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I am trying to experiment with System-F types in Haskell and have implemented Church encoding of natural numbers via type.

When loading this code

{-# OPTIONS_GHC -Wall #-}
{-# LANGUAGE RankNTypes #-}

type CNat = forall t . (t -> t) -> (t -> t)

c0 :: CNat
c0 _ x = x

type CPair a b = forall t . (a -> b -> t) -> t

cpair :: a -> b -> CPair a b
cpair a b f = f a b

-- pair3 :: CPair CNat String
pair3 = cpair c0 "hello"

into ghci 7.8.2 I get a warning:

λ: :l test.hs 
[1 of 1] Compiling Main             ( test.hs, interpreted )

test.hs:29:1: Warning:
    Top-level binding with no type signature:
      pair3 :: forall t t1.
               (((t1 -> t1) -> t1 -> t1) -> [Char] -> t) -> t
Ok, modules loaded: Main.
λ: 

The question is, shouldn't the type be

pair3 :: forall t.
      ((forall t1. (t1 -> t1) -> t1 -> t1) -> [Char] -> t) -> t

?

UPD: A simpler example is provided

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2 Answers 2

up vote 4 down vote accepted

But is there any way to specify my type for it so that when I specify it explicitly (uncomment the line in my code), the compiler would not infer it but just check the provided type? Now I am getting error

If you want to instantiate the type variables a,b occurring in the type of cpair, you can add the following explicit annotation.

pair3 :: CPair CNat String
pair3 = (cpair :: CNat -> String -> CPair CNat String) c0 "hello"

Without that, cpair is only instantiated at monomorphic types, I believe.

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That's a perfectly good type for it... but it's not the type Hindley-Milner gives it. HM always infers a rank-1 type. Inferring rank-2 types is actually decidable, I believe, but GHC doesn't even try.

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Ah, I see. Thank you. But is there any way to specify my type for it so that when I specify it explicitly (uncomment the line in my code), the compiler would not infer it but just check the provided type? Now I am getting error. –  amakarov May 8 at 5:00
    
According to the article "Introduction to type theory" by Herman Geuvers, p.37-38, the Type Checking Problem for System F à la Curry is equivalent to Type assignment problem (and is undecidable). Probably that is why there is not point in specifying the desired type -- haskell would not be able to check it either. –  amakarov May 14 at 14:38
    
Instead, as chi suggested, I should specify the type of subexpression and cound on Hindley-Miller to infer the type of the whole expression. –  amakarov May 14 at 14:41
    
See also: ImpredicativeTypes –  amakarov May 15 at 4:05

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