I'm asked to find a 2 approximate solution to this problem:

You’re consulting for an e-commerce site that receives a large number of visitors each day. For each visitor i, where i € {1, 2 ..... n}, the site has assigned a value v[i], representing the expected revenue that can be obtained from this customer.

Each visitor i is shown one of m possible ads A1, A2 ..... Am as they enter the site. The site wants a selection of one ad for each customer so that each ad is seen, overall, by a set of customers of reasonably large total weight.

Thus, given a selection of one ad for each customer, we will
define the *spread* of this selection to be the minimum, over j = 1, 2 ..... m,
of the total weight of all customers who were shown ad Aj.

Example: Suppose there are six customers with values 3, 4, 12, 2, 4, 6, and there are m = 3 ads. Then, in this instance, one could achieve a spread of 9 by showing ad A1 to customers 1, 2, 4, ad A2 to customer 3, and ad A3 to customers 5 and 6.

The ultimate goal is to find a selection of an ad for each customer
that *maximizes* the spread.

Unfortunately, this optimization problem is NP-hard (you don’t have to prove this).

So instead give a polynomial-time algorithm that approximates the maximum spread within a factor of 2.

The solution I found is the following:

```
Order visitors values in descending order
Add the next visitor value (i.e. assign the visitor) to
the Ad with the current lowest total value
Repeat
```

This solution actually seems to always find the optimal solution, or I simply can't find a counterexample. Can you find it? Is this a non-polinomial solution and I just can't see it?