# What is an efficient algorithm for simulating purchasing decisions?

I'm attempting to code a simple game-like simulation of a consumer purchasing products. I'm looking for am algorithm that satisfies the following:

## Inputs:

• An amount of money that the consumer has to spend
• A collection of Want scores, W1...Wn (where a higher value means the consumer wants that more)
• A collection of Products, where each product has:

• A collection of Want scores, S1...Sn (where the value corresponds to how well the product satisfies that particular want)
• A price
• A number in stock

## Output:

A set of pairs of the form (Product, NumberToBuy). The amount that the products satisfy the wants of the consumer will be subtracted from the values W1...Wn, so the "perfect" solution is one where the resulting sum of W1...Wn will be a minimum.

The set must also satisfy the following absolute constraints:

• NumberToBuy is less than or equal to the number of that product in stock.
• The sum over the entire set of the price of the product multiplied by the number of that product to buy is less than or equal to the money that the consumer has.

If there are multiple solutions that result in W1...Wn being at the same minimum, the best would be the one of those where the sum of the price of all of the products to purchase was the lowest. Price is a secondary concern to satisfying wants, however.

## Notes:

• There is no benefit to "oversatisfying" a want - the want values cannot drop below 0 - but there is also no inherent penalty for oversatisfying a want either, other than you're spending money for no benefit.
• Efficiency trumps finding an optimal solution, within reason - a quick algorithm that finds a "pretty good" solution but which is not necessarily the optimal solution is better than a much slower algorithm which finds an optimal solution. Ideally, though, I'd like to come up with something that is somewhere close to the optimal solution (i.e. where the consumer doesn't make decisions that are blatantly sub-optimal, like choosing to buy the more expensive of two products that are otherwise identical).

One brute-force approach to this problem would be to enumerate all possible combinations of products that can be purchased that satisfy the absolute constraints, then take the one that best satisfies the customer's wants, but this would very quickly become far too slow as the number of products available to the consumer increases.

Does anyone have an idea of an efficient approach?

## Bonus:

I'd also be interested if anybody can think of either a separate algorithm/approach or a modification on an algorithm for the above problem, where the goal is not to minimize the sum of W1...Wn, but rather the sum of the squares of W1...Wn - i.e. reducing high want values is more important than reducing low want values.

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The problem is NP-Complete (it's essentially the same as the knapsack problem). As such, you can assume that you will not be able to find an answer that is both efficient and perfect. Still, en.wikipedia.org/wiki/Knapsack_problem might help you. –  Ben Barden Mar 7 '12 at 18:54
I had a feeling it was NP complete, but I couldn't figure out what problem it could be mapped to. The Knapsack problem seems to fit the bill quite well, and the approach I have been toying with was essentially a modification of the Greedy Approximation algorithm (en.wikipedia.org/wiki/…). The other approaches and considerations listed there may prove useful. Thanks for the link. –  Blobinator Mar 7 '12 at 19:30
@Blobinator: There is also a pseudo-polynomial solution, using dynamic programming, how big is the amount of max money? –  amit Mar 7 '12 at 20:55
I hadn't planned for there to be a limit on the max amount of money. This would be run for a number of rounds, and each round the consumer would have a fixed "salary" added to whatever amount of money they have. It would start at zero, so on the first round they would have their salary, on the second and beyond they'd have their salary plus what was left over from the previous round. But there could be an arbitrary maximum put on their total money, if having such a maximum helps. –  Blobinator Mar 7 '12 at 21:17