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I'm comparing insertion sort with a quicksort. I've figured out why the qsort is slower on an almost sorted array but I cant figure out why the insersion sort is so much quicker, surely it still has to compare nearly as many elements in the array?

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Provide more info about your insertion sort. Does it have a check to stop iterating once the array is sorted? –  Ivaylo Strandjev Apr 22 '12 at 12:48

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It depends on several factors. Insertion sort will be more efficient that quick sort on small data sets. It also depends on your backing list implementation (LinkedList or ArrayList). Lastly, it also depends on whether there is any kind of ordering to the input data. For example, if your input data is already sorted in the opposite order and you use a LinkedList, the insertion sort will be blazing fast.

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Quicksort has its worst case (O(n^2) time complexity) on already sorted arrays (see quicksort entry on Wikipedia).

Depending on the choice of the pivot element, this can be alleviated somewhat, but at the same time, the best case for insertion sort is exactly the pre-sorted case (it has O(n) time complexity for such inputs), so it is going to beat quicksort for this particular use case.

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The reason that insertion sort is faster on sorted or nearly-sorted arrays is that when it's inserting elements into the sorted portion of the array, it barely has to move any elements at all. For example, if the sorted portion of the array is 1 2 and the next element is 3, it only has to do one comparison -- 2 < 3 -- to determine that it doesn't need to move 3 at all. As a result, insertion sort on an already-sorted array is linear-time, since it only needs to do one comparison per element.

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