Part of my problem is to minimise the absolute value of the weighted sum of certain numbers. I have to find the weights.

Let's say I have a set of numbers A, a1, a2, a3 and a4, such that(a1, a2 > 0), (a3, a4 < 0)

Minimum weight is, say, 0.1 (10%), maximum is 0.4 (40%). I am looking for weights **w** in such a way that the weighted sum is zero; if zero is not possible, then the closest possible to zero. A simple linear model can be used to achieve this:

```
Minimise E
E >= SUM w * a
E >= -(SUM w * a)
SUM w = 1
w >= 0.1 for all w
w <= 0.4 for all w
```

A simple linear program is enough to find the solution very fast. However, I would very much like to find a polynomial algorithm or formula for this problem. Any ideas? Is this problem well known?

Thanks!