nLab enriched natural transformation

Contents

Context

Enriched category theory

Idea
Definition
Properties

As 2-morphisms

Examples
Related concepts
References

Idea

The notion of $V$ -enriched natural transformation is the appropriate notion of homomorphism between enriched functors, the analog in enriched category theory of the ordinary notion of natural transformation in ordinary category theory.

$V$ -Enriched natural transformations constitute the 2-morphisms in the 2-category VCat.

Definition

For $V$ a cosmos for enrichment, let

$\mathbf{C}$ , $\mathbf{D}$ be a pair of enriched categories

(we denote their hom-objects by $C(-, -)$ etc., instead of $\hom_C(-, -)$ or similar),
$F, G \,\colon\, \mathbf{C} \longrightarrow \mathbf{D}$ a pair of $V$ -enriched functors between them.

Then:

Definition

An enriched natural transformation between these enriched functors

\eta \colon F \longrightarrow G'

is a family of morphisms of $V$

\eta_c \;\colon\; I \longrightarrow D(F c, G c)

(out of the tensor unit $I$ of $V$ ) indexed by $c\in Ob(C)$ )

such that for any pair of objects $c, c' \,\in\, Obj(\mathbf{C})$ the following diagram commutes:

(1)

Here

$\otimes$ denotes the tensor product in $V$ ,
$I$ denotes the tensor unit in $V$ ,
$l$ , $r$ denote the left and right unitors of $V$ ,
$F_{c,c'}$ , $G_{c,c'}$ denote the component maps of the enriched functors between hom-objects,
$\circ^{\mathbf{D}}$ denotes the composition-operation of $\mathbf{D}$ .

The above diagram expresses the $V$ -enriched version of commutativity of the plain naturality square:

\array{ c && F(c) &\overset{ \eta_c }{\longrightarrow}& G(c) \\ \mathllap{{}^{f}} \Big\downarrow &\mapsto\;\;\;& \mathllap{{}^{F(f)}} \Big\downarrow && \Big\downarrow\mathrlap{{}^{G(f)}} \\ c' && F(c') &\underset{\eta_{c'}}{\longrightarrow}& G(c') }

Properties

As 2-morphisms

In generalization of how for plain natural transformations there is a notion of horizontal composition (“whiskering”) and vertical composition, so for enriched natural transformations:

Proposition

(horizontal composition)
Given

where

$\eta$ is an enriched natural transformations (Def. )
$H$ is an enriched functor

then we obtain an enriched natural transformation of the form

with component maps given as the composition

I \overset{\eta_c}{\longrightarrow} \mathbf{D}\big(F(c),\,G(c)\big) \overset{H_{F(c), G(c)}}{\longrightarrow} \mathbf{E}\big(H \circ F(c),\,H \circ G(c)\big) \,.

Examples

Example

With Set denoting the category of sets and functions equipped with its cartesian monoidal-structure (via Cartesian product of sets), Set-enriched natural transformations are just plain natural transformations between functors between locally small categories.

Example

With Cat denoting the 1-category of small strict categories equipped with its cartesian monoidal structure (via forming product categories), $Cat$ -enriched natural transformations are also known as strict 2-natural transformations.

Related concepts

References

Max Kelly, p. 9 of: Basic Concepts of Enriched Category Theory, Cambridge University Press, Lecture Notes in Mathematics 64 (1982), Reprints in Theory and Applications of Categories, 10 (2005) 1-136 [tac:tr10, pdf]
Francis Borceux, def. 6.2.4 of: Handbook of Categorical Algebra Vol 2, Cambridge University Press (1994)
Emily Riehl, §3.5 in Categorical Homotopy Theory, Cambridge University Press (2014) [doi:10.1017/CBO9781107261457, pdf]

For more references see at enriched category.

Last revised on May 18, 2023 at 14:09:03. See the history of this page for a list of all contributions to it.

nLab enriched natural transformation

Context

Enriched category theory

Background

Basic concepts

Universal constructions

Extra stuff, structure, property

Homotopical enrichment

Contents

Idea

Definition

Definition

Properties

As 2-morphisms

Proposition

Examples

Example

Example

Related concepts

References