Isometric Immersions and Weak Solutions to the Darboux Equation
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We study the Darboux equation, a fundamental PDE arising in the theory of isometric immersions of two-dimensional Riemannian manifolds into $\mathbb{R}^3$, in the low-regularity regime. We introduce a notion of weak solution for $u\in C^{1,\theta}$ with $\theta>1/2$, and show that the classical correspondence between solutions of the Darboux equation and isometric immersions remains valid in this regime. The key ingredient is an extension of the classical flatness criterion to H\"older continuous metrics, achieved via an analysis of a weak notion of Gaussian curvature.
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Cartan's and Gauss's equations and rigidity theorems for isometric embeddings in low Sobolev regularity
Extends Cartan's first and second structural equations and the Gauss equation to low Sobolev regularity for isometric embeddings, yielding rigidity and convexity theorems when K_g ≥ 0.
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