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I have written a code to generate a matrix with four columns to get all combinations of numbers whose sum is equal to 9 and each number varies from 0 to 9.

m = zeros(220, 4);
pd = 9;
i = 1;
for p = 0:1:pd
    for q = 0:1:pd-p
        for a = 0:1:pd-q-p
            m(i,:) = [p, q, a, pd-a-q-p];
            i = i+1;
        end
    end
end
m

Now i want filter the arrays with no zero, one zero, two zeros, three zeros. Like, Three zero case

0 0 0 9

Two zero case

0 0 1 8
0 0 2 7
.
.
0 0 8 1

One zero case

0 1 1 7
0 1 2 6
.
.
.
0 7 1 1

and no zero case

1 1 1 6
1 1 2 5
.
.
6 1 1 1

and so on..

Any suggestions to do that or any alternative method ?
Update:

0 0 0 9
0 0 1 8
0 0 2 7
    .
    .
0 0 8 1
0 1 1 7
0 1 2 6
    .
    .
    .
0 7 1 1
1 1 1 6
1 1 2 5
    .
    .
6 1 1 1

Any suggestions to get the matrix m in the above order?

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3  
I may overlook something - but aren't you producing the matrix in this specific order? –  bdecaf Jan 17 '13 at 14:06

4 Answers 4

This is the best I can do right now, and I haven't tested it on your entire input matrix

m(sum(m == 0, 2) == N, :)

should return the rows of m which contain N 0s.

EDIT: following your update, here's a suggestion for the complete code:

A = zeros(size(m));
k = 1;
for N = (size(m, 2) - 1):-1:0
    rows = (sum(m == 0, 2) == N);
    idx = k:k + sum(rows) - 1;
    A(idx, :) = m(rows, :);
    k = idx(end) + 1;
end
share|improve this answer
    
@High Performance Mark Thank you for your quick reply. Can you please see my question update –  noufal Jan 17 '13 at 13:41
    
@noufal Use a for loop and iterate N from 3 to 0. How hard can it be? –  Eitan T Jan 17 '13 at 14:58
    
@EitanT Sorry, I didn't get you.. –  noufal Jan 17 '13 at 15:36
    
@noufal, The code Mark has provided you extracts all rows with N zeros. All you have to do now is do a for loop that runs from 3 to 0 ,i.e for N = 3:-1:0, and execute this line in each iteration (possibly appending the result to some final matrix, if you wish). –  Eitan T Jan 17 '13 at 15:40
    
@EitanT I got it. –  noufal Jan 17 '13 at 15:46

To sort by the number of leading zeros in a row, all you need is sortrows(m).

To sort by the total number of zeros in a row, use High Performance Mark's answer.

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@EitanT You're right. I updated my answer. –  shoelzer Jan 17 '13 at 15:18
    
shoelzer I see the logic for interpreting the question the way you did. The given example is a bit misleading. Have a +1 anyway. –  Eitan T Jan 17 '13 at 15:21
    
@EitanT Thank you, sir! –  shoelzer Jan 17 '13 at 15:28

You can use the following function to get all rows of matrix A that have n zeros:

function rows = nzrows(A, n)
  s = sum(A == 0, 2);
  rows = A(s == n, :);
end
share|improve this answer

This is what I came up with:

zero_index =[];
one_index =[];
two_index =[];
three_index =[];

for i=1:size(m,1)
    if(sum(m(i,:)==0)==0)
        zero_index = [zero_index    i];
    end
    if(sum(m(i,:)==0)==1)
        one_index = [one_index  i];
    end
    if(sum(m(i,:)==0)==2)
        two_index=  [two_index i];
    end

    if(sum(m(i,:)==0)==3)
        three_index =   [three_index i];
    end

end

m(zero_index,:)
m(one_index,:)
m(two_index,:)
m(three_index,:)

Hope it helps.

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1  
It is generally considered bad practice to use dynamic allocation in MATLAB. More specifically, you're matrices zero_index, one_index etc... are growing inside the for loop. You should preallocate memory for them instead. –  Eitan T Jan 17 '13 at 14:48
    
@EitanT In my question I have preallocated, because I know the size of resulting matrix, What to do if we are not certain about the size of matrix? –  noufal Jan 17 '13 at 15:51
    
@noufal Then over-preallocate and then remove the unnecessary part. In most cases you can at least bound the dimensions of the matrix if you cannot determine its final size. –  Eitan T Jan 17 '13 at 15:57
1  
@EitanT, Thank you so much. I will take care of it –  Kiran Jan 17 '13 at 17:09

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