Algorithm to select a set of numbers to reach a minimum total

Given A set of numbers `n[1], n[2], n[3], .... n[x]` And a number M

I would like to find the best combination of

``````n[a] + n[b] + n[c] + ... + n[?] >= M
``````

The combination should reach the minimum required to reach or go beyond M with no other combination giving a better result.

Will be doing this in PHP so usage of PHP libraries is ok. If not, just a general algorithm will do. Thanks!

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The best example I can think of is as such Given a shopping voucher of M value, I go to a store and choose products such that I would make full use of the voucher and pay minimum cash to top up the balance. I would also choose the combination with least quantity of products if there is more than 1 combination that produces the same total value. –  Aves Liaw Oct 18 '10 at 7:56
The least amount of products to chose would be sum{ n[?] + n[c] + ... } where sum > M. Am I wrong? –  Chris Oct 18 '10 at 10:33
its sum >= M, precedence going to the set where the difference between sum and M is the least. if two sets have the same sum, the set with the least number of 'products' wins –  Aves Liaw Oct 18 '10 at 12:18

``````pseudocode:

list<set> results;
int m;
list<int> a;

// ...

a.sort();

for each i in [0..a.size]
f(i, empty_set);

// ...

void f(int ind, set current_set)
{

if (current_set.sum > m)
{
}
else
{
for (int i=ind + 1; i<a.size; ++i)
{
f(i, current_set);  // pass set by value

// if previous call reached solution, no need to continue
if (a[ind] + current_set.sum) > m
break;
}
}
}

// choose whatever "best" result you need from results, the one
// with the lowest sum or lowest number of elements
``````
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This could work unfortunately does not return the optimal results. For eg M = 21, numbers are 22, 15, 5, 3, 2 ,2, 1. If I'm not wrong, the code would return 2 results [22] and [15, 5, 3, 2, 2]. But the best answer would be [15,5,3,2,1] which would not be considered? Correct me if I'm wrong here. –  Aves Liaw Oct 18 '10 at 9:42
added a minor fix, but for another problem. that solution should work, it kinda goes over all possible solutions cutting out wrong branches asap. so for your inputs it will return [1, 2, 2, 3, 5, 15] [1, 2, 3, 5, 15] [1, 3, 5, 15] [1, 5, 15] [2, 2, 3, 5, 15] etc. Choose the set with the lowest sum or lowest number of elements or whatever your "best" criteria is. –  Grozz Oct 18 '10 at 10:11
Managed to translate this to code. Worked well enough. Thanks –  Aves Liaw Oct 21 '10 at 2:11

The greedy solution works if the question asks for the minimum number of items. But the maximum(..) function shall take into account that when M is negative maximum should return the distance of the number to 0.(abs() of the value).

The maximum() function can be implemented via binary heap. The complexity is O(n.logn).

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This looks like a classic Dynamic Programming problem (also indicated by other answers mentioning its similarity to 0-1 Knapsack and Subset Sum problems). The whole thing boils down to to one simple choice: for each element in the list, do we use it in our sum or not. We can write up a simple recursive function to compute the answer:

``````f(index,target_sum)=
0     if target_sum<=0 (i.e. we don't need to add anymore)
infinity   if target_sum>0 and index is past the length of n (i.e. we have run out of numbers to add)
min( f(index+1,target_sum), f(index+1,target_sum-n[index])+n[index] )    otherwise (i.e. we explore two choices -  1. take the current number 2. skip over the current number and take their minimum)
``````

Since this function has overlapping subproblems (it explores the same sub-problems over and over again) , it is a good idea to memoize the function with a cache to hold values that were already computed before.

Here's the code in Python:

``````#! /usr/bin/env python

INF=10**9 # a large enough number of your choice

def min_sum(numbers,index,M, cache):
if M<=0: # we have reached or gone past our target, no need to add any more
return 0
elif len(numbers)==index: # we have run out of numbers, solution not possible
return INF
elif (index,M) in cache: # have been here before, just return the value we found earlier
return cache[(index,M)]
else:
min_sum(numbers,index+1,M,cache), # skip over this value
min_sum(numbers,index+1,M-numbers[index],cache)+numbers[index] # use this value
)
cache[(index,M)]=answer # store the answer so we can reuse it if needed

if __name__=='__main__':
data=[10,6,3,100]
M=11

print min_sum(data,0,M,{})
``````

This solution only returns the minimum sum, not the actual elements used to make it. You can easily extend the idea to add that to your solution.

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This problem is almost exactly the subset sum problem, which is related to the Knapsack problem but different, and is NP complete. However, there is a linear solution if all the numbers are smaller than some constant, and a Polynomial time approximation. See the wikipedia page referenced above.

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A Greedy solution would work A pseudo:

``````algo(input_set , target_sum, output_set )
if input_set is NULL
error "target_sum can never be reached with all input_set"
return
the_max = maximum(input_set)
remove the_max from input_set
if the_max > target_sum
algo(input_set, target_sum, ouptput_set )
return
add the_max to output_set
algo(input_set, target_sum - the_max, output_set )
``````

call with output_set = NULL. sort intput_set for efficiency.

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Not the solution for op's problem. –  Grozz Oct 18 '10 at 9:10
I think this solution only works if I want the values to sum up to exactly target_sum. However, for my case, the total is allowed beyond target_sum. –  Aves Liaw Oct 18 '10 at 9:18

This kind of problems is called binary linear programming (a special case of integer linear programming). It is famously NP-hard – i.e. not efficient to solve in general.

However, there exist good solvers, both commercial and free use, e.g. the Open Source solver lpsolve which you can call from your program.

/EDIT: Old answer was bunk. I confused the factors.

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I don't think this is a linear programming problem, as you can have 0 or 1 of each number, with a linear programming problem you can have fractional multiples –  Nick Fortescue Oct 18 '10 at 8:53
@Nick: damn, you’re right. It’s a BLP. –  Konrad Rudolph Oct 18 '10 at 8:55

I think this is NP-complete (it's not possible to find a fast way of doing it in general). The way you've phrased the question makes me think of solving successive Subset sum problems with a target integer that steadily increases from M.

In your example, there is no known method of determining whether M can be reached. Only a brute-force solution would tell you that it's not possible, and only then could you check M+1.

However, you may like to look at the DP solution, as this will at least give you an idea of how to solve the problem (albeit slowly). There is also an approximate solution which will be correct if your numbers are small. Use this. Finally, it's worth pointing out that the size of the problem is measured in the number of bits, not the size (or sum) of the set.

As mentioned above, this is related to the Knapsack problem.

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