纤维组的基本群作用

Q3 Chemistry European Chemical Bulletin Pub Date : 2023-10-01 DOI:10.53555/ecb/2022.12.10.671
Dr.Kumari Sreeja S Nair
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引用次数: 0

摘要

拓扑空间的结构可以用一个代数系统来描述,通常是一个群或一组群的序列。有几种方法可以将组与拓扑空间关联起来。这里我们考虑一个透同伦,这样定义的群称为给定拓扑空间的基本群。群的代数结构反映了底层空间的拓扑结构和几何结构。覆盖空间理论与基本群的研究密切相关。许多关于覆盖空间的基本拓扑问题可以简化为关于所涉及的各种空间的基本群的纯代数问题。在抽象代数中,群对集合的作用有许多应用。将抽象代数中的群作用概念应用到代数拓扑中。本文描述了基本群对纤维集的作用。
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FUNDAMENTAL GROUP ACTION ON FIBRE SET
The structure of a topological space may be described by associating with it an algebraic system usually a group or a sequence of groups. There are several methods by which groups can be associated with topological spaces. Here we shall consider one through homotopy and the group so defined is called Fundamental group of the given topological space. The algebraic structure of the group reflects the topological and geometrical structures of the underlying space. The theory of Covering spaces is closely connected with the study of Fundamental group. Many basic topological questions about covering spaces can be reduced to purely algebraic questions about the fundamental groups of the various spaces involved. In Abstract Algebra, the action of a group on a set has many applications. We shall apply the group action concept of Abstract Algebra in Algebraic Topology. In this article we give description about the action of Fundamental group on Fibre set.
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来源期刊
European Chemical Bulletin
European Chemical Bulletin Chemistry-Chemistry (all)
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审稿时长
6 weeks
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