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I am trying to learn about complexity analysis and how to perform it from first principles. Take QuickSort as an example, I would like to be able to derive an O-notation expression for the average-case complexity of this algorithm.

I know QuickSort is O(nlog(n)) and I understand why, it has to make a pass over n elements on each iteration, and the recursion depth is log n. But I dont know how you would show this with first principles, ie counting primitive operations.

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This is precisely covered at e.g. Wikipedia: en.wikipedia.org/wiki/Quicksort#Formal_analysis. See also Introduction to Algorithms. –  Oliver Charlesworth May 1 '12 at 15:06
+1 For Cormen reference. –  Judge Dredd May 1 '12 at 15:09
But in relation to deriving the complexity from 'first principles'. Doesn't first principles mean counting primitive operations? –  Jim_CS May 1 '12 at 15:16
@Jim_CS: You don't need to count individual primitive operations. It doesn't matter whether there are 10 or 100 ops per iteration/recursion, so long as that number is constant. The growth is controlled by the number of iterations/recursions. –  Oliver Charlesworth May 1 '12 at 15:21
Rather than closing this question, I think it's worth putting the Wikipedia reference in an answer and voting it up. –  Adrian McCarthy May 1 '12 at 17:01

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Knuth, in The Art of Computer Programming, Volume 3 (Sorting and Searching), section 5.2.2 (Sorting by Exchanges), presents a detailed analysis of a concrete implementation of quicksort (in MIX, of course). He's probably the only person in the world who would care enough to do an analysis of this kind by hand, for human consumption.

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