- A monad is defined as an endofunctor on category C. Let's say, C has type int and bool and other constructed types as objects. Now let's think about the list monad defined over this category.

By it's very definition list then is an endofunctor, it maps (can this be interpreted as a function?) an int type into List[int] and bool to List[bool] of and maps (again a function?) a morphism int -> bool to List[int] -> List[bool]

So, far, it kind of makes sense. But what throws me into deep confusion is the additional definitions of natural transformations that need to accompany it: a. Unit...that transforms int into List[int] (doesn't the definition of List functor already imply this? This is one major confusion I have

b. Does the List functor always have to be understood as mapping from int to List[int] not from int to List[bool]?

c. Is the unit natural transformation int to List[int] different from map from int to List[int] implied by defining List as a functor? I guess this is just re-statement of my earlier question.