# Variation on knapsack algorithm

I think this might be a variation of the multiple knapsack problem (or maybe even could be reduced to it) but I'm not sure. Here's the problem:

You have a set of items with known values and weights. You also have a set of knapsacks, and each knapsack can hold a fixed number of items (different knapsacks might be able to hold different numbers of items). Maximize total value of items in knapsacks while staying under a given weight.

Note that the individual knapsacks don't have a weight restriction. Each knapsack only has a "number of items it can contain" restriction. The only other restriction is the total weight of the items.

Any ideas?? (other than brute force of course). Thanks in advance! :)

EDIT: one important restriction I forgot to include:

Items can't necessarily be put into any bag. Essentially their value becomes zero if they are put into a bag they aren't compatible with. You can imagine a general case where each item has a value dependent on its bag, but for my case, its value will either be 0 or it's normal value, depending on the bag.

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Is this homework? If so, we should tag is as such. What have you tried? – Jonathan M Apr 11 '12 at 20:59
Uh - homework? :) Probably gonna get some hate here. – SinisterRainbow Apr 11 '12 at 20:59
This IS `Knapsack` if you treat all the different Knapsacks as a single Knapsack it's the same. There are many ways to approximate Knapsack I'm sure you can find them if you do a google search. – twain249 Apr 11 '12 at 20:59
@SinisterRainbow, we don't hate homework. We just hate it when folks don't show they've put out any effort. :) – Jonathan M Apr 11 '12 at 21:01
Homework? No... I've been out of school for a long time :-) Just a theoretical thought experiment I had when deciding whether or not I could write a program to solve a problem like this. I did some research on matching algorithms which led me to the knapsack problem. This seemed similar to that, but I don't know enough about algorithms to know the best way to approach a problem like this. What else would you like me to provide? – Kenny Apr 11 '12 at 21:40