# Quicksort : Iterative or Recursive

I learnt about quick sort and how it can be implemented in both Recursive and Iterative method.
In Iterative method :

1. Push the range (0...n) into the stack
2. Partition the given array with a pivot
3. Pop the top element.
4. Push the partitions ( index range ) into a stack if the range has more than one element
5. Do the above 3 steps, till the stack is empty

And the recursive version is the normal one defined in wiki.

I learnt that recursive algorithms are always slower than their Iterative counterpart.
So, Which is method is preferred in terms of time complexity ( memory is not a concern )?
Which one is fast enough to use in Programming contest?
Is c++ STL sort() uses recursive approach?

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you have already answered yourself. Recursive version is shorter and more clear. Iterative is faster and makes you simulate the recursion call stack. –  Vitalij Zadneprovskij Sep 23 '12 at 14:44
But my prof told that the recursion stack depth is same as stack which we use for storing partition range. So, how iterative one is significantly faster? –  sabari Sep 23 '12 at 14:46
@sabari: Your assumption about recursive being faster is wrong. I statistically tested these assumptions and editted the answer with the results. –  amit Sep 24 '12 at 8:06

In terms of (asymptotic) time complexity - they are both the same.

"Recursive is slower then iterative" - the rational behind this statement is because of the overhead of the recursive stack (saving and restoring the environment between calls).
However -these are constant number of ops, while not changing the number of "iterations".

Both recursive and iterative quicksort are `O(nlogn)` average case and `O(n^2)` worst case.

EDIT:

just for the fun of it I ran a benchmark with the (java) code attahced to the post , and then I ran wilcoxon statistic test, to check what is the probability that the running times are indeed distinct

The results are conclusive (P_VALUE=2.6e-34, that means that the probability they are the same is 2.6*10^-34 - very not probable). But the answer is not what you expected.
The average of the iterative solution was 408.86 ms while of recursive was 236.81 ms

(Note - I used `Integer` and not `int` as argument to `recursiveQsort()` - otherwise the recursive would have achieved much better, because it doesn't have to box a lot of integers, which is also time consuming - I did it because the iterative solution has no choice but doing so.

Thus - your assumption is not true, the recursive solution is faster (for my machine and java for the very least) then the iterative one with P_VALUE=2.6e-34.

``````public static void recursvieQsort(int[] arr,Integer start, Integer end) {
if (end - start < 2) return; //stop clause
int p = start + ((end-start)/2);
p = partition(arr,p,start,end);
recursvieQsort(arr, start, p);
recursvieQsort(arr, p+1, end);

}

public static void iterativeQsort(int[] arr) {
Stack<Integer> stack = new Stack<Integer>();
stack.push(0);
stack.push(arr.length);
while (!stack.isEmpty()) {
int end = stack.pop();
int start = stack.pop();
if (end - start < 2) continue;
int p = start + ((end-start)/2);
p = partition(arr,p,start,end);

stack.push(p+1);
stack.push(end);

stack.push(start);
stack.push(p);

}
}

private static int partition(int[] arr, int p, int start, int end) {
int l = start;
int h = end - 2;
int piv = arr[p];
swap(arr,p,end-1);

while (l < h) {
if (arr[l] < piv) {
l++;
} else if (arr[h] >= piv) {
h--;
} else {
swap(arr,l,h);
}
}
int idx = h;
if (arr[h] < piv) idx++;
swap(arr,end-1,idx);
return idx;
}
private static void swap(int[] arr, int i, int j) {
int temp = arr[i];
arr[i] = arr[j];
arr[j] = temp;
}

public static void main(String... args) throws Exception {
Random r = new Random(1);
int SIZE = 1000000;
int N = 100;
int[] arr = new int[SIZE];
int[] millisRecursive = new int[N];
int[] millisIterative = new int[N];
for (int t = 0; t < N; t++) {
for (int i = 0; i < SIZE; i++) {
arr[i] = r.nextInt(SIZE);
}
int[] tempArr = Arrays.copyOf(arr, arr.length);

long start = System.currentTimeMillis();
iterativeQsort(tempArr);
millisIterative[t] = (int)(System.currentTimeMillis()-start);

tempArr = Arrays.copyOf(arr, arr.length);

start = System.currentTimeMillis();
recursvieQsort(tempArr,0,arr.length);
millisRecursive[t] = (int)(System.currentTimeMillis()-start);
}
int sum = 0;
for (int x : millisRecursive) {
System.out.println(x);
sum += x;
}
System.out.println("end of recursive. AVG = " + ((double)sum)/millisRecursive.length);
sum = 0;
for (int x : millisIterative) {
System.out.println(x);
sum += x;
}
System.out.println("end of iterative. AVG = " + ((double)sum)/millisIterative.length);
}
``````
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Your test mainly is showing how efficient the Stack class is working, not how efficient the iterative version of quicksort is. You can use more a static, self written stack of for example 64 elements and the push and pop operations will be much faster. I guess that will be faster than the recursive one! And if you implement it the right way, you can sort 2^64 elements in the worst case, which is simply enough in practical applications. –  Argeman Sep 24 '12 at 8:23
@Argeman: Thanks for your comment. This is actually the point of the benchmark - the stack solution is very dependent on the stack implementation while the call stack is pretty much optimized for its purpose already, and thus a recursive solution is not likely to be worse then an iterative one, unless you spend a lot of time optimizing the stack for specific purpose (and I doubt the difference will be significant enough to worth the time). As I said, it is just a "fun test" - the main idea behind the answer yet remains - the asymptotic time complexity is the same. –  amit Sep 24 '12 at 8:27
P.S. The broken printing format (and not using `Arrays.toString()`) is to fit the input expected by the wilcoxon online calculator in fon.hum.uva.nl/Service/Statistics/Wilcoxon_Test.html –  amit Sep 24 '12 at 8:32
@amit how did u run the "Wilcoxon signed-rank test"...Any tool that u have used ? –  Geek Sep 26 '12 at 8:20
@Geek: I put the on-line tool I used as a comment (The one starting with P.S). PythonXY also has it implemented as scipy.stats.wilcoxon –  amit Sep 26 '12 at 8:45