14

The Haskell definition says:

An expression is in weak head normal form (WHNF), if it is either:

  • a constructor (eventually applied to arguments) like True, Just (square 42) or (:) 1
  • a built-in function applied to too few arguments (perhaps none) like (+) 2 or sqrt.
  • or a lambda abstraction \x -> expression.

Why do built-in functions receive special treatment? According to lambda calculus, there is no difference between a partially applied function and any other function, because at the end we have only one argument functions.

  • 1
    I took the liberty to edit that Haskell wiki page with an explanation of why this distinction between built-ins and lambdas doesn't matter to semantics. (And also a note about a subtlety with strict constructor fields.) – Ørjan Johansen Jun 28 '14 at 1:37
  • 1
    BTW that wiki page is not actually part of Haskell's official definition. However the official report doesn't even mention the issue, seemingly preferring to assume readers know denotational semantics... – Ørjan Johansen Jun 28 '14 at 1:40
22

A normal function applied to an argument, like the following:

(\x y -> x + 1 : y) 1

Can be reduced, to give:

\y -> 1 + 1 : y

In the first expression, the "outermost" thing was an application, so it was not in WHNF. In the second, the outermost thing is a lambda abstraction, so it is in WHNF (even though we could do more reductions inside the function body).

Now lets consider the application of a built-in (primitive) function:

(+) 1

Because this is a built-in, there's no function body in which we can substitute 1 for the first parameter. The evaluator "just knows" how to evaluate fully "saturated" applications of (+), like (+) 1 2. But there's nothing that can be done with a partially applied built-in; all we can do is produce a data structure describing "apply (+) to 1 and wait for one more argument", but that's exactly what the thing we're trying to reduce is. So we do nothing.

Built-ins are special because they're not defined by lambda calculus expressions, so the reduction process can't "see inside" their definition. Thus, unlike normal functions applications, built-in function applications have to be "reduced" by just accumulating arguments until they are fully "saturated" (in which case reduction to WHNF is by running whatever the magic implementation of the built-in is). Unsaturated built-in applications cannot be reduced any further, and so are already in WHNF.

  • +1, but who's Norman? – molbdnilo Jun 27 '14 at 9:11
  • @molbdnilo Norman Ramsey? :) – Will Ness Jun 27 '14 at 9:55
  • 1
    Does the runtime system actually reduce partially applied user-defined functions? Certainly we expect (\x->if x==1 then function1 else function2) k to be reduced, but it seems to me that a peculiar representation would be needed to actually reduce (\x y -> x + x*y + x^y) k. – dfeuer Jun 27 '14 at 18:54
  • 1
    @dfeuer Although you certainly can write a runtime system which would reduce partially applied functions like this. I implemented a toy lazy functional language by straightforward graph reduction that did this; it's easier because you then don't have to know or care when a function has all its arguments; partial application is the same as final application (except for built-ins). The trick is that you don't use textual terms, but graphs. So although we would write the reduction of your example as \y -> k + k*y + k^y, in the actual system each k is actually a reference to a single node. – Ben Jun 28 '14 at 2:10
  • 1
    @dfeuer Oh right, when it's not that would be JIT compiling. Could still be possible though. I think GHC actually has a small amount of runtime code generation whenever you use the FFI to export closures (because C function pointers for them cannot be constructed on the fly without it), but nothing like that. – Ørjan Johansen Jun 28 '14 at 5:09
3

Consider

Prelude> let f n = [(+x) | x <- [1..]] !! n
Prelude> let g = f 20000000 :: Int -> Int

g is at this point not in WHNF! You can see this by evaluating, say, g 3, which takes a noticable lag because you need WHNF before you can apply an argument. That's when the list is traversed in search for the right built-in function. But afterwards, this choice is then fixed, g is WHNF (and indeed NF: that's the same for lambdas, perhaps what you meant with your question) and thus any subsequent calls will give a result immediately.

  • why after first run g 3 a f 20000000 is not memorized? I mean why two subsequent calls for g 3 takes the same, noticeable time? – Robert Zaremba Jun 27 '14 at 10:34
  • Well, they don't. It is memoised, at least in all ghcis I have installed (7.4, 7.6, 7.8). Since MonomorphismRestriction is off by default, this requires the explicit monomorphic signature, maybe you forgot that? (A polymorphic function has one hidden extra argument.) – leftaroundabout Jun 27 '14 at 11:11
  • Since GHC 7.8.1, the monomorphism restriction is switched off by default in GHCi. Is there any way to enable it? What do you mean about extra argument for a polymorphic function? – Robert Zaremba Jun 29 '14 at 22:02
  • 1
    @RobertZaremba: you can switch it on by setting the -XMonomorphismRestriction flag... but don't, it's evil; you can always achieve the same goal with explicit signatures (like Int -> Int in my example); this is much more transparent. — Haskell polymorphism is parametric polymorphism, which means if a function's signature has some type variable in it (here we have f :: (Num a, Enum a) => Int -> a->a) then the properties of this type (i.e. how it can be used as a number) need to be passed to the function as a "dictionary argument". That's why memoisation doesn't always work as expected. – leftaroundabout Jun 29 '14 at 23:41

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.