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Main Authors: Laplante-Anfossi, Guillaume, Medina-Mardones, Anibal M., Padrol, Arnau
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2510.12937
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author Laplante-Anfossi, Guillaume
Medina-Mardones, Anibal M.
Padrol, Arnau
author_facet Laplante-Anfossi, Guillaume
Medina-Mardones, Anibal M.
Padrol, Arnau
contents In the early 1990s, Kapranov and Voevodsky proposed a geometric method for constructing higher-categorical pasting diagrams from generically framed convex polytopes. This work revisits their construction and identifies a convex-geometric condition that is both necessary and sufficient for the procedure to yield a well-defined pasting diagram. Our criterion, the absence of cellular loops, relates their construction to the theory of cellular strings, an active area of convex geometry originating in the Baues problem. This paper introduces higher-dimensional cellular strings and uses them to disprove the Kapranov-Voevodsky conjecture in the following strong sense. Not only do we exhibit framed polytopes admitting cellular loops, but we also construct examples for which every admissible frame produces one. As observed by these authors, Street's orientals arise from canonically framed cyclic simplices. We establish that this family is exceptional as any random $n$-simplex, canonically framed, almost surely exhibits cellular loops in the large $n$-limit.
format Preprint
id arxiv_https___arxiv_org_abs_2510_12937
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Framed Polytopes and Higher Categories
Laplante-Anfossi, Guillaume
Medina-Mardones, Anibal M.
Padrol, Arnau
Category Theory
Algebraic Topology
Combinatorics
In the early 1990s, Kapranov and Voevodsky proposed a geometric method for constructing higher-categorical pasting diagrams from generically framed convex polytopes. This work revisits their construction and identifies a convex-geometric condition that is both necessary and sufficient for the procedure to yield a well-defined pasting diagram. Our criterion, the absence of cellular loops, relates their construction to the theory of cellular strings, an active area of convex geometry originating in the Baues problem. This paper introduces higher-dimensional cellular strings and uses them to disprove the Kapranov-Voevodsky conjecture in the following strong sense. Not only do we exhibit framed polytopes admitting cellular loops, but we also construct examples for which every admissible frame produces one. As observed by these authors, Street's orientals arise from canonically framed cyclic simplices. We establish that this family is exceptional as any random $n$-simplex, canonically framed, almost surely exhibits cellular loops in the large $n$-limit.
title Framed Polytopes and Higher Categories
topic Category Theory
Algebraic Topology
Combinatorics
url https://arxiv.org/abs/2510.12937