It's generally agreed that the best case for quicksort is O(nlogn), given that the array is partitioned by roughly half each time. It's also said that the worst case is order n^2, assuming that the array is sorted.
Can't we modify quicksort by setting a boolean called swap? For example, if there is no initial swap in position for the first pass, then we can assume that the array is already sorted, therefore do not partition the data any further.
I know that the modified bubble sort uses this by checking for swaps, allowing the best case to be O(n) rather than O(n^2). Can this method be applied to quicksort? Why or why not?