# Stability in sorting algorithms

I m very curious, why stability is or is not important in sorting algorithms?

Any ideas?

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For parallelization purposes? eg: merge sort is stable and can be parallelized well and so is quicksort. –  DarthVader Oct 5 '09 at 0:46
Classic QuickSort is unstable –  Konstantin Spirin Oct 5 '09 at 2:00

Background: a "stable" sorting algorithm keeps the items with the same sorting key in order. Suppose we have a list of 5-letter words:

peach straw apple spork

Stable-sorting by the first letter gives us:

apple peach straw spork

In an unstable algorithm, straw or spork may be interchanged, but in stable sort, they stay in the same relative positions (that is, since 'straw' appears before 'spork' in the input, it also appears before 'spork' in the output).

We could sort the list of words using this algorithm: stable sorting by column 5, then 4, then 3, then 2, then 1. In the end, it will be correctly sorted. Convince yourself of that. (by the way, that algorithm is called radix sort)

Now to answer your question, suppose we have a list of first and last names. We are asked to sort "by last name, then by first". We could first stable sort by the first name, then sort by the last name. After these sorts, the list is primarily sorted by the last name. However, where last names are the same, the first names are sorted.

You can't stack unstable sorts in the same fashion.

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Sounds good. Any other reasons ? –  DarthVader Oct 5 '09 at 0:53
So, what would the sort be called to make the words in correct sorting order of apple peach sport straw? The stable sort gave us apple peach straw spork however st should be after sp (alphabetically correct), so the ultimate correct sort should be apple peach sport straw –  user1416486 Jun 24 '12 at 1:43
@user1416486: We're sorting by the first letter only. With that assumption, `straw` and `spork` compare equal. Stable sort will preserve the order of input, whereas unstable sort does not make that guarantee. "Correct" depends on the application. The sort function in most programming languages lets the user supply a custom ordering function. If the user's function treats different items as equal (e.g. same first name, different last name), it helps to know if the original order will be preserved. See OCaml's array sorting functions for a real-world example. –  Joey Adams Jun 24 '12 at 4:40
I do not understand the line ..same sorting key ? What do you mean by key here ? Please explain the statement ..same sorting key –  saplingPro Nov 5 '12 at 12:54
@saplingPro: by "sorting key", I mean the thing you are sorting items by. So when sorting by first letter, then for each item, its "sorting key" is its first letter. –  Joey Adams Oct 18 '13 at 15:30

Stable sort will always return same solution (permutation) on same input.

For instance [2,1,2] will be sorted using stable sort as permutation [2,1,3] (first is index 2, then index 1 then index 3 in sorted output) That mean that output is always shuffled same way. Other non stable, but still correct permutation is [2,3,1].

Quick sort is not stable sort and permutation differences among same elements depends on algorithm for picking pivot. Some implementations pick up at random and that can make quick sort yielding different permutations on same input using same algorithm.

Stable sort algorithm is deterministic where non stable sort is not.

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Could you elaborate? –  piperchester May 22 '13 at 13:03
That's not what stability means. See en.wikipedia.org/wiki/Sorting_algorithm#Stability –  Luís Oliveira Nov 22 '13 at 15:00
I should correct last sentence than non stable sort can output different solution even among same implementation, where any stable sort outputs same solution. –  Luka Rahne Nov 22 '13 at 16:38

Sorting stability means that records with the same key retain their relative order before and after the sort.

So stability matters if, and only if, the problem you're solving requires retention of that relative order.

If you don't need stability, you can use a fast, memory-sipping algorithm from a library, like heapsort or quicksort, and forget about it.

If you need stability, it's more complicated. Stable algorithms have higher big-O CPU and/or memory usage than unstable algorithms. So when you have a large data set, you have to pick between beating up the CPU or the memory. If you're constrained on both CPU and memory, you have a problem. A good compromise stable algorithm is a binary tree sort; the Wikipedia article has a pathetically easy C++ implementation based on the STL.

You can make an unstable algorithm into a stable one by adding the original record number as the last-place key for each record.

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Stable algorithms like Merge Sort have the same O(NlogN) complexity as Quicksort; the constant multiplier on the effort is bigger, though. –  Jonathan Leffler Oct 5 '09 at 2:14
Yes, and memory usage on Merge Sort is O(N), while on Quicksort it's O(log N). The reason I mentioned Quicksort is that qsort() is a C standard library routine, so it's reaily available. –  Bob Murphy Oct 5 '09 at 4:40
reaily -> readily –  Bob Murphy Oct 5 '09 at 4:41
Best overall answer IMHO. the multi-key technique mentioned in others is interesting but overrated; it's simple to apply, but tends to be far slower than obvious alternatives (just use one sort with a multi-key compare; or sort by the first key then identify and sort any sublists with duplicates). The fact that stable sort produces a predictable result can be important in some apps. In particular if you have two input lists A,B which are identical except list B has an extra entry, the outputs for a stable sort will be identical except that B has that same extra entry. And +1 for last pgph. –  greggo Feb 10 '13 at 1:43