Two-variable and $n$-variable adjunctions

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

consists of bifunctors

together with natural isomorphisms

Cyclicity

If $(\otimes ,{\mathrm{hom}}_l,{\mathrm{hom}}_r):C\times D\to E$ is a two-variable adjunction, then so are

and

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” $C\times D\to E^{\mathrm{op}}$; 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.

References

• Mark Hovey. Model Categories, volume 63 of Mathematical Surveys and Monographs. American Mathematical Society, 1999. See Chapter 4.

• Eugenia Cheng, Nick Gurski, Emily Riehl, “Multivariable adjunctions and mates”, arXiv:1208.4520.