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This is an algorithm 101 problem:

Given an array of N elements fund the subset of the array that results in maximum sum. For example if my array is {1, -3, 5, -2, 9, -8, -6, 4} then the answer should be {5, -2, 9}.

So far I have an O(N^2) solution: For each index i of array, I compute the sum the subarrays if index (i,j) for all j > i; keeping track of the maximum, the lower index and upper index for the corresponding maximum along the way. Then I increment i and repeat the procedure until i < length of array.

I am wondering if I can do better than this. I am just looking for a right direction. From my math background something rings the bell that if I could keep track of the derivative and second derivative along the way this might somehow give a clue but so far I am kind of stuck with this problem for a while.

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marked as duplicate by templatetypedef, ElKamina, Josh Mein, Raymond Chen, Dukeling Sep 21 '13 at 0:20

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it's not a subset, it's a continuous range –  Karoly Horvath Sep 20 '13 at 21:44
Read also: Minimum Subarray which is larger than a Key –  Grijesh Chauhan Sep 20 '13 at 21:44
Thanks! I did not know this problem had a specific name. –  brotherofmysister Sep 20 '13 at 21:44
See Chen Pang's beautiful code and adapt it to your problem: stackoverflow.com/questions/18839769/… –  גלעד ברקן Sep 20 '13 at 22:52

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