二步卡诺群凸集的内锥性质，并在单调集上的应用

IF 0.8 3区数学 Q2 MATHEMATICS Publicacions Matematiques Pub Date : 2018-08-20 DOI:10.5565/publmat6422002

Daniele Morbidelli

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引用次数: 7

摘要

在第二步卡诺群的设置中，我们给出了水平凸集的“锥性质”。也就是说，我们证明了，给定一个水平凸集$C$，一对点$P\in\partial C$和$Q\in$int$C$都属于一条水平线$\ell$，那么$\ell$周围的一个顶点为$P$的开截头亚黎曼锥包含在$C$中。我们将我们的结果应用于卡诺群中水平单调集的分类问题。我们能够证明具有实线的海森堡群的直积$\mathbb｛H｝\times\mathbb｛R｝$中的单调集具有超平面作为边界。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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On the inner cone property for convex sets in two-step Carnot groups, with applications to monotone sets

In the setting of step two Carnot groups, we show a "cone property" for horizontally convex sets. Namely we prove that, given a horizontally convex set $C$, a pair of points $P\in \partial C$ and $Q\in $ int $C$, both belonging to a horizontal line $\ell$, then an open truncated subRiemannian cone around $\ell$ and with vertex at $P$ is contained in $C$. We apply our result to the problem of classification of horizontally monotone sets in Carnot groups. We are able to show that monotone sets in the direct product $\mathbb{H} \times\mathbb{R}$ of the Heisenberg group with the real line have hyperplanes as boundaries.

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来源期刊

Publicacions Matematiques 数学-数学

CiteScore

1.60

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Publicacions Matemàtiques is a research mathematical journal published by the Department of Mathematics of the Universitat Autònoma de Barcelona since 1976 (before 1988 named Publicacions de la Secció de Matemàtiques, ISSN: 0210-2978 print, 2014-4369 online). Two issues, constituting a single volume, are published each year. The journal has a large circulation being received by more than two hundred libraries all over the world. It is indexed by Mathematical Reviews, Zentralblatt Math., Science Citation Index, SciSearch®, ISI Alerting Services, COMPUMATH Citation Index®, and it participates in the Euclid Project and JSTOR. Free access is provided to all published papers through the web page. Publicacions Matemàtiques is a non-profit university journal which gives special attention to the authors during the whole editorial process. In 2019, the average time between the reception of a paper and its publication was twenty-two months, and the average time between the acceptance of a paper and its publication was fifteen months. The journal keeps on receiving a large number of submissions, so the authors should be warned that currently only articles with excellent reports can be accepted.

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