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I have a set S containing natural numbers and a target t which is an number. I want to know
how can we find the number of possible combinations of these numbers which sums up to target t.
A number can be taken any number of times and any number of numbers can be taken for getting the
sum equal to the target t.

Example
target  6
Set s  {3,8,1,2}
Solution   3+3, 3+2+1, 1+1+1+3, 2+2+2, 2+1+1+2, 2+1+1+1+1, 1+1+1+1+1+1
Total No of solutions possible  7

What can be the efficient algorithm for this?

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You already figured it is related to subset sum problem. It is even harder (reduceable) then subset-sum problem with the reduction: if there are x>0 solutions, accept - otherwise, reject. So this problem is NP-Hard as well, there is no known efficient solution, in the standard definition of efficient (polynomial). Do you have other definition for efficient for your case? If so - specify it please. –  amit Aug 13 '12 at 7:42
    
@amit Why wouldn't dynamic programming work here? –  irrelephant Aug 13 '12 at 7:43
    
@amit i just want to know is there any polynomial time solution. –  abhi Aug 13 '12 at 7:48
1  
This is a solution to an identical problem: algorithmist.com/index.php/Coin_Change –  irrelephant Aug 13 '12 at 7:52
    
@irrelephant: The problem is NP-Hard, the DP algorithm will most likely yield pseudo polynomial solution, which is not polynomial, and is not considered efficient in its standard definition. If one can find polynomial solution to an NP-Hard Problem, it will prove P=NP (which is probably not the case). –  amit Aug 13 '12 at 7:54

1 Answer 1

up vote 1 down vote accepted

If the target is reasonably small, you can use dynamic programming to obtain an O(|S| * t) solution. Here is a sample code in Python:

def combinations(S, t):
    dp = [1] + [0] * t
    for i in S:
        for j in range(0, t - i + 1):
            dp[j + i] += dp[j]
    return dp[t]
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