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I'm new to Haskell and would like to know whether it's possible to define a function that is only defined on a subset of an already existing type, without actually having to define a new type.

Example: I want to create a function that only accepts even integers (or even natural numbers, etc.) and returns, e.g. that number squared, like:

squared :: 2*Integer -> Integer
squared n = n*n

The above two lines do not work, of course.

I know I could write it like this:

squared' :: Integer -> Integer
squared' n 
  | (even n) = n*n
  | otherwise = error "n is not even!"

or something similar, but I want to know whether something like the non-working example is possible, as well.

I hope this question is not completely stupid (or was already answered) but I really don't know a lot of Haskell yet (so searching for an answer was kind of difficult as well)...

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it is not easy in Haskell – viorior Nov 1 '13 at 15:39
up vote 10 down vote accepted

In general no. Such a thing is called a subset type, it's a hallmark of dependent types which Haskell doesn't have. Usually it's implemented by boxing a value with a proof that the value satisfies some property, but since we have no notion of proofs in Haskell, we're stuck.

Usually the way to fake it is with "smart constructors".

newtype Even = Even {unEven :: Integer} deriving (Eq, Show, Ord)

toEven :: Integer -> Maybe Even
toEven a | even a = Just $ Even a
         | otherwise = Nothing

And then hide the Even constructor.

If you really really want it, you can switch to a language that can interop with Haskell that has dependent types (Coq and Agda spring to mind).

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Hooray for dependent types! If the concept of dependent types is a little confusing, check out this video: It provides a nice example of using the dependent types to provide extra information such as length of lists etc. all at type level. – Tetigi Nov 1 '13 at 17:41

No. The type system would need to support refinement types (or full dependent types, as suggested by @jozefg).

Here is a Haskell extension with refinement types.

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Wrap the subset in a newtype

newtype EvenInteger = EvenInteger {
    unEvenInteger :: Integer
} deriving (Show, Eq, Ord, Num)

mkEvenInteger :: Integer -> Maybe EvenInteger
mkEvenInteger n = case n % 2 of
    0 -> Just $ EvenInteger n
    _ -> Nothing

squared :: EvenInteger -> EvenInteger
squared n = n * n
share|improve this answer
This doesn't work, 1 :: EvenInteger injects 1 into the realm of even numbers – jozefg Nov 1 '13 at 17:51
Erg... you're right. If one is willing to deal with syntactic ugliness, this solution could work without deriving Num. This would be one case where I'd say the cure is worse than the disease though :( – Thomas Eding Nov 4 '13 at 3:34

One possibility would be

newtype Even n = Even n
getEven (Even n) = 2*n

squared :: Num n => Even n -> Even n
squared (Even n) = Even (2*n*n)
share|improve this answer

As mentioned elsewhere, refinement types like in LiquidHaskell can express this. Here's what it looks like:

module Evens where

{-@ type Even = {v:Int | v mod 2 = 0} @-}

{-@ square :: Even -> Int @-}
square :: Int -> Int
square n = n * n

-- calling the function:
yup = square 4
-- nope = square 3 -- will not compile if this is uncommented

You can try this out by plugging it in here:

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