自偶多面体和自偶光滑乌尔夫形

IF 1.1 3区 数学 Q1 MATHEMATICS
Huhe Han
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引用次数: 0

摘要

对于任意一个 Wulff 形状 W,它的对偶 Wulff 形状和球面 Wulff 形状 (\widetilde{W}\)都可以自然地定义。自双 Wulff 形是与其对偶 Wulff 形完全相等的 Wulff 形。在本文中,我们证明了当且仅当一个多面体的球面 Wulff 形是一个恒定宽度的球面凸体时,该多面体是自双的。我们还证明了当且仅当对于 \(\widetilde{W}\)的任意内部点 P 以及对于 \(\widetilde{W}\)边界与其球形支撑函数图(关于 P)的交点 Q,Q 在球形炸开(关于 P)下的图像总是 \(\widetilde{W}\)的一个点时,光滑的 Wulff 形是自双的。此外,我们对 M. Lassak 提出的问题给出了肯定的答案,即 "在 \(\mathbb {S}^n\) 上是否存在与 \(\mathbb {S}^n?\) 的 \(1/2^n\)部分不同的还原球面 n 维多面体(可能是一些简单多面体?
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Self-dual Polytope and Self-dual Smooth Wulff Shape

Self-dual Polytope and Self-dual Smooth Wulff Shape

For any Wulff shape W, its dual Wulff shape and spherical Wulff shape \(\widetilde{W}\) can be defined naturally. A self-dual Wulff shape is a Wulff shape equaling its dual Wulff shape exactly. In this paper, we prove that a polytope is self-dual if and only if its spherical Wulff shape is a spherical convex body of constant width. We also prove that a smooth Wulff shape is self-dual if and only if for any interior points P of \(\widetilde{W}\) and for any point Q of the intersection of the boundary of \(\widetilde{W}\) and the graph of its spherical support function (with respect to P), the image of Q under the spherical blow-up (with respect to P) is always a point of \(\widetilde{W}\). Moreover, we give an affirmative answer to the problem posed by M. Lassak which says that “Do there exist reduced spherical n-dimensional polytopes (possibly some simplices?) on \(\mathbb {S}^n\), where \(n\ge 3\), different from the \(1/2^n\) part of \(\mathbb {S}^n?\)”.

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来源期刊
Results in Mathematics
Results in Mathematics 数学-数学
CiteScore
1.90
自引率
4.50%
发文量
198
审稿时长
6-12 weeks
期刊介绍: Results in Mathematics (RM) publishes mainly research papers in all fields of pure and applied mathematics. In addition, it publishes summaries of any mathematical field and surveys of any mathematical subject provided they are designed to advance some recent mathematical development.
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