Some recent developments on isometric immersions via compensated compactness and gauge transforms

Siran Li
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Abstract

We survey recent developments on the analysis of Gauss--Codazzi--Ricci equations, the first-order PDE system arising from the classical problem of isometric immersions in differential geometry, especially in the regime of low Sobolev regularity. Such equations are not purely elliptic, parabolic, or hyperbolic in general, hence calling for analytical tools for PDEs of mixed types. We discuss various recent contributions -- in line with the pioneering works by G.-Q. Chen, M. Slemrod, and D. Wang [Proc. Amer. Math. Soc. (2010); Comm. Math. Phys. (2010)] -- on the weak continuity of Gauss--Codazzi--Ricci equations, the weak stability of isometric immersions, and the fundamental theorem of submanifold theory with low regularity. Two mixed-type PDE techniques are emphasised throughout these developments: the method of compensated compactness and the theory of Coulomb--Uhlenbeck gauges.
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通过补偿紧凑性和规整变换研究等距沉浸的一些最新进展
高斯--柯达兹--里奇方程是微分几何中等距浸入经典问题所产生的一阶 PDE 系统,特别是在低索博廖夫正则性条件下的一阶 PDE 系统。这类方程一般不是纯粹的椭圆、抛物或双曲方程,因此需要混合型 PDE 的分析工具。我们讨论了最近的各种贡献--与 G.-Q. Chen、M. Slemrod 和 G.-Q.M. Slemrod 的开创性工作相一致。Chen、M. Slemrod 和 D. Wang [Proc. Amer. Math. Soc. (2010);Comm. Math. Phys. (2010)]的开创性工作相一致,讨论了关于高斯--科达齐--里奇方程的弱连续性、等距沉浸的弱稳定性以及低正则性子满理论的基本定理。这些发展强调了两种混合型 PDE 技术:补偿紧凑性方法和库仑-乌伦贝克量规理论。
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