Lie groupoids of mappings taking values in a Lie groupoid

IF 0.5 Q3 MATHEMATICS

Archivum Mathematicum Pub Date : 2018-11-07 DOI:10.5817/am2020-5-307

H. Amiri, Helge Glockner, Alexander Schmeding

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引用次数: 9

Abstract

Endowing differentiable functions from a compact manifold to a Lie group with the pointwise group operations one obtains the so-called current groups and, as a special case, loop groups. These are prime examples of infinite-dimensional Lie groups modelled on locally convex spaces. In the present paper, we generalise this construction and show that differentiable mappings on a compact manifold (possibly with boundary) with values in a Lie groupoid form infinite-dimensional Lie groupoids which we call current Lie groupoids. We then study basic differential geometry and Lie theory for these Lie groupoids of mappings. In particular, we show that certain Lie groupoid properties, like being a proper \'etale Lie groupoid, are inherited by the current groupoid. Furthermore, we identify the Lie algebroid of a current Lie groupoid as a current Lie algebroid (analogous to the current Lie algebra associated to a current Lie group). To establish these results, we study superposition operators given by postcomposition with a fixed function, between manifolds of $C^\ell$-functions. Under natural hypotheses, these operators turn out to be a submersion (an immersion, an embedding, proper, resp., a local diffeomorphism) if so is the underlying map. These results are new in their generality and of independent interest.

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取李群中值的映射的李群

将紧流形上的可微函数用点群运算赋给李群，得到了所谓的电流群，作为特例，得到了环路群。这些是在局部凸空间上建模的无限维李群的主要例子。在本文中，我们推广了这一构造，并证明了紧流形(可能有边界)上值为李群的可微映射形成无限维李群，我们称之为当前李群。然后研究了这些映射李群的基本微分几何和李理论。特别地，我们证明了某些李群的属性，比如作为一个适当的“谎言”李群，是由当前的群继承的。进一步，我们将一个电流李群的李代数子识别为一个电流李代数子(类似于与一个电流李群相关联的电流李代数)。为了证明这些结果，我们研究了C^ ^ -函数流形之间由固定函数的后复合给出的叠加算子。在自然的假设下，这些操作符被证明是一种浸没。如果是，则是底层映射。这些结果的普遍性和独立性都是新的。

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

Archivum Mathematicum MATHEMATICS-

CiteScore

0.70

自引率

16.70%

发文量

审稿时长

35 weeks

期刊介绍： Archivum Mathematicum is a mathematical journal which publishes exclusively scientific mathematical papers. The journal, founded in 1965, is published by the Department of Mathematics and Statistics of the Faculty of Science of Masaryk University. A review of each published paper appears in Mathematical Reviews and also in Zentralblatt für Mathematik. The journal is indexed by Scopus.