Enriched categories and internal categories are both generalisations of categories to category-like structures that are defined in terms of another category. An enriched category is (usually) defined in terms of a monoidal category, while an internal category is (usually) defined in terms of a category with finite limits. The two notions are not unrelated, but they are different. One difference is that in a $V$-enriched category, the objects still form a set (or a proper class) while the arrows are replaced by objects of $V$, while in a category internal to $E$, both the set of objects and the set of arrows are replaced by objects of $E$.
One way that internalisation and enrichment are related is that internal categories and enriched categories are both instances of monads in bicategories (the bicategory of spans and the bicategory of matrices, respectively). Since monads in a bicategory $B$ are one-object categories enriched in the bicategory $B$, it is thus possible to capture $E$-internal categories as one-object categories enriched in the bicategory of spans $Span(E)$.
It is useful to contrast the notion of internal category with that of enriched category, each of which may be considered as a generalization according to whether categories are defined (i) by a single collection of all morphisms or (ii) by a family of collections indexed by pairs of objects. In some cases, one of these generalizations is a special case of the other, but in general they are incomparable. These two presentations may be seen as different presentations of the theory of categories as a generalized algebraic theory.
Internalisation is a quite general phenomenon, of which internal categories are a particular case. However, the distinction between “internalization” and “enrichment” becomes less clear in generality.
For example, in addition to categories enriched over a monoidal category, one can define categories enriched over a bicategory or an virtual double category. It then turns out that a category enriched over the bicategory (or virtual double category) of spans in a lex category $C$ which has one object is precisely an internal category in $C$.
While enriched categories and internal categories are defined with respect to different kinds of category, making it impossible to compare them in general, we can compare the two notions when our category $V$ or $E$ has enough structure. E.g. $K$ is an $\infty$-extensive category, such as Set or simplicial sets (or more generally any Grothendieck topos), (small) $K$-enriched categories can be identified with $K$-internal categories whose object-of-objects is discrete (that is, a coproduct of copies of the terminal object).
We may also internalise a category in a monoidal category. One might expect that the same relationship holds in this generalised setting, though it does not appear this has been worked out in the literature.
The equivalence between categories enriched in $K$ and categories internal to $K$ with a discrete object of objects is due to the appendix of:
This relationship has also been studied in:
Michał R. Przybyłek?, Kategorie wewnętrzne a kategorie wzbogacone (2008), master’s thesis (pdf)
Thomas Cottrell?, Soichiro Fujii, and John Power, Enriched and internal categories: an extensive relationship (2017).
Bojana Femić? and Enrico Ghiorzi, Internalization and enrichment via spans and matrices in a tricategory, Journal of Algebraic Combinatorics (2023): 1-54.
Last revised on December 21, 2023 at 22:58:39. See the history of this page for a list of all contributions to it.