English

Effectivity of Generalized Double $\infty$-Categories

Category Theory 2025-03-26 v1

Abstract

We construct an adjunction between mm-categories internal to (,n)(\infty,n)-categories, called (n,m)(n,m)-double \infty-categories, and filtrations A0AmA_0\to \dots\to A_m where for all i<mi<m, AiA_i is a (n+i)(n+i)-category. We show that this adjunction induces an equivalence between (n,m)(n,m)-double \infty-categories admitting enough companions and filtrations such that each morphism AiAi+1A_i\to A_{i+1} is essentially surjective on cells of dimension lower than or equal to ii. This result can be seen as a (,n)(\infty,n)-categorical generalization of the equivalence between internal groupoids and effective epimorphisms in the category of \infty-groupoids proven by Rezk and Lurie. In the case n=0n=0, this recovers the characterization of flagged mm-categories given by Ayala-Francis, and in the case n=1n=1, it allows us to prove some conjectures concerning the square functor and its variants, stated by Gaitsgory-Rozenblyum in the appendix of their book on Derived Algebraic Geometry.

Keywords

Cite

@article{arxiv.2503.19242,
  title  = {Effectivity of Generalized Double $\infty$-Categories},
  author = {Félix Loubaton},
  journal= {arXiv preprint arXiv:2503.19242},
  year   = {2025}
}

Comments

56 pages

R2 v1 2026-06-28T22:33:12.497Z