Related questions:

Let's assume I have a list, which contains exactly `2k`

elements. Now, I'm willing to split it into two parts, where each part has a length of `k`

while trying to make the **sum of the parts as equal as possible.**

*Quick example:*
`[3, 4, 4, 1, 2, 1]`

might be splitted to `[1, 4, 3] and [1, 2, 4]`

and the sum difference will be `1`

Now - if the parts can have arbitrary lengths, this is a variation of the **Partition problem** and we know that's it's weakly `NP-Complete.`

But does the restriction about splitting the list

into equal parts(let's say it's always`k`

and`2k`

) make this problem solvable in polynomial time? Any proofs to that (or a proof scheme for the fact that it's still`NP`

)?