# Find the minimum sum of 'P' elements in an array of N elements such that no more than 'k' consecutive elements are selected together

Suppose the array is `1 2 3 4 5` Here `N = 5` and we have to select 3 elements and we cannot select more than 2 consecutive elements, so `P = 3` and `k = 2`. So the output here will be `1 + 2 + 4 = 7`.

I came up with a recursive solution, but it has an exponential time complexity. Here is the code.

``````#include<iostream>

using namespace std;

void mincost_hoarding (int *arr, int max_size, int P, int k, int iter, int& min_val, int sum_sofar, int orig_k)
{
if (P == 0)
{
if (sum_sofar < min_val)
min_val = sum_sofar;
return;
}

if (iter == max_size)
return;

if (k!=0)
{
mincost_hoarding (arr, max_size, P - 1, k - 1, iter + 1, min_val, sum_sofar + arr[iter], orig_k);
mincost_hoarding (arr, max_size, P, orig_k, iter + 1, min_val, sum_sofar, orig_k);
}
else
{
mincost_hoarding (arr, max_size, P, orig_k, iter + 1, min_val, sum_sofar, orig_k);
}

}

int main()
{
int a[] = {10, 5, 13, 8, 2, 11, 6, 4};

int N = sizeof(a)/sizeof(a);
int P = 2;
int k = 1;

int min_val = INT_MAX;
mincost_hoarding (a, N, P, k, 0, min_val, 0, k);

cout<<min_val;

}
``````

Also, if supposedly P elements cannot be selected following the constraint, then we return INT_MAX.

I was asked this question in an interview. After proposing this solution, the interviewer was expecting something faster. Maybe, a DP approach towards the problem. Can someone propose a DP algorithm if there exists one, or a faster algorithm.

I have tried various tests cases and got correct answers. If you find some test cases that are giving incorrect response, please point that out too.

• If the array is {1,2,3,4,5,6} and P = 4, k = 3, then can 1,2,4,5 be selected? – Abhishek Bansal Sep 17 '13 at 11:50
• No, then 1, 2, 3, 5 should be selected. You can select at most 3 consecutive elements together, when k = 3. – user2560730 Sep 17 '13 at 12:15
• Suggestion: avoid in your example to use a sorted array, it is "misleading" (and in case of sorted array, the solution is trivial). – Jarod42 Sep 17 '13 at 12:49
• Consecutive elements in the original array ordering? Or consecutive elements in the number line? For {1,5,2}, P=2, k=1, is the answer {1,5} or {1,2}? – Teepeemm Sep 17 '13 at 13:00
• Answer is 1, 2. Consecutive elements in array ordering. Also @Jarod42, I'll keep that in mind the next time. Choosing a sorted array was perhaps not the best way to explain the question. – user2560730 Sep 17 '13 at 13:45

Below is a Java Dynamic Programming algorithm.
(the C++ version should look very similar)

It basically works as follows:

• Have a 3D array of `[pos][consecutive length][length]`
Here `length index = actual length - 1`), so `` would be length 1, similarly for consecutive length. This was done since there's no point to having length 0 anywhere.
• At every position:
• If at length 0 and consecutive length 0, just use the value at `pos`.
• Otherwise, if consecutive length 0, look around for the minimum in all the previous positions (except `pos - 1`) with `length - 1` and use that plus the value at `pos`.
• For everything else, if `pos > 0 && consecutive length > 0 && length > 0`,
use `[pos-1][consecutive length-1][length-1]` plus the value at `pos`.
If one of those are 0, initialize it to an invalid value.

Initially it felt like one only needs 2 dimensions for this problem, however, as soon as I tried to figure it out, I realized I needed a 3rd.

Code:

``````  int[] arr = {1, 2, 3, 4, 5};
int k = 2, P = 3;

int[][][] A = new int[arr.length][P][k];

for (int pos = 0; pos < arr.length; pos++)
for (int len = 0; len < P; len++)
{
int min = 1000000;
if (len > 0)
{
for (int pos2 = 0; pos2 < pos-1; pos2++)
for (int con = 0; con < k; con++)
min = Math.min(min, A[pos2][len-1][con]);
A[pos][len] = min + arr[pos];
}
else
A[pos] = arr[pos];

for (int con = 1; con < k; con++)
if (pos > 0 && len > 0)
A[pos][len][con] = A[pos-1][len-1][con-1] + arr[pos];
else
A[pos][len][con] = 1000000;
}

// Determine the minimum sum
int min = 100000;
for (int pos = 0; pos < arr.length; pos++)
for (int con = 0; con < k; con++)
min = Math.min(A[pos][P-1][con], min);
System.out.println(min);
``````

Here we get `7` as output, as expected.

Running time: `O(N2k + NPk)`

• +1: I think this is an appropriate answer for an interview problem. I believe you could also do it in a single pass through the data with O(Pk) space and O(NPlogk) complexity by using a P length deque of k length heaps of [value,starting position] where heap p stores the different ways of using p entries with different consecutive numbers of previous entries. However, the details are a little tricky so I wouldn't recommend it in an interview situation! – Peter de Rivaz Sep 17 '13 at 17:39