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I understand DNF Problem for 3 Colors. Assume I want to extend the number of colors to 5 (0,1,2,3,4), can I still get O(n) complexity?

So I think we have 5 areas where 2 is the unknown area. But how to implement this? Can I easily extend the algorithm for 3 Colors to 5?

void sort012(int a[], int arr_size){
int lo = 0;
int hi = arr_size - 1;
int mid = 0;

while (mid <= hi){
    switch (a[mid]){
    case 0:
        swap(&a[lo++], &a[mid++]);
        break;
    case 1:
        mid++;
        break;
    case 2:
        swap(&a[mid], &a[hi--]);
        break;
    }
}
}

1 Answer 1

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It is definitely O(n): trivially doable in O(nk) as long as the number of colors k is constant.

For an algorithm similar to three-way partition (Dutch National Flag problem), I'd suggest a two-pass algorithm. For example, on the first pass, we treat 0 as the left part, all of 1, 2, and 3 as the middle part, and 4 as the right part. On the second pass, we skip 0s and 4s at the borders, and do a three-way partition of the 1s, 2s and 3s. Note that the result is a stable partition: on each pass, the order of identical elements remains the same.

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  • 1
    The partitioning in Dutch National Flag is not stable. The relative order of similar elements always change.
    – Ajay Singh
    Nov 22, 2020 at 15:44

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