Can we always construct a monad from a category to itself ?
I was thinking that monad is like a monoidal structure in the category of endofunctors. So taking the category of endofunctors will we always find a monoidal structure?
Can we always construct a monad from a category to itself ?
I was thinking that monad is like a monoidal structure in the category of endofunctors. So taking the category of endofunctors will we always find a monoidal structure?