带奇点的常 Gauss 曲率曲面

Xu Jia Wang; Ruixuan Zhu

doi:10.1360/SSM-2023-0176

带奇点的常 Gauss 曲率曲面

Translated title of the contribution: Convex hypersurfaces of constant Gaussian curvature with singularities

Xu Jia Wang, Ruixuan Zhu^*

^*Corresponding author for this work

Mathematical Sciences Institute

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we prove that a closed convex hypersurface of constant Gaussian curvature cannot possess only one singular point. If it has two singular points, it must be rotationally symmetric. We also show that for any convex polyhedron, there exist closed convex hypersurfaces of constant Gaussian curvature K0 such that the vertices of the polyhedron are the singular points of the hypersurface when K0 is sufficiently small.

Translated title of the contribution	Convex hypersurfaces of constant Gaussian curvature with singularities
Original language	Chinese (Traditional)
Pages (from-to)	1663-1670
Number of pages	8
Journal	Scientia Sinica Mathematica
Volume	54
Issue number	10
DOIs	https://doi.org/10.1360/SSM-2023-0176
Publication status	Published - Oct 2024

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abstract = "In this paper, we prove that a closed convex hypersurface of constant Gaussian curvature cannot possess only one singular point. If it has two singular points, it must be rotationally symmetric. We also show that for any convex polyhedron, there exist closed convex hypersurfaces of constant Gaussian curvature K0 such that the vertices of the polyhedron are the singular points of the hypersurface when K0 is sufficiently small.",

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带奇点的常 Gauss 曲率曲面

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