Want to take part in these discussions? Sign in if you have an account, or apply for one below
Vanilla 1.1.10 is a product of Lussumo. More Information: Documentation, Community Support.
1 to 1 of 1
You know that I am attempting to prove that categories Fcd and Rld defined by myself are cartesian closed.
My former attempt to prove it failed. I followed the pattern of the category of digraphs. But today I have found that there are troubles in my way to define cartesian product in the category of digraphs. (Previously I have skipped proving it, as considered it too trivial. That was my error.)
Now I realize that I have some trouble to specify exponential object, evaluation, and transpose for so simple thing as the category of digraphs.
This was probably the reason why I haven’t yet proved that Fcd and Rld are cartesian closed.
I ask for help proving that the category of digraphs is cartesian closed. Sorry for my stupidity, but it appeared not quite trivial.
See my exact question at math.stackexchange.com.
Note that I define a digraph as a relation on a set, so there are at most one edge between any two vertexes.
1 to 1 of 1