Elmendorf's Theorem for Diagrams

Elmendorf's Theorem for Diagrams

The notion of a continuous $G$-action on a topological space readily generalizes to that of a continuous $D$-action, where $D$ is any small category. Dror Farjoun and Zabrodsky introduced a generalized notion of orbit, which is key to understanding spaces with continuous $D$-action. We give an overv...

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Bibliographische Detailangaben
1. Verfasser: Housden, Hannah
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Algebraic Topology
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Zusammenfassung:The notion of a continuous $G$-action on a topological space readily generalizes to that of a continuous $D$-action, where $D$ is any small category. Dror Farjoun and Zabrodsky introduced a generalized notion of orbit, which is key to understanding spaces with continuous $D$-action. We give an overview of the theory of orbits and then prove a generalization of "Elmendorf's Theorem,'' which roughly states that the homotopical data of of a $D$-space is precisely captured by the homotopical data of its orbits.
DOI:10.48550/arxiv.2306.17708