Closed category

A closed category can be defined as a category ${\displaystyle {\mathcal {C}}}$ with a so-called internal Hom functor

${\displaystyle \left[-\ -\right]:{\mathcal {C}}^{op}\times {\mathcal {C}}\to {\mathcal {C}}}$

with left Yoneda arrows

${\displaystyle L:\left[B\ C\right]\to \left[\left[A\ B\right]\left[A\ C\right]\right]}$

natural in ${\displaystyle B}$ and ${\displaystyle C}$ and dinatural in ${\displaystyle A}$, and a fixed object ${\displaystyle I}$ of ${\displaystyle {\mathcal {C}}}$ with a natural isomorphism

${\displaystyle i_{A}:A\cong \left[I\ A\right]}$

and a dinatural transformation

${\displaystyle j_{A}:I\to \left[A\ A\right]}$,

all satisfying certain coherence conditions.

• Cartesian closed categories are closed categories. In particular, any topos is closed. The canonical example is the category of sets.
• Compact closed categories are closed categories. The canonical example is the category FdVect with finite-dimensional vector spaces as objects and linear maps as morphisms.
• More generally, any monoidal closed category is a closed category. In this case, the object ${\displaystyle I}$ is the monoidal unit.

• Eilenberg, S. & Kelly, G.M. Closed categories Proceedings of the Conference on Categorical Algebra. (La Jolla, 1965) Springer. 1966. pp. 421–562
• Closed category in nLab