# Variation on knapsack - minimum total value exceeding 'W'

Given the usual `n` sets of items (each unlimited, say), with weights and values:

``````w1, v1
w2, v2
...
wn, vn
``````

and a target weight `W`, I need to choose items such that the total weight is at least `W` and the total value is minimized.

This looks to me like a variation (or in some sense converse) of the integer/unbounded knapsack problem. Any help in formulating the DP algorithm would be much appreciated!

## 2 Answers

let `TOT = w1 + w2 + ... + wn`.

In this answer I will describe a second bag. I'll denote the original as 'bag' and to the additional as 'knapsack'

Fill the bag with all elements, and start excluding elements from it, 'filling' up a new knapsack with size of at most `TOT-W`, with the highest possible value! You got yourself a regular knapsack problem, with same elements, and bag size of `TOT-W`.

Proof:
Assume you have best solution with k elements: `e_i1,e_i2,...,e_ik`, then the bag size is at least of size `W`, which makes the excluded items knapsack at most at size `TOT-W`. Also, since the value of the knapsack is minimized for size `W`, the value of the excluded items is maximized for size `TOT-W`, because if it was not maximized, there would be a better bag of size at least `W`, with smaller value.
The other way around [assuming you have maximal excluded bag] is almost identical.

• Elegant, thanks! Time to implement this! – ragebiswas Oct 31 '11 at 17:13
• Came across the same problem, and this solution is so elegant. I'm impressed, really. Nice work. – seth May 23 '12 at 9:39

Not too sure, but this might work. Consider the values to be the -ve of the values you have. The DP formulation would try to find max value for that weight which would be the least negative value in this case. Once you have a value, take a -ve of it for the final answer.