I was trying to understand quicksort with median-of-3 partitioning. After finding the median of the first, middle and last element in an array, a common practice is to swap median with the second last element in array(n-1th index). Is there a specific reason we do that?
The reason is that the algorithm does not only find the median, it also sorts the low, middle and high elements. After the three permutations you know that a[middle]<=a[high]. So you need only to partition the elements before high, because a[high] is greater or equal to pivot.
Let's look at an example: low=0, middle=4 and high=8. Your array is like this:
lowerOrEqualToPivot X X X pivot X X X greaterOrEqualToPivot
If you swap middle with high, you need to partition the 8 elements between brackets :
[ lowerOrEqualToPivot X X X greaterOrEqualToPivot X X X ] pivot
If you swap middle with high-1, you need to split only 7 elements:
[ lowerOrEqualToPivot X X X X X X ] pivot greaterOrEqualToPivot
By the way there is a bug in the first line:
int middle = ( low + high ) / 2; //Wrong int middle = ( low + high ) >>> 1; //Correct
The reason is that if (low + high) is greater than Integer.MAX_VALUE you will have an overflow and middle will be a negative number. The second line will always give you a positive result.