Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

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

share|improve this question
up vote 1 down vote accepted

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


As an answer to your other question, your algorithm is wrong. consider this list of numbers:


The total sum is 14, so you're looking for a subset with the sum of 7. Obviously it will be 3+4.

Your algorithm will return false after examining the 2 3's

share|improve this answer
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

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.