There are several generics libraries with numerous overlapping modules in just the Haskell Platform alone (`syb`

, `Data.Typeable`

, `Data.Data`

, `GHC.Generics`

), but I'm having trouble with a very basic generic programming task.

I want to be able to convert between types of the same shape, i.e. I want a polymorphic, typed conversion function between isomorphic types, essentially what is offered at the end of this paper(PDF) where indexed type families are mentioned.

I'm not concerned with scrapping my boilerplate, but rather with being able to build new libraries around sum and product abstractions.

The question below is in terms of `GHC.Generic`

which I thought was closest to what I needed, but other solutions are welcome.

The following two types have the same shape

```
data Pair = Pair Char Int deriving (Generic, Show)
data Pair2 = Pair2 Char Int deriving (Generic, Show)
```

I want to convert values between them using GHC.Generics. The following fails to typecheck because of all the phantom parameters and other nonsense:

```
f :: Pair -> Pair2
f = to . from
```

Ultimately I want a function akin to `fromInteger`

that has a polymorphic return value for any `Generic`

(or whatever other class could support this) instance. I guess I'm looking for something like `GHC.Generics`

:

```
--class:
type family NormalForm a
class ToGeneric a where
to :: a -> NormalForm a
class FromGeneric b where
from :: NormalForm b -> b
--examples:
data A = A Char Int deriving Show
data B = B Char Int deriving Show
type instance NormalForm A = (Char,Int)
instance ToGeneric A where
to (A a b) = (a,b)
instance FromGeneric A where
from (a,b) = A a b
type instance NormalForm B = (Char,Int)
instance ToGeneric B where
to (B a b) = (a,b)
instance FromGeneric B where
from (a,b) = B a b
-- the function I'm looking for
coerce :: (ToGeneric a, FromGeneric b, NormalForm a ~ NormalForm b)=> a -> b
coerce = from . to
```

With the above we can do everything I want:

```
*Main> (coerce $A 'a' 1) :: B
B 'a' 1
*Main> (coerce $A 'a' 1) :: A
A 'a' 1
```

**EDIT:** This is how Nathan Howell's `f`

function seems to work below, actually.

### Questions

Is this possible to do with libraries currently in the haskell platform?

If not, could a library be defined that leveraged the existing

`deriving`

mechanism for`Generic`

,`Data`

, etc. without resorting to TH?

`Generic`

uses various phantom types that make`Rep`

s from different data types incompatible. The closest you are going to get to a real solution is using various type casts between the internals of`Generic`

, but then you'd just as well be able to use`unsafeCoerce`

. – dflemstr Aug 9 '12 at 16:51