Effectivity of Generalized Double ∞-Categories

Abstract

We construct an adjunction between m-categories internal to (∞,n)-categories, called (n,m)-double ∞-categories, and filtrations A0 … Am where for all i<m, Ai is a (n+i)-category. We show that this adjunction induces an equivalence between (n,m)-double ∞-categories admitting enough companions and filtrations such that each morphism Ai Ai+1 is essentially surjective on cells of dimension lower than or equal to i. This result can be seen as a (∞,n)-categorical generalization of the equivalence between internal groupoids and effective epimorphisms in the category of ∞-groupoids proven by Rezk and Lurie. In the case n=0, this recovers the characterization of flagged m-categories given by Ayala-Francis, and in the case n=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.

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