This is a general question, not tied to any one piece of code.

Say you have a type `T a`

that can be given an instance of `Monad`

. Since every monad is an `Applicative`

by assigning `pure = return`

and `(<*>) = ap`

, and then every applicative is a `Functor`

via `fmap f x = pure f <*> x`

, is it better to define your instance of `Monad`

first, and then trivially give `T`

instances of `Applicative`

and `Functor`

?

It feels a bit backward to me. If I were doing math instead of programming, I would think that I would first show that my object is a functor, and then continue adding restrictions until I have also shown it to be a monad. I know Haskell is merely inspired by Category Theory and obviously the techniques one would use when constructing a proof aren't the techniques one would use when writing a useful program, but I'd like to get an opinion from the Haskell community. Is it better to go from `Monad`

down to `Functor`

? or from `Functor`

up to `Monad`

?