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# Is there a use case for `newtype T = MkT (T -> T)`?

The paper "System F with Type Equality Coercions" by Sulzmann, Chakravarty, and Peyton Jones illustrates the translation of Haskell's `newtype` into System FC with the following example:

``````newtype T = MkT (T -> T)
``````

As I understand it, barring `unsafePerformIO`, the only possible values of this type are `MkT id` and `MkT undefined` because of parametricity. I'm curious if there are some actual uses for this (or a similar) definition.

-

Parametricity is about the values of types with variables. `T` has no variables, so parametricity does not apply. Infact, T has many inhabitants

``````ap :: T -> T -> T
ap (MkT f) t = f t

idT :: T
idT = MkT id

constT :: T
constT = MkT \$ \t -> MkT \$ \_ -> t

axiom_sT :: T
axiom_sT = MkT \$ \f -> MkT \$ \g -> MkT \$ \a -> (g `ap` a) `ap` (f `ap` a)
``````

The type `T` is an implementation of the Untyped Lambda Calculus, a universal formal system equivalent in power to a Turing machine. The three functions above (plus `ap`) form the SKI calculus, an equivalent formal system.

It is possible to encode any Haskell datatype into `T`. Consider the type for natural numbers

``````data Nat = Zero | Succ Nat
``````

we can encode `Nat` into `T`

``````church :: Nat -> T
church Zero     = MkT \$ \f -> MkT \$ \x -> x
church (Succ n) = MkT \$ \f -> MkT \$ \x -> f `ap` (church n)
``````

now, you are partially correct though. There is no way in Haskell to write the inverse function of this (so far as I know). Which is really a shame. Although you can write a sort of psuedo inverse with the type `T -> IO Nat`. Also, my understanding is the GHCs optimizer can die on recursive `newtypes` (someone please correct me if I am wrong about this, because I would like to go back to using them).

``````data T = MkT (T -> T) | Failed String
``````

with

``````ap (MkT f)    a = f a
ap (Failed s) _ = Failed s
``````

which is the lambda calculus with exceptions, can be used in a fully invertable way.

In conclusion, in one sense `T` is not a useful type at all, but in another sense it is the most useful type of all.

-
Thanks for clarifying my confusion. – Mikhail Glushenkov Dec 4 '12 at 4:47
Unfortunately you're not wrong -- at least, GHC 7.6's inliner can panic on some expressions involving types with negative recursion (this can happen with `data` as well as `newtype`). Positive recursion -- i.e. on the right side of `->` -- should be fine, though. – shachaf Dec 4 '12 at 5:00