Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.


-A set of items that each have costs for being placed into a given container type.

-A set of container types that each have a number of available containers.


Amount*Container-Type : 5 * A, 3 * B, 2 * C

Items(Costs) :

3 * X (A=2, B=3, C=1)

2 * Y (A=5, B=2, C=2)

1 * Z (A=3, B=3, C=1)


Find the best placement of the items into the containers so that the costs are minimal. For simplicity, only place an item into a single type of container.

I tried the hungarian method to solve the problem, but with a runtime of O(n³), it's quite prohibitive for large problems (e.g., 100000 items).

My current solution is a greedy approach, that just orders the item-container combinations by costs (asc) and assigns the first container with a sufficient amount left in O(n log n).

Is there a better solution?

share|improve this question
add comment

4 Answers

This problem is a variant of the Knapsack problem, start at the Wikipedia page and read on from there.

The greedy algorithm is known to be a reasonably good appoximation, so you are probably good enough.

share|improve this answer
add comment

Nahively I would go for a genetic aproach, given that genomes are easy to generate, mutate and cross-breed. but there may be an optimal non-combinatory solution.

share|improve this answer
Well, the poster wasn't specific in the nature of the answer he wanted, granted, but I imagine he'd want something provably minimal, which he should specify. Not sure this really fits the bill. –  cletus Feb 6 '09 at 14:25
Agreed, but some problems (and it seems this one is NOT the case) are well known to be hard to solve using just mathematics, and in those cases a genetic algorithm surely classifies as simple. –  krusty.ar Feb 6 '09 at 14:43
add comment

If I understood your problem right, you only need some maths:


share|improve this answer
add comment

Have you tried writing the assignment problem as a linear program and solving it using the simplex algorithm?

share|improve this answer
The trouble with this is he's in the integer domain, which turns it into Integer Linear Programming which can't use the simplex algorithm. Otherwise it's the right solution. –  Nick Fortescue Feb 6 '09 at 16:52
add comment

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.