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I am trying to print church numerals in haskell using the definions:

0 := λfx.x
1 := λfx.f x

Haskell code:

c0 = \f x -> x
c1 = \f x -> f x

When I enter it in the haskell console I get an error which says

    test> c1

    No instance for (Show ((t -> t1) -> t -> t1))
      arising from a use of `print' at <interactive>:1:0-1
    Possible fix:
      add an instance declaration for (Show ((t -> t1) -> t -> t1))
    In a stmt of an interactive GHCi command: print it

I am not able to exactly figure out what error says.

Thank you!

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2 Answers 2

The problem here is that, by default, it's not possible to print values in Haskell. The default way to print things--used by the print function and by the GHCi REPL, among others--is the show function, defined by the type class Show.

The error you're getting, then, is informing you that you've evaluated an expression of a type that doesn't have an instance of Show defined. Modulo some verbiage, this is all the error message is saying:

No instance for (Show ((t -> t1) -> t -> t1))

The type ((t -> t1) -> t -> t1) is what was inferred for the expression you evaluated. This is a valid type for the Church numeral 1, though the "correct" type for a Church numeral should actually be (a -> a) -> a -> a.

  arising from a use of `print' at <interactive>:1:0-1

It's implicitly using the print function to display the values. Normally this would tell you where in your program the error was found, but in this case it says <interactive>:1:0-1 because the error was caused by an expression in the REPL.

Possible fix:
  add an instance declaration for (Show ((t -> t1) -> t -> t1))

This is just suggesting that you could fix the error by defining the instance it was expecting.

Now, you probably want to actually print your Church numerals, not just know why you can't. Unfortunately, this isn't as simple as adding the instance it asked for: If you write an instance for (a -> a) -> a -> a, Haskell interprets this as an instance for any specific a, whereas the correct interpretation of a Church numeral is a polymorphic function that works on any arbitrary a.

In other words, you want your show function to be something like this:

showChurch n = show $ n (+1) 0

If you really want to, you may implement the Show instance like this:

instance (Show a, Num a) => Show ((a -> a) -> a -> a) where
    show n = show $ n (+1) 0

and add {-#LANGUAGE FlexibleInstances#-} to the first line of the file. Or you may implement something similar to convert them to a regular number

> churchToInt c1
> showChurch c1


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thanks for the detailed dissection of the error message. It makes more sense to me now. I'm trying to get better in understanding the errors thrown out :) – Bharat Jun 24 '11 at 14:36
@RBK: You're welcome. :] GHC's error messages are usually pretty straightforward and helpful once you know the basic structure/jargon used, but I'm not aware of any self-contained guide to learning that. I mostly figured it out on my own, with some help from people on IRC and whatnot. – C. A. McCann Jun 24 '11 at 14:56

EDIT: Spoiler Alert, as mentioned in the comment

Or, you could have a type for Church numerals, something like this:

data Church x = Church ((x -> x) -> x -> x)

zero :: Church x
zero = Church (\f x -> x)

-- Hack to not clash with the standard succ
succ_ :: Church x -> Church x
succ_ (Church n) = Church (\f x -> (f (n f x)))

instance (Num x) => Show (Church x) where
  show (Church f) = show $ f (1 +) 0
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Warning: If you were trying to figure out how to implement Church numerals on your own, don't read this answer! It gives it all away! – MatrixFrog Jun 24 '11 at 7:39
This is still less than ideal, unfortunately--it works fine for simple expressions, but in more complicated uses the type variable x can unify with things you didn't intend. What you really want is data Church = Church (forall x. (x -> x) -> x -> x). – C. A. McCann Jun 24 '11 at 13:36
I was thinking on those lines, but decided against it since I don't understand Rank 2 types very well myself. – SCombinator Jun 24 '11 at 14:32
Thanks all. I need to do more reading on the topic of typeclasses. Will use SCombinator's solution as a reference and try to do it on my own. – Bharat Jun 24 '11 at 14:39
If it helps, you can read forall a. (...) as the capital-lambda-abstractions of System F, i.e. we can define succ as something like λn:(Λa. (a → a) → a → a). Λa. λf:(a → a). λx:a. f (n a f x)). If you're more comfortable with λ-calculus than fancy type systems, that might be easier to understand. – C. A. McCann Jun 24 '11 at 14:48

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