Are there important locally cartesian closed categories that actually are not cartesian closed?

The example most familiar to me is the category $\mathcal{LH}$ whose objects are topological spaces and whose morphisms are local homeomorphisms.

This category doesn't have a terminal object, but it is locally cartesian closed: each slice category $\mathcal{LH}/X$ is equivalent to the category of sheaves on $X$.

Tags:

Type Theory

Category Theory

Cartesian Closed Categories

Related

For all integers $n$: if $7n+4$ is even, then $5n+6$ is even. Work out $ \int_{0}^{\infty}x\left(1-x\operatorname{arccot}x\right)\left(2+x\operatorname{arccot}x\right)\operatorname{arccot}x dx$ Are there only seven 3-connected planar graphs with certain symmetries? Finding the values of $x$ such that $[x^2]=[x]^2$ ($[\cdot]$ denotes the floor function) Tetrahedron Centers Prove that all three roots of $f(x)=0$ are zero. Also prove that $a+b+c=0$. Sufficient condition for a matrix to be diagonalizable and similar matrices What exactly is a function? Example of properties so that "any two properties imply the third" A bag contains 3 red, 4 blue, and 5 green balls. Probability that a stick randomly broken in three places can form a triangle Sum of digits of sum of digits of sum of digits of $7^{7^{7^7}}$

Recent Posts