通过有效同源性和离散向量场计算普遍盖的同源性

IF 0.6 4区 数学 Q4 COMPUTER SCIENCE, THEORY & METHODS
Miguel A. Marco-Buzunáriz , Ana Romero
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引用次数: 0

摘要

通过有效的同调技术,我们可以计算大量拓扑空间的同调群。通过怀特海塔方法,这也可以用来计算高同调群。然而,其中一些技术(尤其是怀特海塔)依赖于起始空间是简单连接的假设。在某些应用中,这个问题可以通过用通用盖来代替空间来规避,通用盖是一个简单连接的空间,它共享初始空间的高次同调群。在本文中,我们正式提出了通用盖的简单构造,并将其表示为一个扭曲的笛卡尔乘积。我们通过一些例子说明,具有有效同源性的空间的通用盖一般不一定具有有效同源性。我们举例说明了在 SageMath 和 Kenzo 中实现这些构造的方法,同时还介绍了一种利用空间的扭曲同源性计算普遍盖的同源性的方法,即使在某些没有有效同源性的情况下,当群是阿贝尔群时也是如此。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Computing the homology of universal covers via effective homology and discrete vector fields
Effective homology techniques allow us to compute homology groups of a wide family of topological spaces. By the Whitehead tower method, this can also be used to compute higher homotopy groups. However, some of these techniques (in particular, the Whitehead tower) rely on the assumption that the starting space is simply connected. For some applications, this problem could be circumvented by replacing the space by its universal cover, which is a simply connected space that shares the higher homotopy groups of the initial space. In this paper, we formalize a simplicial construction for the universal cover, and represent it as a twisted Cartesian product.
As we show with some examples, the universal cover of a space with effective homology does not necessarily have effective homology in general. We show two independent sufficient conditions that can ensure it: one is based on a nilpotency property of the fundamental group, and the other one on discrete vector fields.
Some examples showing our implementation of these constructions in both SageMath and Kenzo are shown, together with an approach to compute the homology of the universal cover when the group is Abelian even in some cases where there is no effective homology, using the twisted homology of the space.
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来源期刊
Journal of Symbolic Computation
Journal of Symbolic Computation 工程技术-计算机:理论方法
CiteScore
2.10
自引率
14.30%
发文量
75
审稿时长
142 days
期刊介绍: An international journal, the Journal of Symbolic Computation, founded by Bruno Buchberger in 1985, is directed to mathematicians and computer scientists who have a particular interest in symbolic computation. The journal provides a forum for research in the algorithmic treatment of all types of symbolic objects: objects in formal languages (terms, formulas, programs); algebraic objects (elements in basic number domains, polynomials, residue classes, etc.); and geometrical objects. It is the explicit goal of the journal to promote the integration of symbolic computation by establishing one common avenue of communication for researchers working in the different subareas. It is also important that the algorithmic achievements of these areas should be made available to the human problem-solver in integrated software systems for symbolic computation. To help this integration, the journal publishes invited tutorial surveys as well as Applications Letters and System Descriptions.
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