In this paper, we study the smooth isometric immersion of a complete simply connected surface with a negative Gauss curvature in the three-dimensional Euclidean space. For a surface with a finite total Gauss curvature and appropriate oscillations of the Gauss curvature, we prove the global existence of a smooth solution to the Gauss-Codazzi system and thus establish a global smooth isometric immersion of the surface into the three-dimensional Euclidean space. Based on a crucial observation that some linear combinations of the Riemann invariants decay faster than others, we reformulate the Gauss-Codazzi system as a symmetric hyperbolic system with a partial damping. Such a damping effect and an energy approach permit us to derive global deca...
In this article, we study an analog of the Björling problem for isothermic surfaces (that are a gene...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
We prove that, given a $C^2$ Riemannian metric $g$ on the 2-dimensional disk $D_2$, any short $C^1$ ...
In this paper, we study the smooth isometric immersion of a complete simply connected surface with a...
This thesis is a study of problems related to isometric immersions of Riemannian manifolds in Euclid...
A fundamental problem in differential geometry is to characterize intrinsic metrics on a two-dimensi...
In this note, we give a short survey on the global isometric embedding of surfaces (2-dimensional Ri...
We study trapped surfaces from the point of view of local isometric embedding into 3D Riemannian ma...
We study trapped surfaces from the point of view of local isometric embedding into 3D Riemannian ma...
We obtain global extensions of the celebrated Nash-Kuiper theorem for $C^{1,\theta}$ isometric immer...
AbstractWe extend recent results of Guan and Spruck, proving existence results for constant Gaussian...
We record work done by the author joint with John Ross [27] on stable smooth solutions to the gaussi...
We are concerned with the global weak rigidity of the Gauss–Codazzi–Ricci (GCR) equations on Riemann...
We are concerned with the global weak rigidity of the Gauss–Codazzi–Ricci (GCR) equations on Riemann...
In this paper we extend Efimov’s Theorem by proving that any complete surface in R3 with Gauss curva...
In this article, we study an analog of the Björling problem for isothermic surfaces (that are a gene...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
We prove that, given a $C^2$ Riemannian metric $g$ on the 2-dimensional disk $D_2$, any short $C^1$ ...
In this paper, we study the smooth isometric immersion of a complete simply connected surface with a...
This thesis is a study of problems related to isometric immersions of Riemannian manifolds in Euclid...
A fundamental problem in differential geometry is to characterize intrinsic metrics on a two-dimensi...
In this note, we give a short survey on the global isometric embedding of surfaces (2-dimensional Ri...
We study trapped surfaces from the point of view of local isometric embedding into 3D Riemannian ma...
We study trapped surfaces from the point of view of local isometric embedding into 3D Riemannian ma...
We obtain global extensions of the celebrated Nash-Kuiper theorem for $C^{1,\theta}$ isometric immer...
AbstractWe extend recent results of Guan and Spruck, proving existence results for constant Gaussian...
We record work done by the author joint with John Ross [27] on stable smooth solutions to the gaussi...
We are concerned with the global weak rigidity of the Gauss–Codazzi–Ricci (GCR) equations on Riemann...
We are concerned with the global weak rigidity of the Gauss–Codazzi–Ricci (GCR) equations on Riemann...
In this paper we extend Efimov’s Theorem by proving that any complete surface in R3 with Gauss curva...
In this article, we study an analog of the Björling problem for isothermic surfaces (that are a gene...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
We prove that, given a $C^2$ Riemannian metric $g$ on the 2-dimensional disk $D_2$, any short $C^1$ ...
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