# Given an input array find all subarrays with given sum K

Given an input array we can find a single sub-array which sums to K (given) in linear time, by keeping track of sum found so far and the start position. If the current sum becomes greater than the K we keep removing elements from start position until we get current sum <= K.

I found sample code from geeksforgeeks and updated it to return all such possible sets. But the assumption is that the input array consists of only +ve numbers.

``````bool subArraySum(int arr[], int n, int sum)
{
int curr_sum = 0, start = 0, i;
bool found = false;

for (i = 0; i <= n; i++)
{
while (curr_sum > sum && start < i)
{
curr_sum = curr_sum - arr[start];
start++;
}

if (curr_sum == sum)
{
cout<<"Sum found in b/w indices: "<<start<<" & "<<(i-1)<<"\n";
curr_sum -= arr[start];
start++;
found = true;
}

// Add this element to curr_sum
if (i < n) {
curr_sum = curr_sum + arr[i];
}
}

return found;
}
``````

My question is do we have such a solution for mixed set of numbers too (both positive and negative numbers)?

-
@jogojapan, Removed the C++ tag. But, the question you pointed is different, that requires subarray OF AT LEAST 'k' consecutive elements with maximum sum. I'm asking for any length subarray with given sum. –  user1071840 Feb 19 '13 at 1:27
@jogojapan. For maximum sum, we've kadane's algorithm which takes care of both positive and negative input and can be updated to consist of exactly 'k' elements. –  user1071840 Feb 19 '13 at 1:31
@jogojapan. Yep, I'm sure it would have a dupe..but wasn't able to find one so posted. –  user1071840 Feb 19 '13 at 1:54
@user1071840 Sure. Just to let you know, I'll remove my comments above, so as to not cause anyone to hit the "close vote" button prematurely. –  jogojapan Feb 19 '13 at 1:56
Related, but not a duplicate: stackoverflow.com/questions/13093602/… –  jogojapan Feb 19 '13 at 1:57

There is no linear-time algorithm for the case of both positive and negative numbers.

Since you need all sub-arrays which sum to `K`, time complexity of any algorithm cannot be better than size of the resulting set of sub-arrays. And this size may be quadratic. For example, any sub-array of `[K, -K, K, -K, K, -K, ...]`, starting and ending at positive 'K' has the required sum, and there are N2/8 such sub-arrays.

Still it is possible to get the result in O(N) expected time if O(N) additional space is available.

Compute prefix sum for each element of the array and insert the pair `(prefix_sum, index)` to a hash map, where `prefix_sum` is the key and `index` is the value associated with this key. Search `prefix_sum - K` in this hash map to get one or several array indexes where the resulting sub-arrays start:

``````hash_map[0] = [-1]
prefix_sum = 0
for index in range(0 .. N-1):
prefix_sum += array[index]
start_list = hash_map[prefix_sum - K]
for each start_index in start_list:
print start_index+1, index
start_list2 = hash_map[prefix_sum]
start_list2.append(index)
``````
-
This is really a great soluation.It finds all the possible continous sub-arry of sum K. –  Nirdesh Sharma May 16 '13 at 6:20
I dont understand this algorithm. does anybody have running code for this? –  L.E. Jul 20 '13 at 3:17
what is start list 2??? It is redeclared in each loop but not actually used...I am extremely confused by this. –  Aerovistae Jan 16 '14 at 23:54
I really do not follow this algorithm at all. I understand the "construct a prefix table" part, but that's where my understanding ends. That table only tells you the sums of arrays starting from element index `0`, so what good is it? I tried to make sense of the pseudocode and couldn't. –  Aerovistae Jan 17 '14 at 0:56
@Hengameh: I'm afraid I could not do it. I don't write in Java. And C is too low-level for this task. –  Evgeny Kluev Jul 7 at 14:38

Hi try this code this can work for you.

``````private static void printSubArrayOfRequiredSum(int[] array, int requiredSum) {
for (int i = 0; i < array.length; i++) {
String str = "[ ";
int sum = 0;
for (int j = i; j < array.length; j++) {
sum = sum + array[j];
str = str + array[j] + ", ";
if (sum == requiredSum) {
System.out.println(" sum : " + sum + " array : " + str
+ "]");
str = "[ ";
sum = 0;
}
}
}
}
``````

Use this method like :

int array[] = { 3, 5, 6, 9, 14, 8, 2, 12, 7, 7 }; printSubArrayOfRequiredSum(array, 14);

Output : sum : 14 array : [ 3, 5, 6, ] sum : 14 array : [ 14, ] sum : 14 array : [ 2, 12, ] sum : 14 array : [ 7, 7, ]

-
Can you explain runtime complexity for above code? –  Viral Jul 11 '14 at 18:47
I know this is months late, but it's O(n^2) because you have two array iterations, both which got from 0-n. Therefore, you get n (from the outer loop) * n (from the inner loop), which equals n^2 –  Anubhaw Arya Feb 5 at 3:37