As a math student, the first thing I did when I learned about monads in Haskell was check that they really were monads in the sense I knew about. But then I learned about monad transformers and those don't quite seem to be something studied in category theory.

In particular I would expect them to be related to distributive laws but they seem to be genuinely different: a monad transformer is expected to apply to an arbitrary monad while a distributive law is an affair between a monad and a specific other monad.

Also, looking at the usual examples of monad transformers, while `MaybeT m` composes `m` with `Maybe`, `StateT m` is not a composition of `m` with `State` in either order.

So my question is what are monad transformer in categorical language?

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They say a monad transformer in C is a pointed endofunctor (a.k.a. pre-monad) on Monad(C). I'm not sure I understand this definition though. Maybe you do? Then please share ;) –  n.m. Jul 28 '11 at 6:29
This article looks like a good place to start. –  hammar Jul 28 '11 at 8:07
@n.m. Unpacking "pointed endofunctor on Monad(C)" you get that a monad transformer t is something that (1) for each monad m gives you a monad t m and (2) for each monad morphism m->n gives you another monad morphism t m -> t n in a functorial way (i.e., respecting compositions) and t comes with (3) for any monad m, a monad morphism m -> t m which is natural (i.e., for a monad morphism the obvious square you get with vertices m, n, t m, t n commutes). (Endofunctor on Monad(C) is (1) and (2), pointed is (3).) –  Omar Antolín-Camarena Jul 28 '11 at 17:43