I am interested in naturally occurring symmetric closed monoidal structures on locally presentable categories.
Two general examples:
- Grothendieck topos with Cartesian structure. Here, for example, $\mathrm{Set}, \mathrm{sSet}$, smooth sets, etc.
- Category algebras over a commutative algebraic theory. Here, for example, $R\text{-}\mathrm{Mod}, \mathrm{Set}_*$.
I think, it's easy to see that they can be combined into one super example: the category of algebras over a commutative monad on a Grothendieck topos (in the case of a trivial monad, we have the topos itself; we can also consider pointed objects in any topos, in particular we get some sorts of pointed spaces).
Separate from this business is the category $\mathrm{Cat}$.
Is there a natural family of limit theories, including $\rm{Cat}$ theory, which are Cartesian closed for some general reason? And $\mathrm{Pos}$ (category of posets)?