Will a value that has a type with class constraints actually be a function at run time?

Consider the famous

``````fibs = 0 : 1 : zipWith (+) fibs (tail fibs)
``````

Suppose that, to avoid the monomorphism restriction, this is annotated with:

``````fibs :: Num a => [a]
``````

This seems to imply that at runtime, a list value `fibs` does not really exist, but rather a function that computes the list anew each time an element of `fibs` is picked?

The question is how such cases are actually handled in different Haskell implementations you know of.

--- ADDED ---- I feel that I must elaborate a bit more. Consider:

``````fibsInteger :: [Integer]
fibsInteger = 0: 1: zipWith (+) fibsInteger (tail fibsInteger)
``````

and suppose during program execution the value

``````(fibsInteger !! 42)
``````

needs to be evaluated. In that case I would expect that subsequent evaluations like that would find that the first 43 elements of `fibsInteger` are already evaluated. This implies also that `fibsInteger` itself and the first 42 tails of it are already in WHNF.

Yet that would not be possible with a polymorphic `fibs`, as far as I can see. FUZxxl's remark

because a typeclass usually introduces a new argument containing a dictionary with the functions of that typeclass

seems to support my view that a value like `fibs` effectively appears as function at runtime?

If this were so, then an application like `((maximum . map (fibs!!)) [100000 .. 101000] :: Integer)` shold take noticeably longer to evaluate than the non-polymorphic variant `((maximum . map (fibsInteger!!)) [100000 .. 101000] :: Integer)` because the first 100000 numbers will have to be recomputed each time. (Unfortunately, I can't try this out at this time)

-
I'm sure someone will come along with a detailed explanation, but the term you want to google here is "thunk". –  MatrixFrog Oct 5 '11 at 10:28
@MatrixFrog - unfortunately no, that wouldn't help much - that thunks are used in implementations of non-strict languages is not really news to me. The point is that when we restrict `fibs :: [Integer]` thunks in the list can be actually updated when, for example `(fibs !! 42)` is evaluated. And my question is, if and how this can be done when `fibs` is polymorphic. –  Ingo Oct 5 '11 at 11:06
"Thanks to overloaded numeric literals, this has type `fibs :: Num a => [a]`". Actually thanks to the monomorphism restriction and type defaulting, it will have type `[Integer]`. –  sepp2k Oct 5 '11 at 12:05
@sepp2k - yes that's correct. But suppose the type annotation is given explicitely. I'll edit the question accordingly. –  Ingo Oct 5 '11 at 12:33
The tail matches the return of fibs, thus sharing will occur and you get you O(n) behavior. –  FUZxxl Oct 5 '11 at 13:22
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It depends on the implementation. In GHC, type classes are implemented using dictionaries. Let's say the `Num` class was defined like this (simplified for this example):

``````class Num a where
fromInteger :: Integer -> a
(+) :: a -> a -> a
``````

Then it will be compiled as a "dictionary" data type:

``````data Num a = Num { fromInteger :: Integer -> a, plus :: a -> a -> a }
``````

Anything with a `Num` constraint will get an extra argument for the dictionary, so for example `foo x = x + 1` will become:

``````foo :: Num a -> a -> a
foo num x = plus num x (fromInteger num 1)
``````

So let's see how GHC compiles `fibs`, shall we?

``````\$ cat Fibs.hs
module Fibs where
fibs :: Num a => [a]
fibs = 0 : 1 : zipWith (+) fibs (tail fibs)
\$ ghc -c Fibs.hs -ddump-simpl

==================== Tidy Core ====================
Rec {
Fibs.fibs [Occ=LoopBreaker]
:: forall a_abu. GHC.Num.Num a_abu => [a_abu]
[GblId, Arity=1]
Fibs.fibs =
\ (@ a_akv) (\$dNum_akw :: GHC.Num.Num a_akv) ->
GHC.Types.:
@ a_akv
(GHC.Num.fromInteger
@ a_akv \$dNum_akw (GHC.Integer.smallInteger 0))
(GHC.Types.:
@ a_akv
(GHC.Num.fromInteger
@ a_akv \$dNum_akw (GHC.Integer.smallInteger 1))
(GHC.List.zipWith
@ a_akv
@ a_akv
@ a_akv
(GHC.Num.+ @ a_akv \$dNum_akw)
(Fibs.fibs @ a_akv \$dNum_akw)
(GHC.List.tail @ a_akv (Fibs.fibs @ a_akv \$dNum_akw))))
end Rec }
``````

If you squint a little, this is essentially

``````fibs :: Num a -> [a]
fibs num = fromInteger num 0
: fromInteger num 1
: zipWith (plus num) (fibs num) (tail (fibs num))
``````

So for GHC, the answer is yes. As you suspected, this can have drastic implications on performance, as this destroys the sharing of `fibs` that this definition relies on, to the point where you get exponential runtime instead of linear1.

``````Prelude Fibs> :set +s
Prelude Fibs> fibs !! 30
832040
(3.78 secs, 912789096 bytes)
``````

We can fix this problem by introducing sharing ourselves:

``````module SharedFibs where
fibs :: Num a => [a]
fibs = let f = 0 : 1 : zipWith (+) f (tail f) in f
``````

This is much better.

``````Prelude SharedFibs> :set +s
Prelude SharedFibs> fibs !! 30
832040
(0.06 secs, 18432472 bytes)
Prelude SharedFibs> fibs !! 100000
<huge number>
(2.19 secs, 688490584 bytes)
``````

But it still has the same problem that `fibs` is not shared between separate calls. If you want this, you will have to specialize `fibs` to your desired number type in a `let` or `where`.

These sort of performance surprises is part of the reason why the dreaded monomorphism restriction exists.

1 Ignoring the fact that `Integer` addition is not constant time.

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Thanks, and +1 + accepted. –  Ingo Oct 5 '11 at 15:28

Polymorphism can bring an additional performance burden (which I think is the question you are asking). In Thomas' answer to this question, making the type non-polymorphic reduced runtime from 36 to 11 seconds.

This seems to imply that at runtime, a list value fibs does not really exist, but rather a function that computes the list anew each time an element of fibs is picked?

I'm not really sure what you mean here - you seem to be aware that it's lazy. You might be asking if Haskell considers this a "function declaration" or a "value declaration" - you can try using Template Haskell:

``````> runQ [d| fib = 0 : 1 : zipWith (+) fib (tail fib) |]
[ValD (VarP fib) ...
``````

So it is a value declaration (ValD).

-

First of all, the list is infinite, thus it's impossible to generate the whole list before the program runs. As MatrixFrog already pointed out, `fibs` is a thunk. You can roughly imagine a thunk as a function that takes no argument and returns a value. The only difference is, that the pointer to the function is replaced by a pointer to the result afterwards, causing the result to be cached. This happens only in case of funcions that are not depending on any typeclass, because a typeclass usually introduces a new argument containing a dictionary with the functions of that typeclass (This process is sometimes called reification).

A long time I posted an answer to this codegolf.SE question containing an own implementation of thunks in C. The code is not very good, the list stuff is not separated very well from the thunk itself, but it's worth having a look.

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This seems to indirectly support my view, see edited question. –  Ingo Oct 5 '11 at 11:30
A function always involves the `(->)` type constructor, so it is not a function. It's a value. Functions are also values, but values are not functions, and that has nothing to do with laziness. The key property of a function is that you can apply it. Application has the type:
``````(a -> b) -> a -> b