Counting sort is kind of a bucket sort. Let's assume we're using it like this:

- Let
`A`

be the array to sort - Let
`k`

be the max element - Let
`bucket[]`

be an array of buckets - Let each bucket be a linked list (with a start and end pointer)

Then in pseudocode, counting sort looks like this:

```
Counting-Sort (A[], bucket[], k)
1. Init bucket[]
2. for i -> 1 to n
3. add A[i] to bucket[A[i].key].end
4. for i -> 1 to k
5. concatenate bucket[i].start to bucket[0].end
6. bucket[0].end=bucket[i].end
7. copy bucket[0] to A
```

**Time Complexity by lines:**

1) I know there is a way (not simple but a way) to init array in O(1)

2,3) O(n)

4,5) O(k)

6) O(n)

This gives us a net runtime of O(k+n), which for k >> n is Ω(n), which is bad for us. But what if we can change lines 4,5 to somehow skip the empty buckets? This way we will end up having O(n) no metter what k is.

Does anyone know how to do this? Or is it impossible?

k)"? – Oli Charlesworth Aug 31 '11 at 22:41