# return the sum of the max sublist

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

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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