I've came across some similar problems to this one in the past, and I still haven't got good idea how to solve this problem. Problem goes like this:

You are given an positive integer array with size n <= 1000 and k <= n which is the number of contiguous subarrays that you will have to split your array into. You have to output minimum m, where m = max{s[1],..., s[k]}, and s[i] is the sum of the i-th subarray. All integers in the array are between 1 and 100. Example :

```
Input: Output:
5 3 >> n = 5 k = 3 3
2 1 1 2 3
```

Splitting array into 2+1 | 1+2 | 3 will minimize the m.

My brute force idea was to make first subarray end at position i (for all possible i) and then try to split the rest of the array in k-1 subarrays in the best way possible. However, this is exponential solution and will never work.

So I'm looking for good ideas to solve it. If you have one please tell me.

Thanks for your help.