Example

For any a monoidal category $V$, the functor $V(I,-): V \to Set$ is lax monoidal, hence induces a 2-functor from $V Cat$ to $Cat$. This assigns to any $V$-enriched category, $\mathcal{C}$, its underlying ordinary category, usually denoted $\mathcal{C}_0$, defined by $\mathcal{C}_0(x,y) = V(I, hom(x,y))$.

Example

If $V$ is a cocomplete monoidal category, the functor $V(I,-)$ above has a left adjoint that takes a set $X$ to the copower of $X$ copies of $I$. The resulting 2-functor $Cat \to V Cat$ takes an ordinary category to the “free” $V$-category it generates. Such $V$-categories are used, for instance, in subsuming “conical” limits under enriched weighted limits.

By functoriality, the adjunction between these two functors gives rise to a 2-adjunction $Cat \rightleftarrows V Cat$.

Example

More generally, if an adjunction $F:V_1 \rightleftarrows V_2:U$ can be regarded as a free-forgetful adjunction, then the corresponding adjunction between enriched categories can also be so regarded. For instance, if $V_1 = Top$ and $V_2 = G Top$ for some topological group $G$, then the right adjoint $V_2 Cat \to V_1 Cat$ takes the “underlying topologically enriched category” of a category enriched in $G$-spaces (its morphisms are the fixed-point spaces of the original $G$-space-enriched category; we think of these as the “$G$-equivariant maps” while the original spaces consisted of not-necessarily-equivariant maps acted on by conjugation). Similarly, any category enriched in spectra has an underlying category enriched in spaces (whose hom-spaces are the 0-spaces of the original hom-spectra), any dg-category has an underlying Ab-category (whose morphisms are the degree-0 ones in the original category), and so on.

Example

The geometric realization and total singular complex? adjunction $Real:SSet \rightleftarrows Top : Sing$ between simplicial sets and topological spaces induces another adjunction $SSet Cat \rightleftarrows Top Cat$ between simplicially enriched categories and topologically enriched categories.

Example

If $V=$SSet or Top, then the set of connected components $\pi_0:V\to Set$ is lax monoidal. The resulting change of enrichment functor takes a $V$-category $C$ to its “naive homotopy category” $h C(x,y) = \pi_0(C(x,y))$ obtained by “identifying homotopic morphisms”.

Similarly, the fundamental groupoid functor $\Pi_1:V\to Gpd$ is lax monoidal, so any $V$-category has an underlying (2,1)-category.

Example

An enhancement of the last example is that if $V$ is any monoidal model category, then its homotopy category $Ho(V)$ comes with a lax monoidal functor $\gamma : V \to Ho(V)$. Thus any $V$-category $C$ has an underlying $Ho(V)$-enriched “homotopy category” $h C$. Usually the underlying ordinary category of $h C$ is the naive homotopy category from the previous example.

Example

The nerve functor $N:Cat \to SSet$ preserves products and has a left adjoint $\tau_1$ that also preserves products. Thus, we have a change of enrichment adjunction in which any 2-category can be regarded as a simplicially enriched category, and similarly any simplicially enriched category has a “homotopy 2-category”. The latter plays an important role in the theory of quasi-categories.

Example

(poly-morphisms)

For $F = P \;\colon\; Set \to Set$ the power set-functor, the change of base functor $P_\ast \;\colon\; Cat \to Cat$ sends plain categories to plain categories. For $C$ any category, the morphisms of $C^{poly} \coloneqq P\ast(C)$ are called the poly-morphisms of $C$ in Mochizuki 12, section 0.