I was asked this interview question recently:

You're given an array that is almost sorted, in that each of the

`N`

elements may be misplaced by no more than`k`

positions from the correct sorted order. Find a space-and-time efficient algorithm to sort the array.

I have an `O(N log k)`

solution as follows.

Let's denote `arr[0..n)`

to mean the elements of the array from index `0`

(inclusive) to `N`

(exclusive).

- Sort
`arr[0..2k)`

- Now we know that
`arr[0..k)`

are in their final sorted positions... - ...but
`arr[k..2k)`

may still be misplaced by`k`

!

- Now we know that
- Sort
`arr[k..3k)`

- Now we know that
`arr[k..2k)`

are in their final sorted positions... - ...but
`arr[2k..3k)`

may still be misplaced by`k`

- Now we know that
- Sort
`arr[2k..4k)`

- ....
- Until you sort
`arr[ik..N)`

, then you're done!- This final step may be cheaper than the other steps when you have less than
`2k`

elements left

- This final step may be cheaper than the other steps when you have less than

In each step, you sort at most `2k`

elements in `O(k log k)`

, putting at least `k`

elements in their final sorted positions at the end of each step. There are `O(N/k)`

steps, so the overall complexity is `O(N log k)`

.

My questions are:

- Is
`O(N log k)`

optimal? Can this be improved upon? - Can you do this without (partially) re-sorting the same elements?