Counting inversions in an array
This is an phone interview question: "Find the number of inversions in an array". I guess they mean O(N*log N) solution. I believe it cannot be better than O(N*log N) since this is the sorting complexity.
The answers to a similar question can be summarized as follows:
- Calculate half the distance the elements should be moved to sort the array : copy the array and sort the copy. For each element of the original array
a[i]find it's position
jin the sorted copy (binary search) and sum the halves the distances
abs(i - j)/2.
merge sort: modify
mergeto count inversions between two sorted arrays and run regular
merge sortwith that modified
Does it make sense ? Are there other (maybe simpler) solutions ? Isn't it too hard for a phone interview ?