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public class Kadane {
  double maxSubarray(double[] a) {
    double max_so_far = 0;
    double max_ending_here = 0;

    for(int i = 0; i < a.length; i++) {
      max_ending_here = Math.max(0, max_ending_here + a[i]);
      max_so_far = Math.max(max_so_far, max_ending_here);
    }
    return max_so_far;
  }
}

The above code returns the sum of the maximum sub-array.

How would I instead return the sub-array which has the maximum sum?

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Do you mean max sub array starting at index 0? –  bdares Oct 15 '11 at 13:58
    
its not necessary that max sub array start at index 0, it depends on the array values –  Aqib Saeed Oct 15 '11 at 14:10

3 Answers 3

up vote 8 down vote accepted

Something like this:

public class Kadane {
  double[] maxSubarray(double[] a) {
    double max_so_far = 0;
    double max_ending_here = 0;
    int max_start_index = 0;
    int startIndex = 0;
    int max_end_index = -1;

    for(int i = 0; i < a.length; i++) {
      if(0 > max_ending_here +a[i]) {
        startIndex = i+1;
        max_ending_here = 0;
      }
      else {
        max_ending_here += a[i];
      }

      if(max_ending_here > max_so_far) {
        max_so_far = max_ending_here;
        max_start_index = startIndex;
        max_end_index = i;
      }
    }

    if(max_start_index <= max_end_index) {
      return Arrays.copyOfRange(a, max_start_index, max_end_index+1);
    }

    return null;
  }
}
share|improve this answer

The code above has an error. Should be:

max_ending_here = Math.max(a[i], max_ending_here + a[i]);

NOT:

max_ending_here = Math.max(0, max_ending_here + a[i]);

If not, would fail for a sequence such as: 2 , 4, 22, 19, -48, -5 , 20, 40 and return 55 instead of the correct answer of 60.

SEE Kadane algorithm at http://en.wikipedia.org/wiki/Maximum_subarray_problem

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It is correct. max(a[i], max_ending_here + a[i]) is only for an array with all negative values. –  qxixp Jan 23 '14 at 5:16

I maintain the max_so_far in a list:

for(int i = 0;i<N;i++){
    max_end_here = Math.max(seq[i], max_end_here + seq[i]);
    sum_list.add(max_end_here);
    // System.out.println(max_end_here);
    max_so_far = Math.max(max_so_far, max_end_here);
}

Then search the biggest sum in list, its index as sub sequnece end. Start from index as end and search backwards, find the last index whose value is positive. Subsequence start is this index.

for(int i=sum_list.size()-1; i>=0; i--){
    if(sum_list.get(i) == max_so_far){
        end = i;
        while(sum_list.get(i) > 0 && i>=0){
            i--;
        }
        start = (i==-1)?0:i+1;
        break;
    }
}
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