I'm trying to write something that appears to be analagous to "rank 2 types", but for constraints instead. (Or, maybe it's not correct to assume changing `->`

in the definition of "rank 2 types" to `=>`

is meaningful; please edit the question if you think up better terminology).

## setup

First, the `Suitable`

typeclass (from Data.Suitable, the base of rmonad) can be used to denote types of values which can be used. In this question, I'll use

```
Suitable m a
```

to denote that value `a`

can be used as a value for some functions of the monad `m`

(in particular, if `m`

is a DSL, then its values are usually `a`

which are suitable), for example

```
class PrintSuitable m where
printSuitable :: Suitable m a => a -> m ()
```

See the top comment for RMonad [ link ] and its source for an example of how to use Suitable. For example, one could define `Suitable m (Map a b)`

, and print the number of elements in the map.

## question

*goal*: Now, I have a monad transformer `MyMonadT`

, and want to make `MyMonadT m`

a `PrintSuitable`

instance whenever `m`

is a `PrintSuitable`

instance.

*rank 2 constraints motivation*: The issue is that the type `a`

is introduced with regard to the `printSuitable`

function, i.e. does not appear in the `class`

signature. Since one can only add constraints to the `class`

signature (additional constraints to an `instance`

function implementation are illegal), it makes sense to say something about all `a`

in the class signature (line 2 below).

Below shows the intended code.

```
instance (PrintSuitable m, MonadTrans t,
(forall a. Suitable (t m) a => Suitable m a), -- rank 2 constraint
) => PrintSuitable (t m) where
printSuitable = lift ...
-- MyMonadT doesn't change what values are Suitable, hence the rank 2 expression,
-- (forall a. Suitable (t m) a => Suitable m a) should hold true
data instance Constraints (MyMonadT m) a =
Suitable m a => MyMonadT_Constraints
instance Suitable m a => Suitable (MyMonadT m) a where -- the important line
constraints = MyMonadT_Constraints
instance MonadTrans MyMonadT where ...
-- now, MyMonadT m is a PrintSuitable whenever m is a PrintSuitable
-- the manual solution, without using MonadTrans, looks roughly like this
instance PrintSuitable m => PrintSuitable (t m) where
printSuitable a = withResConstraints $ \MyMonadT_Constraints -> ...
```

the constraint indicated says that anything that's suitable in `(t m)`

is suitable in `m`

. But, of course, this isn't valid Haskell; how could one encode a functional equivalent?

Thanks in advance!!!

`PrintSuitable`

a two-parameter class? – Daniel Fischer Nov 10 '11 at 10:14