I've noticed that the word "monad" seems to be used in a somewhat inconsistent way. I've come to believe that this is because many (if not most) of the monad tutorials out there are written by folks who have only just started to figure monads out themselves (eg: nuclear waste spacesuit burritos), and so the term ends up getting kind of overloaded/corrupted.

In particular, I'm wondering whether the term "monad" can be applied to individual values of types like Maybe, List or IO, or if the term "monad" should really only be applied to the types themselves.

This is a subtle distinction, so perhaps an analogy might make it more clear. In mathematics we have, rings, fields, groups, etc. These terms apply to an entire set of values along with the operations that can be performed on them, rather than to individual elements. For example, integers (along with the operations of addition, negation and multiplication) form a ring. You could say "Integer is a ring", but you would never say "5 is a ring".

So, can you say "`Just 5`

is a monad", or would that be as wrong as saying "5 is a ring"? I don't know category theory, but I'm under the impression that it really only makes sense to say "`Maybe`

is a monad" and not "`Just 5`

is a monad".

Category Theory for the Working Mathematician. Also, read Sigfpe's blog – Alexandre C. Jun 19 '12 at 18:50`Just 5`

is not a monad, and that`Maybe`

is. But it's also important to point out that the type of`Just 5`

,`Maybe Integer`

, is also not a Monad. – sigfpe Jun 21 '12 at 20:07