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I was wondering if Haskell keeps track of weather a function is a function composition, i.e would it be possible for me to define a function that does something similar to this?:

compositionSplit f.g = (f,g)
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2  
If you want to keep track of the intermediate functions in a composition, you can use a Thrist. They were invented exactly for this purpose. –  phg May 30 '13 at 10:21

2 Answers 2

up vote 18 down vote accepted

No, it wouldn't be possible.

For example,

f1 = (+ 1) . (+ 1) :: Int -> Int

is the same function as

f2 = subtract 1 . (+ 3) :: Int -> Int

and referential transparency demands that equals can be substituted for equals, so if compositionSplit were possible, it would

  • need to produce the same result for f1 and f2, since that is the same function, yet
  • compositionSplit f1 = ((+ 1), (+1)) and compositionSplit f2 = (subtract 1, (+ 3)) would be required by the specification of compositionSplit.
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Thanks, but I dont understand your statement about refrential transparency –  MYV May 29 '13 at 23:42
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Referential transparency is explained here and on wikipedia for example. It basically means that you can substitute an expression with one with the same meaning without changing the result in this context. Since f1 and f2 are the same function, they can't be distinguished by any function. –  Daniel Fischer May 29 '13 at 23:53
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@Maksim: Referential transparency implies (among other things) that functions behave as mathematical functions. That is, whenever x = y then also f x = f y. Observe that f1 and f2 are equal, therefore compositionSplit f1 should be equal to compositionSplit f2, but it isn't! –  Vitus May 29 '13 at 23:53
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@Vitus depends on how you define equality for functions. (\x.x+2) and (\x.x+1+1) are only extensionally equal functions. In a language with intensional equality we could distinguish between the two. (just carry around the source code, and simplification/compilation steps, together with the compiled function object in memory -- "provenance"). –  Will Ness May 30 '13 at 8:13
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I perhaps put my point best when I said you want (.) and id to be a monoid, i.e. f.(g.h) = (f.g).h and id.f = f. You can't have referential transparency, this monoid and a decomposition operator. If you don't have this, you're not doing pure functional programming. It's not impossible, it's just not f.p.. –  AndrewC May 30 '13 at 17:18

It could. In strictly interpretational non-compiled implementation, you could represent functions as

data Function = F Source | Compo Function Function

and then you'd just define

compositionSplit (Compo f g) = Just (f,g)
compositionSplit _  = Nothing

Such implementation would treat function equality (w.r.t. referential transparency) as intensional, not extensional equality. As the language itself doesn't say anything about equality of functions AFAIK, this shouldn't affect anything (except maybe performance).

In compiled implementations this could be achieved too, e.g. by maintaining provenance for every object in memory.


AndrewC gives a winning counter-argument: for the two values a=f.(g.h) and b=(f.g).h, if we want to consider them as equal values - which we normally do, in Haskell - fst.unJust.deCompo will produce two different results, breaking referential transparency. So it can't be part of pure FP paradigm. It'd have to return something which we could legitimately consider as being equal values too, in the two cases, and we wouldn't be able to take it apart, without breaking the purity. Maybe such a thing could exist in some impure monad, but that's not what OP asked for, sadly. :) So this answer is in error.

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Thanks. what does "Source" refer to in the above data declaration? When I type in the data declaration you provided, the computer tells me Source is undeclared. –  MYV May 30 '13 at 20:55
    
@Maksim no, it was all hypothetical, an imagined interpreter that you would have to write for yourself to achieve that. And it turned out to be an impure feature. Disregard please. :) –  Will Ness May 31 '13 at 5:10

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