English

An $(\infty,n)$-categorical pasting theorem

Category Theory 2023-11-02 v1 Algebraic Topology

Abstract

We identify a reasonably large class of pushouts of strict nn-categories which are preserved by the "inclusion" functor from strict nn-categories to weak (,n)(\infty,n)-categories. These include the pushouts used to assemble from its generating cells any object of Joyal's category Θ\Theta, any of Street's orientals, any lax Gray cube, and more generally any "regular directed CW complex." More precisely, the theorem applies to any \emph{torsion-free complex} in the sense of Forest -- a corrected version of Street's \emph{parity complexes}. This result may be regarded as partial progress toward Henry's conjecture that the pushouts assembling any non-unital computad are similarly preserved by the "inclusion" into weak (,n)(\infty,n)-categories. In future work we shall apply this result to give new models of (,n)(\infty,n)-categories as presheaves on torsion-free complexes, and to construct the Gray tensor product of weak (,n)(\infty,n)-categories. This result is deduced from an \emph{(,n)(\infty,n)-categorical pasting theorem}, in the spirit of Power's 2-categorical and nn-categorical pasting theorems, and the (,2)(\infty,2)-categorical pasting theorems of Columbus and of Hackney, Ozornova, Riehl, and Rovelli. This says that, when assembling a "pasting diagram" from its generating cells, the space of "composite cells which can be pasted together from all of the generators" is contractible.

Keywords

Cite

@article{arxiv.2311.00200,
  title  = {An $(\infty,n)$-categorical pasting theorem},
  author = {Timothy Campion},
  journal= {arXiv preprint arXiv:2311.00200},
  year   = {2023}
}

Comments

26 pages, comments welcome

R2 v1 2026-06-28T13:08:03.891Z