Existence and Uniqueness of Polyhedra with Given Values of the Conditional Curvature

IF 0.4 Q4 MATHEMATICS International Electronic Journal of Geometry Pub Date : 2023-04-14 DOI:10.36890/iejg.1246589
Anvarjon Sharipov, Mukhamedali Keunimjaev
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Abstract

The theory of polyhedra and the geometric methods associated with it are interesting not only in their own right but also have a wide outlet in the general theory of surfaces. Certainly, it is only sometimes possible to obtain the corresponding theorem on surfaces from the theorem on polyhedra by passing to the limit. Still, the theorems on polyhedra give directions for searching for the related theorems on surfaces. In the case of polyhedra, the elementary-geometric basis of more general results is revealed. In the present paper, we study polyhedra of a particular class, i.e., without edges and reference planes perpendicular to a given direction. This work is a logical continuation of the author’s work, in which an invariant of convex polyhedra isometric on sections was found. The concept of isometry of surfaces and the concept of isometry on sections of surfaces differ from each other. Examples of isometric surfaces that are not isometric on sections and examples of non-isometric surfaces that are isometric on sections. However, they have non-empty intersections, i.e., some surfaces are both isometric and isometric on sections. In this paper, we prove the positive definiteness of the found invariant. Further, conditional external curvature is introduced for “basic” sets, open faces, edges, and vertices. It is proved that the conditional curvature of the polyhedral angle considered is monotonicity and positive definiteness. At the end of the article, the problem of the existence and uniqueness of convex polyhedra with given values of conditional curvatures at the vertices is solved.
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条件曲率给定多面体的存在唯一性
多面体理论及其相关的几何方法不仅本身就很有趣,而且在曲面的一般理论中也有广泛的出口。当然,只有在某些情况下,通过传递到极限,才能从多面体上的定理得到相应的曲面定理。然而,多面体上的定理为寻找曲面上的相关定理提供了方向。在多面体的情况下,揭示了更一般结果的初等几何基础。在本文中,我们研究了一类特定的多面体,即没有边和垂直于给定方向的参考平面的多面体。这项工作是作者工作的逻辑延续,其中发现了凸多面体在截面上等距的不变量。曲面等距的概念和曲面截面等距的概念是不同的。在剖面上非等轴测曲面的示例和在剖面上等轴测的非等轴测量曲面的示例。但是,它们有非空的交点,即某些曲面在截面上既是等轴测曲面又是等轴测面。本文证明了所发现不变量的正定性。此外,为“基本”集、开放面、边和顶点引入了条件外曲率。证明了所考虑的多面体角的条件曲率具有单调性和正定性。在文章的最后,解决了具有给定顶点条件曲率值的凸多面体的存在唯一性问题。
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来源期刊
CiteScore
0.80
自引率
14.30%
发文量
32
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