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A sorting algorithm is stable if it preserves the relative order of any two elements with equals keys. Under which conditions is quicksort stable?

Quicksort is stable when no item is passed unless it has a smaller key.

What other conditions make it stable?

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nitpick: it's not the order of equal elements that is preserved, but the order of equivalent elements. Canonical example is case-insensitive string comparison: "a" != "A", but neither "A" < "a" nor "a" < "A". –  Marc Mutz - mmutz Apr 27 '11 at 12:33

3 Answers 3

Well, it is quite easy to make a stable quicksort that uses O(N) space rather than the O(log N) that an in-place, unstable implementation uses. Of course, a quicksort that uses O(N) space doesn't have to be stable, but it can be made to be so.

I've read that it is possible to make an in-place quicksort that uses O(log N) memory, but it ends up being significantly slower (and the details of the implementation are kind of beastly).

Of course, you can always just go through the array being sorted and add an extra key that is its place in the original array. Then the quicksort will be stable and you just go through and remove the extra key at the end.

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You may want to look at this post for further discussion?

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You can add these to a list, if that's your approach:

  • When the elements have absolute ordering
  • When the implementation takes O(N) time to note the relative orderings and restores them after the sort
  • When the pivot chosen is ensured to be of a unique key, or the first occurence in the current sublist.
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