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I have to write a function that takes a list of integers and returns the maximum sum sublist of the list. An example would be:

l = [4,-2,-8,5,-2,7,7,2,-6,5]

returns 19

so far my code is:

count = 0
for i in range(0,len(l)-1):
    for j in range(i,len(l)-1):
        if l[i] >= l[j]:

            count += l[i:j]

return count

I am kind of stuck and confused, can anyone help? Thank You!

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The naive approach would be to check every possible sublist of all lengths 1..len(l). That is, you would check every sublist length 1, then every sublist length 2, then every sublist length 3, and output the maximum found. –  lc. Feb 25 '13 at 2:16
possible duplicate of Maximum sum sublist? –  Dukeling Jun 13 '14 at 6:35

2 Answers 2

I assume this is a homework, so I won't try to google algorithms here and/or post too much code.

Some ideas (just from the top of my head, 'cause I like these kind of tasks :-))

As user lc already pointed out the naive, and also exhaustive way is to test every single sublist. I believe your (user2101463) code goes in that direction. Just use sum() to build up the sums and compare against a known best. To prime the best known sum with a reasonable starting value, just use the first value of the list.

the_list = [4,-2,-8,5,-2,7,7,2,-6,5]

best_value = the_list[0]
best_idx = (0,0)
for start_element in range(0, len(the_list)+1):
    for stop_element in range(start_element+1, len(the_list)+1):
        sum_sublist = sum(the_list[start_element:stop_element])
        if sum_sublist > best_value:
            best_value = sum_sublist
            best_idx = (start_element, stop_element)

print("sum(list([{}:{}])) yields the biggest sum of {}".format(best_idx[0], best_idx[1], best_value))

This of course has quadratic runtime O(N^2). That means: If the problem size, as defined by the number of elements of the input list, grows with N, the runtime grows with N*N, with some arbitrary coefficients.

Some heuristics for improvement:

  • Obviously negative numbers are not good because they decrease the achievable sum
  • If you encounter a sequence of negative numbers, restart your best sublist after that sequence, if the sum of the best list so far plus the negative numbers is < 0. In your example list the first three numbers cannot be part of a best list because the positive effect of the 4 is always negated by the -2, -8.
  • Possibly this even leads to an O(N) implementation which just iterates from start to end, memorizing the best known start index while calculating running sums of a full total from that start index as well as positive and negative subtotals of the last continues sequence of positive and negative numbers, respectively.
  • Once such a best list is found, possibly this requires a final cleanup to remove a trailing negative sublist such as the -6, 5 at the end of your example.

Hope this leads in the right direction.

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This is called the 'maximum subarray problem' and can be done in linear time. The wikipedia article has your answer.

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