nLab equivalence of 2-categories

Redirected from "equivalence of bicategories".

Context

2-Category theory

Equality and Equivalence

Idea
Definition
Properties
Internalization
Related concepts
References

Idea

The notion of equivalence of $2$ -categories is the appropriate notion of equivalence between 2-categories, categorifying the notion of equivalence of categories: a pair of 2-functors back and forth between 2-categories, which are inverse to each other, up to pseudonatural equivalence.

Definition

An equivalence between 2-categories $C$ and $D$ consists of

2-functors $\;$ $F \,\colon\, \mathcal{C} \to \mathcal{D}$ and $G \,\colon\, \mathcal{D} \to \mathcal{C}$ ,
pseudonatural transformations ${}\;G \circ F \to Id_{\mathcal{C}}$ and $F \circ G \to Id_{\mathcal{D}}$ which are themselves equivalences,

Remark

Def. makes sense, and is used, both in the case that $F$ is strict, and in the case that it is weak. Note however that in this case $G$ should be allowed to be weak: see Lack 2002, Ex, 3.1.

Remark

In the literature this sort of equivalence in Def. is often called a biequivalence, as it has traditionally been associated with bicategories, the standard algebraic definition of weak $2$ -category.

There is a stricter notion of equivalence for strict $2$ -categories, which traditionally is called just a $2$ -equivalence and which on the nLab is called a strict 2-equivalence.

Properties

Proposition

(recognition of equivalences of 2-categories assuming the axiom of choice)
Assuming the axiom of choice, a 2-functor $F \,\colon\, \mathcal{C} \xrightarrow{\;} \mathcal{D}$ is an equivalence of 2-categories precisely if it is

essentially surjective:

surjective on equivalence classes of objects: $\pi_0(F) \;\colon\; \pi_0(\mathcal{C}) \twoheadrightarrow \pi_0(\mathcal{D})\;$ ,
fully faithful (e.g. Gabber & Ramero 2004, Def. 2.4.9 (ii)):

for each pair of objects $X,\, Y \in \mathcal{C}$ the component functor is an equivalence of hom-categories $F_{X,Y} \,\colon\, \mathcal{C}(X,Y) \xrightarrow{\simeq} \mathcal{D}\big(F(X), F(Y)\big)$ ,

which by the analogous theorem for 1-functors (this Prop.) means equivalently that $F$ is (e.g. Johnson & Yau 2020, Def. 7.0.1)
1. essentially full on 1-cells:
  
  namely that each component functor $F_{X,Y}$ is an essentially surjective functor;
2. fully faithful on 2-cells:
  
  namely that each component functor $F_{X,Y}$ is a fully faithful functor.

This is classical folklore. It is made explicit in, e.g. Gabber & Ramero 2004, Cor. 2.4.30; Johnson & Yau 2020, Thm. 7.4.1.

Internalization

Just as the notion of equivalence of categories can be internalized in any $2$ -category, the notion of equivalence for $2$ -categories can be internalized in any $3$ -category in a straightforward way. The version above for $2$ -categories then results from specializing this general definition to the (weak) $3$ -category $2 Cat$ of $2$ -categories, (weak) $2$ -functors, pseudonatural transformations, and modifications.

There is one warning to keep in mind here. Every $3$ -category is equivalent to a semi-strict sort of $3$ -category called a Gray-category, since it is a category enriched over the monoidal category Gray of strict $2$ -categories and strict $2$ -functors. Of course $Gray$ itself is a Gray-category, but as such it is not equivalent to the weak $3$ -category $2 Cat$ of weak $2$ -categories and weak $2$ -functors.

In particular, an “internal (bi)equivalence” in $Gray$ consists of strict $2$ -functors $F,G$ together with pseudonatural equivalences relating $G F$ and $F G$ to identities. This is a semistrict notion of equivalence, intermediate between the fully weak notion and the fully strict one.

Related concepts

equality, isomorphism, equivalence
weak equivalence, homotopy equivalence, weak homotopy equivalence
homotopy equivalence of toposes
equivalence in an (∞,1)-category
equivalence of categories, adjoint functor
equivalence of 2-categories, 2-adjunction
equivalence of (2,1)-categories
equivalence of (∞,1)-categories, adjoint (∞,1)-functor

basic properties of…

References

Stephen Lack, A Quillen model structure for 2-categories, K-Theory 26, No. 2, 171-205 (2002). Zentralblatt review author’s webpage
Ofer Gabber, Lorenzo Ramero, Def. 2.49 with Cor. 2.4.30 in: Foundations for almost ring theory (arXiv:math/0409584)
Weizhe Zheng, Def. 1.6 - Lem. 1.8 of: Gluing pseudofunctors via $n$ -fold categories, J. Homotopy Relat. Struct. 12 189–271 (2017) (arXiv:1211.1877, doi:10.1007/s40062-016-0126-2)
Niles Johnson, Donald Yau, Section 7 of: 2-Dimensional Categories, Oxford University Press 2021 (arXiv:2002.06055, doi:10.1093/oso/9780198871378.001.0001)

Last revised on May 10, 2022 at 08:31:23. See the history of this page for a list of all contributions to it.

nLab equivalence of 2-categories

Context

2-Category theory

Equality and Equivalence

Contents

Idea

Definition

Definition

Remark

Remark

Properties

Proposition

Internalization

Related concepts

References