My question is about a CodeFu practice problem (2012 round 2 problem 3). It basically comes down to splitting an array of integers in two (almost) equal halves and returning the smallest possible difference between the two. I have included the problem description below. As noted in the comments this can be described as a balanced partition problem, which is a problem in the realm of dynamic programming.

Now similar problems have been discussed a lot, but I was unable find an efficient solution for this particular one. The problem is of course that the number of possible combinations to traverse soon grows too large for a brute force search (at least when using recursion). I have a recursive solution that works fine for all but the largest problem sets. I tried to add some optimizations that stop the recursion early, but the performance is still too slow to solve some arrays of the maximum length (30) within the 5 second maximum allowed by CodeFu. Any suggestions for how to improve or rewrite the code would be very welcome. I would also love to know if it might help to make the iterative version.

**Update:** on this fine site there is a theoretical discussion of the balanced partition problem, which gives a good idea of how to go about and solve this in a dynamic way. That is really what I am after, but I do not know how to put the theory into practice exactly. The movie mentions that the elements in the two subcollections can be found "using the old trick of back pointers", but I don't see how.

## Problem

You and your friend have a number of coins with various amounts. You need to split the coins in two groups so that the difference between those groups in minimal.

E.g. Coins of sizes 1,1,1,3,5,10,18 can be split as: 1,1,1,3,5 and 10,18 1,1,1,3,5,10 and 18 or 1,1,3,5,10 and 1,18 The third combination is favorable as in that case the difference between the groups is only 1. Constraints: coins will have between 2 and 30 elements inclusive each element of coins will be between 1 and 100000 inclusive

Return value: Minimal difference possible when coins are split into two groups

NOTE: the CodeFu rules state that the execution time on CodeFu's server may be no more than 5 seconds.

## Main Code

```
Arrays.sort(coins);
lower = Arrays.copyOfRange(coins, 0,coins.length-1);
//(after sorting) put the largest element in upper
upper = Arrays.copyOfRange(coins, coins.length-1,coins.length);
smallestDifference = Math.abs(arraySum(upper) - arraySum(lower));
return findSmallestDifference(lower, upper, arraySum(lower), arraySum(upper), smallestDifference);
```

## Recursion Code

```
private int findSmallestDifference (int[] lower, int[] upper, int lowerSum, int upperSum, int smallestDifference) {
int[] newUpper = null, newLower = null;
int currentDifference = Math.abs(upperSum-lowerSum);
if (currentDifference < smallestDifference) {
smallestDifference = currentDifference;
}
if (lowerSum < upperSum || lower.length < upper.length || lower[0] > currentDifference
|| lower[lower.length-1] > currentDifference
|| lower[lower.length-1] < upper[0]/lower.length) {
return smallestDifference;
}
for (int i = lower.length-1; i >= 0 && smallestDifference > 0; i--) {
newUpper = addElement(upper, lower[i]);
newLower = removeElementAt(lower, i);
smallestDifference = findSmallestDifference(newLower, newUpper,
lowerSum - lower[i], upperSum + lower [i], smallestDifference);
}
return smallestDifference;
}
```

## Data Set

Here is an example of a set that takes too long to solve.

{100000,60000,60000,60000,60000,60000,60000,60000,60000, 60000,60000,60000,60000,60000,60000,60000,60000,60000, 60000,60000,60000,60000,60000,60000,60000,60000,60000, 60000,60000,60000}

If you would like the entire source code, I have put it on Ideone.