凸多面体的Alexandrov-Fenchel不等式的极值

IF 4.9 1区 数学 Q1 MATHEMATICS
Yair Shenfeld, Ramon van Handel
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引用次数: 17

摘要

亚历山德罗夫-芬切尔不等式是经典等周不等式对任意混合体积的深远推广,是凸几何的核心。它的极端体的特征是一个长期悬而未决的问题,可以追溯到亚历山德罗夫1937年的原始论文。已知的极值已经形成了一个非常丰富的家族,甚至由于施耐德对其一般结构的基本推测也是不完整的。本文完全解决了凸多面体的Alexandrov-Fenchel不等式的极值问题。特别地,我们表明极值产生于三种不同机制的组合:翻译、支持和维度。这些机制的表征需要发展各种各样的技术,以揭示非光滑凸体混合体积的几何形状。我们的主要结果在许多方面进一步超越了多面体,包括任意凸体的quermass积分的设置。作为我们的主要结果的一个应用,我们解决了Stanley关于部分有序集合组合中出现的某些对数凹序列的极值性问题。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The extremals of the Alexandrov–Fenchel inequality for convex polytopes
The Alexandrov-Fenchel inequality, a far-reaching generalization of the classical isoperimetric inequality to arbitrary mixed volumes, lies at the heart of convex geometry. The characterization of its extremal bodies is a long-standing open problem that dates back to Alexandrov's original 1937 paper. The known extremals already form a very rich family, and even the fundamental conjectures on their general structure, due to Schneider, are incomplete. In this paper, we completely settle the extremals of the Alexandrov-Fenchel inequality for convex polytopes. In particular, we show that the extremals arise from the combination of three distinct mechanisms: translation, support, and dimensionality. The characterization of these mechanisms requires the development of a diverse range of techniques that shed new light on the geometry of mixed volumes of nonsmooth convex bodies. Our main result extends further beyond polytopes in a number of ways, including to the setting of quermassintegrals of arbitrary convex bodies. As an application of our main result, we settle a question of Stanley on the extremal behavior of certain log-concave sequences that arise in the combinatorics of partially ordered sets.
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来源期刊
Acta Mathematica
Acta Mathematica 数学-数学
CiteScore
6.00
自引率
2.70%
发文量
6
审稿时长
>12 weeks
期刊介绍: Publishes original research papers of the highest quality in all fields of mathematics.
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