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Algorithm to check for a linear sum to zero

Given a list of `N` non-negative integers, propose an algorithm to check if the sum of `X` numbers from the list equals the remaining `N-X`.

In other words, a simpler case of the Subset sum problem which involves the entire set.

An attempted solution

Sort the elements of the list in descending order. Initialize a variable `SUM` to the first element. Remove first element (largest, `a(1)`). Let `a(n)` denote the `n-th` element in current list.

While list has more than one element,

1. Make `SUM` equal to `SUM + a(1)` or `SUM - a(1)`, whichever is closest to `a(2)`. (where closest means `|a(2) - SUM_POSSIBLE|` is minimum).

2. Remove `a(1)`.

If the `SUM` equals `-a(1)` or `a(1)`, there exists a linear sum.

The problem

I cannot seem to resolve above algorithm, if it is correct, I would like a proof. If it is wrong (more likely), is there a way to get this done in linear time?

PS: If I'm doing something wrong please forgive :S

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Notice that you want the sum of `x` numbers to be equal to the sum of the other `N-x` numbers.
You can simplify this by saying you want to see if there's a subset which sums up to `S/2` where `S` is the total sum of the whole set.

So, you can calculate the Sum you need to get to with one iteration (O(n)).

Then just use a known algorithm like Knapsack to find a subset that meets your sum.

Another more "mathematical" explanation: Dynamic Programming – 3 : Subset Sum

Edit:

I think you missed the sorting part. `{3,3,4,4}` -> `{4,4,3,3}`, which would correctly pick `4-4=0` over `4+4=7` as `|0-3|=3 < |7-3|=4`. The proposed algorithm can be now be called on remainder of the list. The other part of your answer I understand, but I think the algorithm I proposed would be faster (if proven correct). Thanks for the lightning fast responses! – Furlox Jul 29 '12 at 7:09
I just saw Partition problem which is exactly what we're trying to do once we find `S` is even. As a bonus, my algorithm breaks on the greedy counter-example as well. A final thank you to Yochai :D – Furlox Jul 29 '12 at 7:44