I have the following in a file:

import Control.Monad
ema a = scanl1 $ \m n -> (1-a)*m + a*n
macd  = ema 9 . uncurry (zipWith (-)) . liftM2 (,) (ema 26) (ema 12)

On compile, I get the following:

:t macd
macd :: [Integer] -> [Integer]


:t ema 9 . uncurry (zipWith (-)) . liftM2 (,) (ema 26) (ema 12)
ema 9 . uncurry (zipWith (-)) . liftM2 (,) (ema 26) (ema 12)
  :: Num a => [a] -> [a]

So, why the difference in the more restricted type for macd?


This is the monomorphism restriction.

The gist is that when you have a constrained type variable, Haskell won't generalize if it's bound to a single identifier

f = term

However if it's a function binding, eg

f a ... = term

Then it is generalized. I've answered this question enough that I wrote up a more complete example in a blog post

As for why we have the monomorphism restriction,

-- let's say comp has the type [Num a => a]
foo = (comp, comp)
  where comp = super_expensive_computation

How many times would comp be computed? If we infer general types automatically it could compute it twice. But this might surprise you if you wrote something like this intending to have the type Num a => (a, a) or similar.

The extra computation occurs because in Core land something like

foo :: Num a => a

turns into something more like

 foo :: NumDict -> a -- NumDict has the appropriate functions for + - etc
                     -- for our a

A function. Since foos general type is (Num a, Num b) => (a, b) unless GHC can prove that the NumDicts that comp is getting in both cases are the same, it can't share the result of comp

  • 3
    As a meta note, there really ought to be a definitive "here's what the monomorphism restriction is" question that we can link to here – jozefg Oct 8 '13 at 17:47
  • I see. Thanks. The easy way to fix this then is ema a xs = scanl1 (\m n -> (1-a)*m + a*n) xs and macd xs = ema 9 . uncurry (zipWith (-)) . liftM2 (,) (ema 26) (ema 12) $ xs – me2 Oct 8 '13 at 18:00
  • 3
    @me2 Yep, or just add type signatures :) Usually that's what I'd recommend. It's helpful for humans and compilers – jozefg Oct 8 '13 at 18:02
  • @me2 Jozefg mentioned that Num a => a gets turned in to NumDict -> a, if you want to know precisely how this is implemented I would suggest this great talk channel9.msdn.com/posts/…. It's very approachable, you don't need much haskell knowledge to follow along, and by the end of it you'll discover how typeclasses are really just pretty syntax for pure data types. – bheklilr Oct 8 '13 at 18:07
  • The dreaded monomorphism restriction. – augustss Oct 8 '13 at 20:42

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