nLab two-variable adjunction

Two-variable and -variable adjunctions

Context

2-Category theory

Two-variable and $n$ -variable adjunctions

Idea
Definition
Cyclicity
Adjunctions of $n$ variables
Adjunctions with a parameter
Related concepts
References

Idea

An adjunction of two variables is a straightforward generalization of both:

the internal hom in a biclosed monoidal category

and

a $V$ -enriched category having powers and copowers

by extracting the central pattern.

Definition

Let $C$ , $D$ and $E$ be categories. An adjunction of two variables or two-variable adjunction

(\otimes, hom_l, hom_r) : C \times D \to E

consists of bifunctors

\begin{aligned} \otimes & : C \times D \to E \\ hom_l &: C^{op} \times E \to D \\ hom_r &: D^{op} \times E \to C \end{aligned}

together with natural isomorphisms

E(c \otimes d, e) \simeq D(d, hom_l(c,e)) \simeq C(c, hom_r(d,e))

Cyclicity

If $(\otimes, hom_l, hom_r) : C \times D \to E$ is a two-variable adjunction, then so are

(hom_l^{op}, \otimes^{op}, hom_r) : E^{op} \times C \to D^{op}

and

(hom_r^{op}, hom_l, \otimes^{op}) : D\times E^{op} \to C^{op}.

giving an action of the cyclic group of order 3. This can be made to look more symmetrical by regarding the original two-variable adjunction as a “two-variable left adjunction” $C\times D \to E^{op}$ ; see Cheng-Gurski-Riehl.

Adjunctions of $n$ variables

There is a straightforward generalization to an adjunction of $n$ variables, which involves $n+1$ categories and $n+1$ functors. Adjunctions of $n$ variables assemble into a 2-multicategory. They also have a corresponding notion of mates; see Cheng-Gurski-Riehl.

This 2-multicategory can also be promoted to a 2-polycategory; see Shulman.

Adjunctions with a parameter

In CWM Theorem IV.7.3, Mac Lane introduced the notion of adjunction with a parameter, which is equivalent to the notion of two-variable adjunction.

Related concepts

Quillen bifunctor

References

John Gray, Closed categories, lax limits and homotopy limits. J. Pure Appl. Algebra 19 (1980), 127–158. Possibly the oldest abstract definition of the concept, under the name “THC-situation”.
Mark Hovey. Model Categories, volume 63 of Mathematical Surveys and Monographs. American Mathematical Society, 1999. See Chapter 4.
Rene Guitart, Trijunctions and triadic Galois connections. Cah. Topol. Géom. Différ. Catég. 54 (2013), no. 1, 13–27.
Eugenia Cheng, Nick Gurski, Emily Riehl, “Multivariable adjunctions and mates”, arXiv:1208.4520.
Mike Shulman, The 2-Chu-Dialectica construction and the polycategory of multivariable adjunctions, arxiv:1806.06082, blog post

Last revised on December 1, 2022 at 17:29:50. See the history of this page for a list of all contributions to it.