both the GCR equations and isometric immersions of the Riemannian manifolds, independent of the local coordinates, and provide further insights of the previous local results and arguments. The critical case has also been analyzed. To achieve this, we first reformulate the GCR equations with div-curl structure intrinsically on Riemannian manifolds and develop a global, intrinsic version of the div-curl lemma and other nonlinear techniques to tackle the global weak rigidity on manifolds. In particular, a general functional-analytic compensated compactness theorem on Banach spaces has been established, which includes the intrinsic div-curl lemma on Riemannian manifolds as a special case. The equivalence of global isometric immersions, the Cartan formalism, and the GCR equations on the Riemannian manifolds with lower regularity is established. We also prove a new weak rigidity result along the way, pertaining to the Cartan formalism, for Riemannian manifolds with lower regularity, and extend the weak rigidity results for Riemannian manifolds with corresponding different metrics.

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来源期刊
CiteScore
2.00
自引率
9.10%
发文量
290
审稿时长
3 months
期刊介绍: JGA publishes both research and high-level expository papers in geometric analysis and its applications. There are no restrictions on page length.
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