# Given two sets of numbers, find the smallest set from each where the sum is equal

I am working on an application that needs to match two sets of data based on various criteria, including the sum of any number of items from each set. I've distilled the problem down to this statement:

Given a set of items and transactions, find the smallest set of items where the sum is equal to the sum of the smallest set of transactions. (There’s some complexity I’m ignoring for this post, but for now I’m only concerned about the total amounts matching, not dates, descriptions, clearing differences, etc.)

Or, mathematically:Given two sets of numbers, find the smallest set from each where the sums are equal.

The other similar SO questions I've run across assume you know the sum ahead of time, or know the quantity from each set that you are going for.

And here is a test that (I think) illustrates what I'm going for.

``````    [TestMethod]
public void StackOverflowTest()
{
var seta = new[]{10, 20, 30, 40, 50};
var setb = new[]{ 45, 45, 100, 200 };

var result = Magic(seta, setb);

Assert.AreEqual(new[]{40,50},result.SetA);
Assert.AreEqual(new[] { 45, 45 }, result.SetB);
}
class MagicResult
{
public int[] SetA { get; set; }
public int[] SetB { get; set; }

}
private MagicResult Magic(int[] seta, int[] setb)
{
throw new NotImplementedException();
}
``````

I'm looking for an elegant solution that will make this pass, but will take any pseudocode or suggestion that gets me there ;)

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+1 for including a test method :D –  System Down Oct 26 '12 at 23:07
what do you do if there are multiple sets that meet this criteria? Also, do you want the smallest sets that sum to the smallest number? –  Abe Miessler Oct 26 '12 at 23:08
Last one :) - Is a set of 1 acceptable? –  Abe Miessler Oct 26 '12 at 23:15
@Abe:By "smallest set" I mean sets with the smallest quantity of items. So, if there are multiple sets that meet the criteria, then it should return the one with the least number items. If multiples match that criteria, then it can just return the first match (in the actual app, this won't be likely). –  Daniel Oct 26 '12 at 23:15
A set of 1 from both A and B is acceptable. A set of 1 from A and 0 from B is not acceptable. So, if SetA and SetB in the test each contained "42", then it would return a result with 42 in setA and 42 in setB. –  Daniel Oct 26 '12 at 23:20

Brute force:

`````` var result = (from a in seta.Subsets()
from b in setb.Subsets()
where a.Count() > 0 && b.Count() > 0
where a.Sum() == b.Sum()
orderby a.Count() + b.Count()
select new MagicResult { SetA = a.ToArray(), SetB = b.ToArray() }
).First();
``````

using the Subsets method from the EvenMoreLINQ project.

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Should work if exhaustive search is acceptable. –  L.B Oct 26 '12 at 23:23
@L.B: Can you actually do a non-exhaustive search if the smallest set for which the condition is true is the full set? –  dtb Oct 26 '12 at 23:28
Dtb, I can not figure out a better one, but this doesn't mean a better alg can not be deviced using pruning. Your answer is the simpliest one which can work. –  L.B Oct 26 '12 at 23:30
FWIW - the runtime of this will be `O(2^n)` –  dfb Oct 27 '12 at 0:06
This code is worse than `O(2^n)`. Each set of size `n` has `2^n` subsets, so there are `2^n * 2^n = 2^(2n)` comparisons! –  alexis Oct 27 '12 at 0:17

This can be solved using dynamic programming in `O(nW)` time where W is the size of the largest sum. Solve the knapsack problem for both sets to generate an array for each that contains all the possible sums and keep track of the number of items used. Then, compare equal sums in each array to find the minimum for each

Not tested, but this is the idea.

``````arr1dp = [None]*W;  arr1dp[0] = 0;
arr2dp = [None]*W;  arr2dp[0] = 0;

# knapsack arr1
for i in range(len(arr1)):
for cur_item in arr1:
if (arr1dp[cur_item] is not none):
arr1dp[cur_item+i] = min(arr1dp[cur_item]+1,arr1dp[cur_item])

# do the same for arr2
# omitted for brevity

# find the smallest match
for i in range(W):
if arr1dp[i] is not none and arr2dp[i] is not none:
min_val = min(min_val,arr1dp[i]+arr2dp[i])
``````
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If the two sets contain a number in common, there is a solution of size 1.

If not, try all sums of two numbers (there are N-choose-two, or `N*(N-1)/2` in each set). Compare them against the collection of single-number and two-number sums.

If no joy, try all sums of three numbers, comparing them against 1, 2 or 3-number sums; and so on until all sums (2**N for a set of size N) have been tried.

Here's working code that stops searching as soon as it finds a solution. (There might be smaller sums with the same number of summands). It's in python, but that's practically pseudo-code :-)

``````from itertools import combinations

# To allow lists of different sizes: ensure list1 is never the short one
if len(list1) < len(list2):
list1, list2 = list2, list1

def found(val, dict1, dict2):
print "Sum:", val
print "Sum 1", dict1[val]
print "Sum 2", dict2[val]

def findsum(list1, list2):
# Each dict has sums as keys and lists of summands as values.
dict1 = dict()
dict2 = dict()

for n in range(1, max(len(list1), len(list2))+1):
# Check all size n sums from list1 against size < n sums in list2
for nums in combinations(list1, n):
s = sum(nums)
if s in dict1:  # Is this sum new for our list?
continue

dict1[s] = nums
if s in dict2:
found(s, dict1, dict2)
return   # If you want to look for a smallest sum, keep going

# If list2 is too short, nothing to do
if len(list2) < n:
continue

# Check all size n sums from list2 against size <= n sums in list1
for nums in combinations(list2, n):
s = sum(nums)
if s in dict2:  # Is this sum new for our list?
continue

dict2[s] = nums
if s in dict1:
found(s, dict1, dict2)
return   # If you want to look for a smallest sum, keep going

findsum(list1, list2)
``````

This is designed to find a solution in the smallest number of comparisons. If you also want the sum to be minimal, then at each size n generate all n-part sums at once, sort them and check them in increasing order.

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