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.

I am trying to solve this problem from SPOJ, it's a dynamic programming problem, but I'm having trouble visualizing the recursive step. I believe it's similar to a knapsack, but here there are two constraints of Oxygen and Nitrogen.

Here is the link: http://www.spoj.pl/problems/SCUBADIV/

share|improve this question
1  
So, what is your question? What have you tried? –  Mat Jul 27 '11 at 19:00

2 Answers 2

up vote 5 down vote accepted

This should work I think:

dp[i, j] = minimum weight needed such that we have i litres of oxygen and j litres 
           of nitrogen

dp[0, 0] = 0 and inf everywhere else
for each read cylinder k do
  for i = maxTotalOxygen down to oxygen[k] do
    for j = maxTotalNitrogen down to nitrogen[k]  do
      dp[i, j] = min(dp[i, j],                                       <- do not take cylinder k
                     dp[i - oxygen[k], j - nitrogen[k]] + weight[k])  <- take cylinder k 

Answer is the minimum dp[i, j] such that i >= RequiredOxygen and j >= RequiredNitrogen.

Note that the for loops must go from the max down to the values of the current cylinder, otherwise you allow a cylinder to be used more than once.

The problem constraints are very small and I think this should work.

share|improve this answer
    
I don't understand why the loop must go downwards. It should have the same effect if it was increasing right? –  user866098 Jul 27 '11 at 19:20
1  
@user866098 - no, if it is increasing, then if you use cylinder k in the computation of a certain [i, j], k could also have been used to compute [i - oxygen[k], j - oxygen[k]], so it means you use it twice for [i, j], which isn't allowed by the SPOJ problem (although a problem that does allow it is perfectly valid as well). –  IVlad Jul 27 '11 at 19:37
    
Thanks for your help! But I'm still not very clear. –  user866098 Jul 27 '11 at 20:02
    
@User866098 - try running it manually on a small test. If you use a certain cylinder x where oxygen[x] = 2 and nitrogen[x] = 4 to find dp[3, 5] for example, you might also use it to find dp[5, 9] if you go ascendingly in the for loops, which you don't want to, because it would mean you used it twice for dp[5, 9]. –  IVlad Jul 27 '11 at 20:48
    
Shouldn't the inital values be 0 instead of infinity? Because: dp[5, 9] = min(dp[5,9],dp[3, 5] + weight[k]). If dp[3, 5] is infinity initially, then inf + weight[k] will be wrong right? –  user866098 Jul 28 '11 at 5:31

@IVlad very nice answer, thank you :)

However there's a catch:

The following should be removed :

dp[oxygen[i], nitrogen[i]] = weight[i] for each cylinder i and inf otherwise

And use this instead :

dp[0][0] = 0 and inf otherwise

The former statement is not a valid base case because it allows cylinders to be used twice.

How ?

The invariant of the outermost loop is that at the N th iteration (of k), we try for every i,j to compute the minimum weight that can be achieved to obtain at least i oxygen and j nitrogen using only cylinders 1 to N (each one used once)

Consider the following test case where 2 oxygen and 2 nitrogen is required and we have 2 cylinders one with 1 ox 1 ni 1 weight, the other is 2 ox 2 ni 50 weight

2 2

2

1 1 1

2 2 50

The answer should be 50 simply because we can't use the 1st cylinder twice.

The base case that i claim wrong will fill d[1][1] = 1 before we even start the loops. Then the loop starts with k=0 (use first cylinder and see if it helps in any entry), then d[2][2] will equal d[2-1][2-1]+1 = d[1][1] + 1 = 2

The final answer will be 2 units of weight because 1st cylinder was used twice due to the base case and this is not correct.

share|improve this answer

Your Answer

 
discard

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.