理想的洛巴契夫空间矩形多面体

Андрей Юрьевич Веснин, Андрей Александрович Егоров
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引用次数: 6

摘要

本文考虑了三维罗巴切夫斯基空间中的一类直角多面体,其所有顶点都在绝对面上。得到了以多面体面数表示的新的体积上界。计算最多有23个面的多面体的体积。结果表明,在反棱镜和扭曲反棱镜上可以实现最小体积。给出了理想直角多面体的前248个体积值。此外,还引入了一类具有孤立三角形的多面体,并给出了该类多面体存在的组合界和该类多面体的最小例子。
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Идеальные прямоугольные многогранники в пространстве Лобачевского
In this paper we consider a class of right-angled polyhedra in three-dimensional Lobachevsky space, all vertices of which lie on the absolute. New upper bounds on volumes in terms the number of faces of the polyhedron are obtained. Volumes of polyhedra with at most 23 faces are computed. It is shown that the minimum volumes are realized on antiprisms and twisted antiprisms. The first 248 values of volumes of ideal right-angled polyhedra are presented. Moreover, the class of polyhedra with isolated triangles is introduces and there are obtained combinatorial bounds on their existence as well as minimal examples of such polyhedra are given.
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