# concatenation of N^2 3x3 matrixes into a 3Nx3N matrix

I have N^2 matrixes. Each one is a 3x3 matrix. One way to concatenation them to a 3Nx3N matrix is to write `A(:,:,i)= # 3x3 matrix i=1:N^2`

`B=[A11 A12 ..A1N;A21 ...A2N;...]` But When N is large is a tedious work. What do you offer?

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I had a related Quastion befor that lead to this, It was :stackoverflow.com/questions/4889496/3n-linear-equations – Abolfazl Feb 4 '11 at 12:48

Here's a really fast one-liner that only uses RESHAPE and PERMUTE:

``````B = reshape(permute(reshape(A,3,3*N,N),[2 1 3]),3*N,3*N).';
``````

And a test:

``````>> N=2;
>> A = rand(3,3,N^2)
A(:,:,1) =
0.5909    0.6571    0.8082
0.7118    0.6090    0.7183
0.4694    0.9588    0.5582
A(:,:,2) =
0.1791    0.6844    0.6286
0.4164    0.4140    0.5833
0.1380    0.1099    0.8970
A(:,:,3) =
0.2232    0.2355    0.1214
0.1782    0.6873    0.3394
0.5645    0.4745    0.9763
A(:,:,4) =
0.5334    0.7559    0.9984
0.8454    0.7618    0.1065
0.0549    0.5029    0.3226

>> B = reshape(permute(reshape(A,3,3*N,N),[2 1 3]),3*N,3*N).'
B =
0.5909    0.6571    0.8082    0.1791    0.6844    0.6286
0.7118    0.6090    0.7183    0.4164    0.4140    0.5833
0.4694    0.9588    0.5582    0.1380    0.1099    0.8970
0.2232    0.2355    0.1214    0.5334    0.7559    0.9984
0.1782    0.6873    0.3394    0.8454    0.7618    0.1065
0.5645    0.4745    0.9763    0.0549    0.5029    0.3226
``````
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+1: That's even nicer than my version! – Jonas Feb 4 '11 at 15:48
I can confirm this is an order of magnitude faster +1 – Amro Feb 4 '11 at 15:57
Wow, that's sweet. +1 – Rich C Feb 4 '11 at 16:14
+1: Nice and Fast! – Abolfazl Feb 4 '11 at 18:22

Try the following code:

``````N = 4;
A = rand(3,3,N^2);                     %# 3-by-3-by-N^2

c1 = squeeze( num2cell(A,[1 2]) );
c2 = cell(N,1);
for i=0:N-1
c2{i+1} = cat(2, c1{i*N+1:(i+1)*N});
end

B = cat(1, c2{:});                     %# 3N-by-3N
``````
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Another possibility involving `mat2cell` and `reshape`

``````N = 2;
A = rand(3,3,N^2);

C = mat2cell(A,3,3,ones(N^2,1));
C = reshape(C,N,N)'; %'# make a N-by-N cell array and transpose

%# catenate into 3N-by-3N cell array
B = cell2mat(C);
``````

Here's the same in one line if you like that better

``````B = cell2mat(reshape(mat2cell(A,2,2,ones(N^2,1)),N,N)');
``````

For N=2

``````>> A = rand(3,3,N^2)
A(:,:,1) =
0.40181      0.12332      0.41727
0.075967      0.18391     0.049654
0.23992      0.23995      0.90272
A(:,:,2) =
0.94479      0.33772       0.1112
0.49086      0.90005      0.78025
0.48925      0.36925      0.38974
A(:,:,3) =
0.24169      0.13197      0.57521
0.40391      0.94205      0.05978
0.096455      0.95613      0.23478
A(:,:,4) =
0.35316     0.043024      0.73172
0.82119      0.16899      0.64775
0.015403      0.64912      0.45092

B =
0.40181      0.12332      0.41727      0.94479      0.33772       0.1112
0.075967      0.18391     0.049654      0.49086      0.90005      0.78025
0.23992      0.23995      0.90272      0.48925      0.36925      0.38974
0.24169      0.13197      0.57521      0.35316     0.043024      0.73172
0.40391      0.94205      0.05978      0.82119      0.16899      0.64775
0.096455      0.95613      0.23478     0.015403      0.64912      0.45092
``````
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Why not do the old fashioned pre-allocate and loop? Should be pretty fast.

``````N = 4;
A = rand(3,3,N^2);  % Assuming column major order for Aij
8
B = zeros(3*N, 3*N);
for j = 1:N^2
ix = mod(j-1, N)*3 + 1;
iy = floor((j-1)/N)*3 + 1;
fprintf('%02d - %02d\n', ix, iy);
B(ix:ix+2, iy:iy+2) = A(:,:,j);
end
``````

EDIT: For the speed junkies out here are the rankings:

``````N = 200;
A = rand(3,3,N^2);  % test set

@gnovice solution: Elapsed time is 0.013069 seconds.
@Amro    solution: Elapsed time is 0.203308 seconds.
@Rich C  solution: Elapsed time is 0.887077 seconds.
@Jonas   solution: Elapsed time is 7.065174 seconds.
``````
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