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here is another dynamic programming problem that find the maximum L(chess horse - 4 item) sum in the given matrix (m x n)

For example :

1 2 3

4 5 6

7 8 9

L : (1,2,3,6), (1,4,5,6), (1,2,5,8), (4,5,6,9) ...

and the biggest sum is sum(L) = sum(7,8,9,6) = 30

what is the O(complexity) of the optimal solution ?

it looks like this problem (submatrix with maximum sum)

  1. Say all items are positive

  2. Both positive and negative

Any ideas are welcome!

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Where did you come across this problem? It might be helpful if you provide some context. –  MAK Dec 21 '10 at 8:34
    
all items are positive? –  Saeed Amiri Dec 21 '10 at 8:35
    
@MAK it comes to my mind :) I have also hard version of it. I'm working on and will post in a few days. I don't know maybe there is a problem like that on the web –  user467871 Dec 21 '10 at 8:43
    
@Saeed 1. say positive 2. both(+ and -). I'm now editing –  user467871 Dec 21 '10 at 8:44
    
@hilal are all the rows in the matrix ordered ? –  msalvadores Dec 21 '10 at 11:29

1 Answer 1

up vote 4 down vote accepted

If your L is constant size (4 elements, as you say), just compute its sum over all < n*m positions and find the maximum one. Repeat for the 8 different orientations you could have. That's O(nm) overall.

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looks like brute-force –  user467871 Dec 21 '10 at 16:59
1  
It is brute force. –  Keith Randall Dec 21 '10 at 17:36
    
Omega(nm) is a trivial lower bound, you need to look at every element in the array. –  Keith Randall Dec 21 '10 at 17:38
    
This is correct for the problem as stated. If the L is constant size it is a trivial problem. –  Chris Hopman Dec 22 '10 at 9:41
2  
@hilal: Sometimes brute force is the only answer, in which case it's the right answer :) –  j_random_hacker Dec 22 '10 at 10:20

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