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,

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).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