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I am learning haskell and the function definition I see is:

quickSort (x : xs) = (quickSort less) ++ (x : equal) ++ (quickSort more)
                 where less = filter (< x) xs
                       equal = filter (== x) xs
                       more = filter (> x) xs

Is it possible to write it with only one traversal of the list, instead of 3?

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Quicksort has a O(n lg n) complexity on average... –  Etienne de Martel Oct 3 '11 at 23:56
1  
The complexity is about the number of comparisons made and the above version will have 3 times more comparisons than the one that partitions the list by traversing through it once. –  Salil Oct 4 '11 at 2:43
    
why does it matter how many times it traverses the list? the complexity is the same –  newacct Oct 4 '11 at 3:57
1  
@newacct, it is not merely traversing the list; it is comparing every element while traversing; that is why. –  Salil Oct 4 '11 at 4:03
1  
@ivanm, Yes the complexity is the same, and it is O(n log n) on average. But it is O(n^2), worst case. However the question is legitimate regardless of this fact, and implementations of algorithms are usually measured by the size of the constant factor. –  HaskellElephant Oct 4 '11 at 6:34

3 Answers 3

up vote 6 down vote accepted

Although late, here's a version that's supposed to not leak space as much (and seems to run about twice faster than the other 3-way version here):

qsort3 xs = go xs [] 
  where
    go     (x:xs) zs       = part x xs zs [] [] []
    go     []     zs       = zs
    part x []     zs a b c = go a ((x : b) ++ go c zs)
    part x (y:ys) zs a b c =
        case compare y x of
                  LT -> part x ys zs (y:a) b c
                  EQ -> part x ys zs a (y:b) c
                  GT -> part x ys zs a b (y:c)

This addresses the possible problem with using tuples, where let (a,b) = ... is actually translated into let t= ...; a=fst t; b=snd t which leads to the situation where even after a has been consumed and processed, it is still kept around alive, as part of the tuple t, for b to be read from it - though of course completely unnecessary. This is known as "Wadler pair space leak" problem. Or maybe GHC (with -O2) is smarter than that. :)

Also this apparently uses difference lists approach (thanks, hammar) which also makes it a bit more efficient (about twice faster than the version using tuples). I think part uses accumulator parameters, as it builds them in reversed order.

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You mean something like this?

quicksort [] = []
quicksort (x:xs) = quicksort less ++ (x : equal) ++ quicksort more
  where (less, equal, more) = partition3 x xs

partition3 _ [] = ([], [], [])
partition3 x (y:ys) =
  case compare y x of
    LT -> (y:less, equal, more)
    EQ -> (less, y:equal, more)
    GT -> (less, equal, y:more)
  where (less, equal, more) = partition3 x ys

Note that this isn't really quicksort, as the real quicksort is in-place.

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That was neat. The original algorithm I referred to also does not do in-place quicksort. I am assuming that in-place means mutable version where the list is modified in-place. –  Salil Oct 4 '11 at 2:34
    
isn't this the "Wadler pair" problem that's supposed to leak space? (I've posted another version that's supposed to not have this problem, done according to his technique IIRC). –  Will Ness Mar 3 '12 at 22:31
    
@WillNess: Your version is certainly more efficient, especially since it's using difference lists instead of (++) for appending. Mine might allocate a bit more since it's using tuples, but I don't think it should leak space. I'm not familiar with the "Wadler pair" problem, though. Do you have a link? Google didn't seem to know about it either. –  hammar Mar 3 '12 at 23:04
    
google "Wadler pair space leak" basically it's about let (a,b)=span ... kind of thing, being translated into let p=span ...; a=fst$p; b=snd$p which leads to p being kept for b even when a is consumed already. Pairs... :) (I mean, tuples ... IIRC this is exactly what this "leak" stuff was meant to be about). –  Will Ness Mar 4 '12 at 0:09
1  
btw I think your version is true idiomatic Haskell solution; too bad a compiler can't do that transformation automatically that I had to code by hand. We naturally express parallel "assignment" with tuples of vars; it's Haskell's fault for not having an explicit concept and forcing us to use a kludge, and then punishing us for it... –  Will Ness Mar 5 '12 at 0:10

It does not seem to improve anything but:

qs (x:xs) = let (a,b) = partition (< x) xs in (qs a) ++ [x] ++ (qs b)
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That was great. Why do you think it is not improving anything? It is traversing the list only once. So, the comparisons are much lesser. –  Salil Oct 4 '11 at 1:57
    
@qq191: this definition assumes there are no repeated values, which is why the original has three filters! –  ivanm Oct 4 '11 at 5:37
    
@ivanm What do you mean it "assumes"? It will still work. –  Jonas Duregård Oct 4 '11 at 5:50
    
@JonasDuregård: wait, you're right; they go into the b partition. –  ivanm Oct 4 '11 at 10:23

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