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arxiv: 2303.05677 · v2 · pith:42MOMV5Fnew · submitted 2023-03-10 · 🧮 math.AT · math.CT· math.MG

Magnitude and magnitude homology of filtered set enriched categories

classification 🧮 math.AT math.CTmath.MG
keywords magnitudecategoriesmetricspacesenrichedgivehomologyhomotopy
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In this article, we give a framework for studying the Euler characteristic and its categorification of objects across several areas of geometry, topology and combinatorics. That is, the magnitude theory of filtered sets enriched categories. It is a unification of the Euler characteristic of finite categories and it the magnitude of metric spaces, both of which are introduced by Leinster. Our definitions cover a class of metric spaces which is broader than the original ones, so that magnitude (co)weighting of infinite metric spaces can be considered. We give examples of the magnitude from various research areas containing the Poincar\'{e} polynomial of ranked posets and the growth function of finitely generated groups. In particular, the magnitude homology gives categorifications of them. We also discuss homotopy invariance of the magnitude homology and its variants. Such a homotopy includes digraph homotopy and r-closeness of Lipschitz maps. As a benefit of our categorical view point, we generalize the notion of Grothendieck fibrations of small categories to our enriched categories, whose restriction to metric spaces is a notion called metric fibration that is initially introduced by Leinster. It is remarkable that the magnitude of such a fibration is a product of those of the fiber and the base. We especially study fibrations of graphs, and give examples of graphs with the same magnitude but are not isomorphic.

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Cited by 3 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Bigraded path homology and the magnitude-path spectral sequence

    math.AT 2024-04 unverdicted novelty 8.0

    Defines bigraded path homology from the MPSS connecting magnitude and path homology, proves it and all MPSS pages satisfy excision and Kunneth theorems, establishes Mayer-Vietoris for magnitude and bigraded versions, ...

  2. Homotopy theories via the magnitude-path spectral sequence

    math.AT 2026-06 unverdicted novelty 7.0

    Defines r-quasi-isomorphisms and r-cofibrations on generalized metric spaces so that each page of the magnitude-path spectral sequence satisfies metric Eilenberg-Steenrod axioms and supports Brown category structures ...

  3. Filtered order complexes and magnitude homology of finite graded posets

    math.CO 2026-06 unverdicted novelty 6.0

    Defines rank-filtered subcomplexes of order complexes of graded posets and proves their homology matches manifold homology except in top degree, plus shellability and wedge-of-spheres homotopy types for shellable and ...