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I am trying to come up with the solution for a problem analogous to the following:

  • Let M be a matrix of n rows and T columns.
  • Let each row have positive non-decreasing values. (e.g. row = [1, 2, 30, 30, 35])
  • Let M[i][j] correspond to the score obtained by spending j units of time on exam i.

Using dynamic programming, solve the problem as to find the optimal way of spending T units of time to study which will yield the highest total score.

Thanks in advance for any help :)

My attempt:

S[][] = 0

for i = 1:n
   for j = 0:T
       max = 0
       for k = 0:j
           Grade = G[i][j]+ S[i-1][T-k]
           if Grade > max
              max = Grade
       end for
       S[i][j] = max
    end for
end for
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2 Answers 2

up vote 6 down vote accepted

Let S[i][j] represent the best score you can achieve spending j units of time on the first i exams. You can calculate S[i][j] by looking at S[i-1][k] for each value of k. For each element of S, remember the value of k from the previous row that gave the best result. The answer to what the best score for studying all exams in time T is just S[n][T], and you can use the values of k that you remembered to determine how much time to spend on each exam.

S[][] = 0

for j = 0:T
   S[0][j] = M[0][j]

for i = 1:n
   for j = 0:T
       max = 0
       for k = 0:j
           # This is the score you could get by spending j time, spending
           # k time on this exam and j-k time on the previous exams.
           Grade = S[i-1][j-k] + M[i][k]
           if Grade > max
              max = Grade
       end for
       S[i][j] = max
    end for
end for
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Could you express this idea in the form a pseudo-code please? I have been trying to write something similar but I confuse myself and it leads me nowhere... –  Pi_ Nov 23 '12 at 20:46
    
@Pi_: Could you add an example of what you have tried to your question? –  Vaughn Cato Nov 23 '12 at 20:55
    
@Pi_: I've added some pseudocode in a form similar to yours, which I believe works better. –  Vaughn Cato Nov 23 '12 at 21:13
1  
I wrapped my head around it, thank you! (There's a tiny typo, it should be for j = 0:T). –  Pi_ Nov 23 '12 at 23:45
    
@VaughnCato, for i = 1:n (where matrix indices are 0-based) does not iterate over a n-row matrix, but a n+1-row matrix. Idem with for j = 0:T, that's a T+1 column matrix. :) –  vladr Nov 24 '12 at 0:13

I assume that vy G and M in your problem you mean the same thing, and that you get 0 score if you do not spend any time at all for an exam.

In this case, I would define the DP matrix as D[i,t] = best score achievable by spending t total units of times on a subset of the exams from 0 to i.

W.l.o.g. you can assume the first column of the matrix to be all 0s.

In this case, you can observe that D satisfies the following recurrence:

  • D[0, t] = M[0, t]
  • D[i, t] = max_{0 <= k <= t} (M[i, k] + D[i-1, t-k])

which is what you need to apply dynamic programming

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