Normed versus topological groups: dichotomy and duality

IF 1.5 3区数学 Q1 MATHEMATICS

Dissertationes Mathematicae Pub Date : 2010-01-01 DOI:10.4064/DM472-0-1

N. Bingham, A. Ostaszewski

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引用次数: 52

Abstract

The key vehicle of the recent development of a topological theory of regular variation based on topological dynamics [BO-TI], and embracing its classical univariate counterpart (cf. [BGT]) as well as fragmentary multivariate (mostly Euclidean) theories (eg [MeSh], [Res], [Ya]), are groups with a right-invariant metric carrying flows. Following the vector paradigm, they are best seen as normed groups. That concept only occasionally appears explicitly in the literature despite its frequent disguised presence, and despite a respectable lineage traceable back to the Pettis closed-graph theorem, to the Birkhoff-Kakutani metrization theorem and further back still to Banach's Theorie des operations lineaires. Its most recent noteworthy appearance has been in connection with the Effros Open Mapping Principle. We collect together known salient features and develop their theory including Steinhaus theory unified by the Category Embedding Theorem [BO-LBII], the associated themes of subadditivity and convexity, and a topological duality inherent to topological dynamics. We study the latter both for its independent interest and as a foundation for topological regular variation.

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规范群与拓扑群:二分法和对偶性

最近发展的基于拓扑动力学的正则变分拓扑理论的关键载体[BO-TI]，包括其经典的单变量对立物(参见[BGT])以及零碎的多元(主要是欧几里得)理论(如[MeSh]， [Res]， [Ya])，是具有右不变度量携带流的群。按照向量范式，它们最好被视为规范组。这个概念只是偶尔明确地出现在文献中，尽管它经常被伪装起来，尽管它的谱系可以追溯到佩蒂斯闭图定理，伯克霍夫-卡库塔尼度量化定理，甚至可以追溯到巴拿赫的线性操作理论。它最近引人注目的出现与Effros开放映射原则有关。我们收集了已知的显著特征，并发展了他们的理论，包括由范畴嵌入定理统一的斯坦豪斯理论，相关的子可加性和凸性主题，以及拓扑动力学固有的拓扑对偶性。我们研究后者既是因为它的独立意义，也是因为它是拓扑正则变分的基础。

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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来源期刊

Dissertationes Mathematicae 数学-数学

CiteScore

2.80

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： DISSERTATIONES MATHEMATICAE publishes long research papers (preferably 50-100 pages) in any area of mathematics. An important feature of papers accepted for publication should be their utility for a broad readership of specialists in the domain. In particular, the papers should be to some reasonable extent self-contained. The paper version is considered as primary. The following criteria are taken into account in the reviewing procedure: correctness, mathematical level, mathematical novelty, utility for a broad readership of specialists in the domain, language and editorial aspects. The Editors have adopted appropriate procedures to avoid ghostwriting and guest authorship.