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I have array of 1's and 0's only. Now I want to find smallest contiguous subset/subarray which contains at least K 0's.

Example Array is 1 1 0 1 1 0 1 1 0 0 0 0 1 0 1 1 0 0 0 1 1 0 0 1 0 0 0 and K(6) should be 0 0 1 0 1 1 0 0 0 or 0 0 0 0 1 0 1 1 0....

My Solution

     Array: 1 1 0 1 1 0 1 1 0  0  0  0  1  0  1  1  0  0  0   1  1  0  0
     Index: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19  20 21 22 23
     Sum:   1 2 2 3 4 4 5 6 6  6  6  6  7  7  8  9  9  9  9  10 11 11 11
Diff(I-S):  0 0 1 1 1 2 2 2 3  4  5  6  6  7  7  7  8  9 10  10 10 11 12

For K(6)

Start with 9-15 = Store difference in diff.

Next increase difference 8-15(Difference in index) 8-14(Compare Difference in index)

So on keep moving to find element with least elements...

I am looking for better algorithm for this solution.

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1  
I believe you are looking for a minimal contigious subarray (otherwise the problem is trivial) –  amit Dec 6 '12 at 10:31
    
Yes Amit. I am looking contiguous array... –  Vishal Dec 6 '12 at 10:35
    
It would help to also mention "smallest" in the body of your question, and change "smallest subset" to "shortest substring" in the question title. –  j_random_hacker Dec 6 '12 at 11:11
    
It is not a string, I have an array with me... So I will need subset only.. –  Vishal Dec 6 '12 at 11:13
1  
Okay, I have modified the title, hope that will make more sense now –  Vishal Dec 6 '12 at 11:26

4 Answers 4

up vote 4 down vote accepted

I believe you could do it with a rolling window like:

  1. In the given array, find the first occurance of 0 (say at index i).
  2. Keep on scanning until you've k 0's included in your window (say, the window ends at index j) Record the window Length(say j-i+1=L).
  3. Now, discard the left-most 0 at index i, and keep scanning till you get next 0 (say at index i'
  4. Extend the right-end of the window situated at j to j' to make the count of 0's = k again.
  5. If the new window-length L'=j'-i'+1 is smaller update it.

Keep on repeating the above procedure till j hits the end of array.

No extra space needed and It's O(N) time-complexity, as an element would be scanned at max twice.

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Actually I was on the same line, but I over-did it... –  Vishal Dec 6 '12 at 16:47

With extra O(k) memory , you can do it in O(n) time.Here is the java code.What you are doing is , if a[i]==0 then you check where the queue's first element points to.and if the differnce in positions is less than minimum, then you update the answer.

Queue<Integer> queue =new LinkedList<Integer>();
int i=0;
while(queue.size()<k&&i<n)
{
if(a[i]==0)
{
queue.add(i);
}
i++;
}
if(i==n&&queue.size()<k)
System.out.println("Insufficient 0''s");
int ans=i-1-queue.peek();
for(int j=i;j<n;j++)
{
if(a[i]==0)
{
queue.poll();
queue.add(i);
ans=Math.min(ans,i-queue.peek());
}
}
System.out.println(ans);

EDIT :Explanation

We maintain a queue which consist of all the positions which have a 0 and we limit the queue size to be k. So initially in the while loop we fill the queue with the first k indexes. If ofcourse the queue size is less than k after seeing all elements , then it's impossible. After that , we keep going to all the left over elements .Each time we see a 0 , we calcualte the length of the subsequence ,(i-queue.peek()) and find the minimum .Also we remove the first element , and add the latest index again maintaining the queue size

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Could you provide me the logic instead the complete code/ –  Vishal Dec 6 '12 at 11:04
    
@Vishal :I have updated the code with explanation.Does it now make sense to u ? –  Wayne Rooney Dec 6 '12 at 11:36

fully working python code:

>>> A = "1 1 0 1 1 0 1 1 0  0  0  0  1  0  1  1  0  0  0   1  1  0  0".split()
>>> A = map(int, A)
>>> zero_positions = [i for i, x in enumerate(A) if x == 0]
>>> k = 3
>>> containing_k_zeros_intervals = zip(zero_positions, zero_positions[k:])
>>> min(b - a for a, b in containing_k_zeros_intervals)
3
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If you wanted to extract the interval rather than just its length, change b - a to (a, b) –  robert king Dec 6 '12 at 11:24
    
wouldn't taking the min of (a,b) produce the minimum pair in lexicographical order? –  wye.bee Dec 6 '12 at 11:29
    
Something like min([(a, b) for a, b in containing_k_zeros_intervals], key = lambda (a, b): b-a) instead? –  wye.bee Dec 6 '12 at 11:33
    
sorry, I meant change b - a to (b - a, a, b). Thanks for noticing wye.bee :) –  robert king Dec 6 '12 at 11:37
  1. Scan the array from the starting to find the index till which we get k zeros.

Have two pointers.

Now ptr1 is at the index where first zero is seen. start = ptr1

ptr2 is at the index where we have found k 0's.

end = ptr2; a)increment ptr1.

b ) find the index from ptr2+1 until we find k 0's.

c) Say at ptr3 we find K 0's. If ptr3-ptr1 < (end-start) update indexes start and end.

Repeat steps a -c until the end of the list.

At the end, start and end will have indexes where there are k 0's.

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