# Generating linear combination of a matrix

I want to create a matrix A [4x8] as follows.

The matrix A always has `1` as its diagonal. `A11,A22,A33,A44 = 1`

This matrix can be considered as two halves with first half being the first 4 columns and the second half being the second 4 columns like something below :

``````        1 -1 -1 -1   1 0 0 1
A =  -1  1 -1  0   0 1 0 0
-1 -1  1  0   1 0 0 0
-1 -1 -1  1   1 1 0 0
``````

Each row in the first half can have either two or three -1's:

• if it has two `-1`'s then that corresponding row in the second half should have one `1`
• if any row has three `-1`'s the second half of the matrix should have two `1`'s.

The overall objective is to have the sum of each row to be `0`. I need to generate all possible combinations of a matrix like this.

It will be better if the matrix with new combination be created at each iteration so that after using it I can discard it or else storing all the combinations is very space intensive. Can anybody help me ?

one possible solution I could think of is to generate all possible combinations of row1, row2, row3 and row4 and create a matrix in each iteration. Does that look feasible?

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What have you tried already? What specifically are you having rouble with? –  Oliver Charlesworth Feb 3 '11 at 19:46
I could not get hold of an logic on how to do this. I'm still thinking. :( –  Sunil Feb 3 '11 at 19:49
possible duplicate of Linear combination of a matrix/vector –  Oliver Charlesworth Feb 3 '11 at 19:50
C'mon. The other question was also asked by me. I'm trying to do the same for a matrix. –  Sunil Feb 3 '11 at 19:51
@Oli Charlesworth: This is a similar problem, but much harder. –  Jonas Feb 3 '11 at 21:57

Here's one possible solution. If you ignore the diagonal ones for the moment, you can generate all possible patterns for the other 7 values using the functions KRON, REPMAT, PERMS, UNIQUE, EYE, and ONES:

``````>> rowPatterns = [kron(eye(3)-1,ones(4,1)) ...      %# For 2 out of 3 as -1
repmat(eye(4),3,1); ...           %# For 1 out of 4 as 1
repmat([-1 -1 -1],6,1) ...        %# For 3 out of 3 as -1
unique(perms([1 1 0 0]),'rows')]  %# For 2 out of 4 as 1

rowPatterns =

0    -1    -1     1     0     0     0
0    -1    -1     0     1     0     0
0    -1    -1     0     0     1     0
0    -1    -1     0     0     0     1
-1     0    -1     1     0     0     0
-1     0    -1     0     1     0     0
-1     0    -1     0     0     1     0
-1     0    -1     0     0     0     1
-1    -1     0     1     0     0     0
-1    -1     0     0     1     0     0
-1    -1     0     0     0     1     0
-1    -1     0     0     0     0     1
-1    -1    -1     0     0     1     1
-1    -1    -1     0     1     0     1
-1    -1    -1     0     1     1     0
-1    -1    -1     1     0     0     1
-1    -1    -1     1     0     1     0
-1    -1    -1     1     1     0     0
``````

Note that this is 18 possible patterns for any given row, so your matrix `A` can have 18^4 = 104,976 possible row patterns (quite a bit). You can generate every possible 4-wise row pattern index by using the functions NDGRID, CAT, and RESHAPE:

``````[indexSets{1:4}] = ndgrid(1:18);
indexSets = reshape(cat(5,indexSets{:}),[],4);
``````

And `indexSets` will be a 104,976-by-4 matrix with each row containing one combination of 4 values between 1 and 18, inclusive, to be used as indices into `rowPatterns` to generate a unique matrix `A`. Now you can loop over each set of 4-wise row pattern indices and generate the matrix `A` using the functions TRIL, TRIU, EYE, and ZEROS:

``````for iPattern = 1:104976
A = rowPatterns(indexSets(iPattern,:),:);  %# Get the selected row patterns
A = [tril(A,-1) zeros(4,1)] + ...          %# Separate the 7-by-4 matrix into
[zeros(4,1) triu(A)] + ...             %#   lower and upper parts so you
[eye(4) zeros(4)];                     %#   can insert the diagonal ones
%# Store A in a variable or perform some computation with it here
end
``````
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Thanks a lot. :) –  Sunil Feb 3 '11 at 21:26

Here is another solution (with minimal looping):

``````%# generate all possible variation of first/second halves
z = -[0 1 1; 1 0 1; 1 1 0; 1 1 1]; n = -sum(z,2);
h1 = {
[         ones(4,1) z(:,1:3)] ;
[z(:,1:1) ones(4,1) z(:,2:3)] ;
[z(:,1:2) ones(4,1) z(:,3:3)] ;
[z(:,1:3) ones(4,1)         ] ;
};
h2 = arrayfun(@(i) unique(perms([zeros(1,4-i) ones(1,i)]),'rows'), (1:2)', ...
'UniformOutput',false);

%'# generate all possible variations of complete rows
rows = cell(4,1);
for r=1:4
rows{r} = cell2mat( arrayfun( ...
@(i) [ repmat(h1{r}(i,:),size(h2{n(i)-1},1),1) h2{n(i)-1} ], ...
(1:size(h1{r},1))', 'UniformOutput',false) );
end

%'# generate all possible matrices (pick one row from each to form the matrix)
sz = cellfun(@(M)1:size(M,1), rows, 'UniformOutput',false);
[X1 X2 X3 X4] = ndgrid(sz{:});
matrices = cat(3, ...
rows{1}(X1(:),:), ...
rows{2}(X2(:),:), ...
rows{3}(X3(:),:), ...
rows{4}(X4(:),:) );
matrices = permute(matrices, [3 2 1]);              %# 4-by-8-by-104976

%#clear X1 X2 X3 X4 rows h1 h2 sz z n r
``````

Next you can access the 4-by-8 matrices as:

``````>> matrices(:,:,500)
ans =
1    -1    -1    -1     0     1     0     1
-1     1    -1     0     0     0     1     0
0    -1     1    -1     0     0     1     0
0    -1    -1     1     0     0     0     1
``````

We could also confirm that all rows in all matrices sum to zero:

``````>> all(all( sum(matrices,2)==0 ))
ans =
1
``````
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Thank you Amro. Works perfect. –  Sunil Feb 3 '11 at 23:55
+1 for using NDGRID to create the indices. That's more straight-forward (and faster) than the DEC2BASE algorithm I used. –  gnovice Feb 4 '11 at 4:25