比较立方体和球面有向路径

Pub Date : 2022-07-04 DOI:10.4064/fm219-3-2023
P. Gaucher
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引用次数: 5

摘要

流是同伦型上的有向空间结构。已知,作为流的预立方集的实现的底层同伦类型与作为拓扑空间的预立方集的实现是同伦等价的。这种实现依赖于q-cofibrant替代品的非规范选择。构造了一个新的从预立方集到流的实现函子,该实现函子不依赖于任何协替换函子的选择,与之前的实现函子同伦等价。主要的工具是Raussen引入的自然路径概念。对于给定的立方集,我们得到的流不再是q-协流,而仍然是m-协流。作为一个应用,我们证明了一个预立方集作为流的实现的执行路径空间同伦等价于该预立方集几何实现中顶点间的非常数路径空间。
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Comparing cubical and globular directed paths
A flow is a directed space structure on a homotopy type. It is already known that the underlying homotopy type of the realization of a precubical set as a flow is homotopy equivalent to the realization of the precubical set as a topological space. This realization depends on the non-canonical choice of a q-cofibrant replacement. We construct a new realization functor from precubical sets to flows which is homotopy equivalent to the previous one and which does not depend on the choice of any cofibrant replacement functor. The main tool is the notion of natural $d$-path introduced by Raussen. The flow we obtain for a given precubical set is not anymore q-cofibrant but is still m-cofibrant. As an application, we prove that the space of execution paths of the realization of a precubical set as a flow is homotopy equivalent to the space of nonconstant $d$-paths between vertices in the geometric realization of the precubical set.
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