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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

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?

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Some information is missing. Just assign one ad to the minimum value customer and split the rest among the others. By spread did you mean max-min? The usage of spread makes more sense in that case... And 'reasonably large total weight' is not precise enough. – Aryabhatta Jun 12 '10 at 13:16
That is exactly what os written in my textbook. Yes By spread it means max-min. – Mokuchan Jun 12 '10 at 13:28
I suggest you edit your question to reflect that. – Aryabhatta Jun 12 '10 at 13:34
Wait sorry I was wrong. The spread is the minimum value and you have to maximize it, as it clearly say: "The ultimate goal is to find a selection of an ad for each customer that maximizes the spread.". – Mokuchan Jun 12 '10 at 13:35
Ok. That makes more sense then! Funny how one misses whole sentences. – Aryabhatta Jun 12 '10 at 13:51

1 Answer 1


v = [7, 6, 5, 3, 3]
m = 2

The optimal solution is:

A1: 6 + 3 + 3 = 12
A2: 5 + 7 = 12

Your solution gives:

A1: 7 + 3 + 3 = 13
A2: 6 + 5 = 11
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thank you so much!! I tried a lot of different cases but couldn't come up with one not working! Now I can finally start to prove it's 2-approximate :D – Mokuchan Jun 12 '10 at 13:32

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