# How do you do an in-place quicksort in Haskell

Could somebody provide an in-place quicksort haskell function? I.e. it returns a new sorted list, but the input list is copied to a mutable array or something.

I want to see how to do this, because I have a performance critical program where i need to simulate races and tally scores. If I use immutable data structures for this, each race will take O(log(numRaces) + numRunners) time, whereas if I use mutable arrays etc, each race will take O(log(numRaces)) time.

oh by the way i didn't actually need to do quicksort, i just wanted an example to see how to use mutable arrays effectively

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Have you seen the vector-algorithms package, hackage.haskell.org/package/vector-algorithms? I don't think it has quicksort, but it does have introsort, mergesort, and other useful sorts. If you really need quicksort, an in-place version would be very similar to an imperative implementation. –  John L Mar 11 '11 at 2:10
I don't see your reasoning here. How exactly will immutable data structures increase the big-Oh complexity? I'm not aware of any sorting algorithm faster than O(n log(n)) in the average case. –  Dan Burton Mar 11 '11 at 5:50
@Dan, indeed, there is provably no such algorithm (as long as you are using only element-element comparison; contrast radix sort) –  luqui Mar 11 '11 at 7:02
here's the answer to another question which seems to fit. –  Will Ness Mar 3 '12 at 22:42

Here's a version, just to prove you can convert code from Wikipedia almost exactly into Haskell ;)

import Data.Array.ST
import Data.Foldable

-- wiki-copied code starts here
partition arr left right pivotIndex = do
swap arr pivotIndex right
storeIndex <- foreachWith [left..right-1] left (\i storeIndex -> do
if (val <= pivotValue)
then do
swap arr i storeIndex
return (storeIndex + 1)
else do
return storeIndex )
swap arr storeIndex right
return storeIndex

qsort arr left right = when (right > left) \$ do
let pivotIndex = left + ((right-left) `div` 2)
newPivot <- partition arr left right pivotIndex

qsort arr left (newPivot - 1)
qsort arr (newPivot + 1) right

-- wrapper to sort a list as an array
sortList xs = runST \$ do
let lastIndex = length xs - 1
arr <- newListArray (0,lastIndex) xs :: ST s (STUArray s Int Int)
qsort arr 0 lastIndex
newXs <- getElems arr
return newXs

-- test example
main = print \$ sortList [212498,127,5981,2749812,74879,126,4,51,2412]

-- helpers
swap arr left right = do
writeArray arr left rightVal
writeArray arr right leftVal

-- foreachWith takes a list, and a value that can be modified by the function, and
-- it returns the modified value after mapping the function over the list.
foreachWith xs v f = foldlM (flip f) v xs
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Whoa...it's so...imperative. :) –  Dan Burton Mar 11 '11 at 5:45