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I recently answered a question with an attempt at writing a quicksort function in Scala, I'd seen something like the code below written somewhere.

def qsort(l: List[Int]): List[Int] = {
  l match {
    case Nil         => Nil
    case pivot::tail => qsort(tail.filter(_ < pivot)) ::: pivot :: qsort(tail.filter(_ >= pivot))

My answer received some constructive criticism pointing out that List was a poor choice of collection for quicksort and secondly that the above wasn't tail recursive.

I tried to re-write the above in a tail recursive manner but didn't have much luck. Is it possible to write a tail recursive quicksort? or, if not, how can it be done in a functional style? Also what can be done to maximize the efficiency of the implementation?

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4 Answers 4

up vote 16 down vote accepted

A few years back, I spent some time trying to optimize functional quicksort as far as I could. The following is what I came up with for vanilla List[A]:

def qsort[A : Ordering](ls: List[A]) = {
  import Ordered._

  def sort(ls: List[A])(parent: List[A]): List[A] = {
    if (ls.size <= 1) ls ::: parent else {
      val pivot = ls.head

      val (less, equal, greater) = ls.foldLeft((List[A](), List[A](), List[A]())) {
        case ((less, equal, greater), e) => {
          if (e < pivot)
            (e :: less, equal, greater)
          else if (e == pivot)
            (less, e :: equal, greater)
            (less, equal, e :: greater)

      sort(less)(equal ::: sort(greater)(parent))

I was able to do even better with a custom List structure. This custom structure basically tracked the ideal (or nearly ideal) pivot point for the list. Thus, I could obtain a far better pivot point in constant time, simply by accessing this special list property. In practice, this did quite a bit better than the standard functional approach of choosing the head.

As it is, the above is still pretty snappy. It's "half" tail recursive (you can't do a tail-recursive quicksort without getting really ugly). More importantly, it rebuilds from the tail end first, so that results in substantially fewer intermediate lists than the conventional approach.

It's important to note that this is not the most elegant or most idiomatic way to do quicksort in Scala, it just happens to work very well. You will probably have more success writing merge sort, which is usually a much faster algorithm when implemented in functional languages (not to mention much cleaner).

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Many thanks for the answer, The conclusion that quicksort can be coded tail recursively I think is quite important, if not, I suspect that there could possibly be a category of algorithms which would be off limits in Scala. I'm going to wait a little longer to see if anyone else responds. – Don Mackenzie Jun 3 '10 at 5:36
Out of interest, why do you use an Ordering context bound rather than an Ordered[A] view bound? And related to this, why is the import ord._ necessary? – Ben Lings Jun 3 '10 at 9:50
@Ben Ordering is substantially more flexible than Ordered because it doesn't impose a restriction on the class hierarchy of the object in question. Anything which extends Ordered has a corresponding implicit instance of Ordering, but not vice versa. The import ord._ brings the comparison operators into scope for type A so that I don't have to do something like implicitly[Ordering[A]].gt(e, pivot). – Daniel Spiewak Jun 3 '10 at 14:10
The call graph remark makes a lot of sense. Idiomatically, if your problem is logically polyrecursive (i.e. has more than one recursive or mutually-recursive invocation per call frame), then you should encode it in the most natural way possible. Don't bend over backwards to achieve tail-recursion. It's really good to have, but not worth contorting your code to get. Note that Scala 2.8 includes a trampoline library which can transform naturally-encoded polyrecursive functions into tail-recursive evaluations. – Daniel Spiewak Jun 4 '10 at 2:02
@Daniel just discovered that instead of the import ord, etc, you can do import Ordered._ to allow the operators to be used. – Ben Lings Jun 6 '10 at 16:32

I did some experiments trying to write Quicksort in a purely functional style. Here is what I got (Quicksort.scala):

def quicksort[A <% Ordered[A]](list: List[A]): List[A] = {
  def sort(t: (List[A], A, List[A])): List[A] = t match {
    case (Nil, p, Nil) => List(p)
    case (l, p, g) =>  partitionAndSort(l) ::: (p :: partitionAndSort(g))

  def partition(as: List[A]): (List[A], A, List[A]) = {
    def loop(p: A, as: List[A], l: List[A], g: List[A]): (List[A], A, List[A]) = 
      as match {
        case h :: t => if (h < p) loop(p, t, h :: l, g) else loop(p, t, l, h :: g)
        case Nil => (l, p, g)

    loop(as.head, as.tail, Nil, Nil)

  def partitionAndSort(as: List[A]): List[A] = 
    if (as.isEmpty) Nil
    else sort(partition(as))

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As it happens I tried to solve this exact same problem recently. I wanted to have the classic algorithm (i.e. the one that does in-place sorting) converted to tail recursive form.

If you are still interested you may see my recommended solution here:

Quicksort rewritten in tail-recursive form - An example in Scala

The article also contains the steps I followed to convert the initial implementation to tail recursive form.

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I guess it depends on what do you mean by "idiomatic". The main advantage of quicksort is being a very fast in-place sorting algorithm. So, if you can't sort in-place, you loose all its advantages -- but you're still stuck with it's dis advantages.

So, here's some code I wrote for Rosetta Code on this very subject. It still doesn't sort in-place, but, on the other hand, it sorts any of the new collections:

import scala.collection.TraversableLike
import scala.collection.generic.CanBuildFrom
def quicksort
  [T, CC[X] <: Traversable[X] with TraversableLike[X, CC[X]]]      // My type parameters -- which are expected to be inferred
  (coll: CC[T])                                                    // My explicit parameter -- the one users will actually see
  (implicit ord: Ordering[T], cbf: CanBuildFrom[CC[T], T, CC[T]])  // My implicit parameters -- which will hopefully be implicitly available
  : CC[T] =                                                        // My return type -- which is the very same type of the collection received
  if (coll.isEmpty) {
  } else {
    val (smaller, bigger) = coll.tail partition (, coll.head))
    quicksort(smaller) ++ coll.companion(coll.head) ++ quicksort(bigger)
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It will take me a while to get my head round some of the type parameter defs but I suspect this is an idiomatic approach because the algorithm is very visible in the implementation and your approach is generic too. Perhaps I got provoked into thinking there was an approach which could avoid potential stack overflows without using, for example, trampoline techniques or carrying a large amount of state. – Don Mackenzie Jun 7 '10 at 9:11
+1 for "if you can't sort in-place, you loose all its advantages..." – aitchnyu Mar 27 '12 at 5:45

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