An array contains both positive and negative elements, find the subarray whose sum equals 0.

The link in the current accepted answer requires to sign up for a membership and I do not its content. This algorithm will find all subarrays with sum 0 and it can be easily modified to find the minimal one or to keep track of the start and end indexes. This algorithm is O(n). Given an Now if you check tmp, you'll notice that there might be values that are equal to each other. Let's say that this values are at indexes
The implementation can be done in different ways including using a HashMap with pairs but be careful with the special case in the NOTE section above. Example:
UPDATE Assuming that in our tmp array we end up with multiple element with the same value then you have to consider every identical pair in it! Example (keep in mind the virtual '0' at index '1'):
By applying the same algorithm described above the 0sum subarrays are delimited by the following indexes (included):
Although the presence of multiple entries with the same value might impact the complexity of the algorithm depending on the implementation, I believe that by using an inverted index on tmp (mapping a value to the indexes where it appears) we can keep the running time at O(n). 


This is one the same lines as suggested by Gevorg but i have used a hash map for quick lookup. O(n) complexity used extra space though.
The output generated has index of elements (zero based):



An array contains positive and negative numbers. Find the subarray that has the maximum sum



Here's my implementation, it's the obvious approach so it's probably suboptimized, but at least its clear. Please correct me if i'm wrong. Starts from each index of the array and calculates and compares the individual sums (tempsum) with the desired sum (in this case, sum = 0). Since the integers are signed, we must calculate every possible combination. If you don't need the full list of subarrays, you can always put conditions in the inner loop to break out of it. (Say you just want to know if such a subarray exists, just return true when tempsum = sum).
Calling the function: int[] array = SubArraySumList(new int { 0, 1, 1, 0 }, 0)); Printing the contents of the output array: [00], [02], [03], [12], [13], [33] 


Hope this will help.





