I'm currently working on the following problem:

Given an array of M positive numbers, I need to get N blocks of contiguous numbers with some given length. For example, when I have the array:

6 9 3 2 8 1 6 9 7

When I need to find one block of length 3, the solution is [3,2,8] which has a total minimal sum of 13. When I need to find two blocks, the algorithm should give [3,2,8] and [1,6,9] since the sum of all elements in these blocks is minimal (29). It is given that the length of the sequence is always strictly larger than N times the length of a block (so there is always a solution).

I think this problem is solvable by using DP but I currently can't see how. I'm struggling to find a recurrent relation between the subproblems. Could anyone give me a hand here?

Thanks in advance!

`n`

to`-n`

and then apply the standard algorithm for maximum subarray sum. As for two: the sub-arrays can have intersections? – Haile Dec 16 '12 at 19:26