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Main Author: Surlykke, Thomas Holme
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.06776
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author Surlykke, Thomas Holme
author_facet Surlykke, Thomas Holme
contents We extend the theory of ambidexterity developed by M.J. Hopkins and J. Lurie by proving commutativity of the norm square induced from a weakly ambidextrous morphism by two Beck-Chevalley fibrations that are associated by a functor. By showing how ambidexterity is preserved under base change of Beck-Chevalley fibrations, we demonstrate that our result is a generalization of the naturality property of the norm shown by M.J. Hopkins and J. Lurie. Furthermore, we demonstrate how our generalization implies two specific results previously shown by S. Carmeli, T. M. Schlank, and L. Yanovski, namely, that the induced norm square of local systems, and the induced norm square of equivariant powers, both commute.
format Preprint
id arxiv_https___arxiv_org_abs_2603_06776
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Beck-Chevalley Fibrations
Surlykke, Thomas Holme
Algebraic Topology
We extend the theory of ambidexterity developed by M.J. Hopkins and J. Lurie by proving commutativity of the norm square induced from a weakly ambidextrous morphism by two Beck-Chevalley fibrations that are associated by a functor. By showing how ambidexterity is preserved under base change of Beck-Chevalley fibrations, we demonstrate that our result is a generalization of the naturality property of the norm shown by M.J. Hopkins and J. Lurie. Furthermore, we demonstrate how our generalization implies two specific results previously shown by S. Carmeli, T. M. Schlank, and L. Yanovski, namely, that the induced norm square of local systems, and the induced norm square of equivariant powers, both commute.
title Beck-Chevalley Fibrations
topic Algebraic Topology
url https://arxiv.org/abs/2603.06776