The Unapologetic Mathematician

Mathematics for the interested outsider

The 2-category of Enriched Categories

So we know that \mathbf{Cat} — the collection of all categories — forms a 2-category with functors as 1-morphisms and with natural transformations as 2-morphisms. It shouldn’t surprise us, then, that the collection \mathcal{V}\mathbf{-Cat} of all categories enriched over a monoidal category \mathcal{V} also comprises a 2-category.

We need two concepts to make this go through: an “enriched” notion of a functor, and an “enriched” notion of a natural transformation. As we might expect, both of them will just be written out like the familiar notions of functor and natural transformation, but substituting the new monoidal structure for the cartesian monoidal structure of \mathbf{Set}.

First of all, a functor from category \mathcal{C} to \mathcal{D} is a function F:\mathrm{Ob}(\mathcal{C})\rightarrow\mathrm{Ob}(\mathcal{D}), along with functions F:\hom_\mathcal{C}(A,B)\rightarrow\hom_\mathcal{D}(F(A),F(B)) for each hom-set. So to define a \mathcal{V}-functor we keep the function on objects and replace the functions between hom-sets with morphisms between hom-objects. Of course, these must preserve compositions and identities, as encoded in the following diagrams:

Enriched Functor Definition

which by now should look very familiar.

A natural transformation \eta:F\rightarrow G between two functors from \mathcal{C} to \mathcal{D} picks out a morphism \eta_C:F(C)\rightarrow G(C) in \mathcal{D} for each object C in \mathcal{C}, subject to a “naturality” condition. To find an analogue of picking out a morphism from a hom-set we use the same trick we did for the identity: we pick a morphism from \mathbf{1} to a hom-object. That is, a \mathcal{V}-natural transformation consists of an \mathrm{Ob}(\mathcal{C})-indexed family of arrows \eta_C:\mathbf{1}\rightarrow\hom_\mathcal{D}(F(C),G(C)), which make the following diagram commute:

Enriched Naturality Diagram

You should try to write this diagram out in the case of \mathbf{Set} to verify that it becomes the familiar naturality square in that context.

Now the exact same constructions we used to compose natural transformations “vertically” and “horizontally” apply to \mathcal{V}-natural transformations, and the same arguments we used in the case of \mathbf{Cat} apply to give a 2-category \mathcal{V}\mathbf{-Cat} of categories, functors, and natural transformations, all enriched over the monoidal category \mathcal{V}.

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August 17, 2007 - Posted by | Category theory

3 Comments »

  1. So we have 2-categories, and we also have mondoidal 2-categories (Karpanov and Voevodsky paper, or else follow along in Leinster’s book and view monoidal 2-categories as three-categories with a single object). Perhaps you have a pithy way of describing the diagrams needed for monoidal 2-functor?

    Comment by Giusto | November 26, 2009 | Reply

  2. I’m not sure what you mean by “pithy”.

    Comment by John Armstrong | November 26, 2009 | Reply

  3. It partly depends on what you mean by monoidal 2-category; the way you write suggests you mean the weakest notion — that of tricategory with one object — but a reasonable semi-strictified alternative would be a Gray monoid (monoid enriched in the category of 2-categories equipped with the “pseudo” version of Gray’s tensor product).

    I suggest just looking it up. If memory serves, you can find the weak version in Day and Street, Monoidal bicategories and Hopf algebroids, Adv. Math. 129 (1997), 99-157.

    But if you want “pith”: the combinatorics of such diagrams appear from long ago in the study of A_\infty maps between A_\infty spaces, by people such as Stasheff, Boardman and Vogt, and others, and can be described in terms of combinatorics of “cherry trees” (Boardman and Vogt). A key word here is “multiplihedra”, and you may wish to check out some of the work of Stefan Forcey and his collaborators, as for example here. A modern understanding of these structures would be in terms of bimodules between operads, but the margin here is not really wide enough to go into details.

    Comment by Todd Trimble | November 27, 2009 | Reply


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