3

This question already has an answer here:

Let's say I have a matrix in MATLAB like

A = [1 2 3; 
     4 5 6; 
     7 8 9]

and I would like to obtain a matrix of the form

B = [1 0 0;  
     0 4 0; 
     0 0 7;
     2 0 0;
     0 5 0;
     0 0 8;
     3 0 0;
     0 6 0;
     0 0 9]

i.e. a matrix that is a concatenation of three diagonal matrices, with each having the columns of matrix A at their diagonals. I know how to do this using a for loop over the columns of A and then concatenating all the results but I am looking for a shorter way to do this. Please share your ideas.

marked as duplicate by Eitan T, Shai, bla, Simon Dorociak, Jean-Bernard Pellerin May 7 '13 at 0:14

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3
B(repmat(eye(3),3,1)==1) = A;
reshape(B, [], 3)
  • 1
    It should be repmat(eye(3),3,1) I think... – tmpearce May 5 '13 at 22:25
  • @tmpearce yes I'll edit. – Dan May 6 '13 at 6:19
  • @Shai You do, otherwise it comes out as a vector – Dan May 6 '13 at 6:20
  • What if A was a matrix of dimensions (x,y)? – Erol May 6 '13 at 18:29
  • @Erol if x and y differ then you need to redefine your probelm, otherwise simply replace all the 3s with n such that n = size(A, 1) – Dan May 6 '13 at 20:29
3

Here's a way using linear indexing:

B(sub2ind([9 3], 1:9, mod(0:8,3)+1))=A;
reshape(B,9,3)

If you want this to be generic, realize that each column of the original becomes a diagonal. Therefore, the number of rows in the original becomes the number of columns in the output, and 3 rows x cols becomes the number of rows. The rest of the answer doesn't change at all:

c = size(A,1);
r = size(A,1) * size(A,2); #% or prod(size(A));
B(sub2ind([r c], 1:r, mod(0:(r-1),c)+1)) = A;
  • What if A was a matrix of dimensions (x,y)? – Erol May 6 '13 at 18:29
  • @erol See edit: it generalizes easily – tmpearce May 6 '13 at 22:12
  • Thank you. Yours works as well but I had to accept one so I went with the one easiest to understand. – Erol May 7 '13 at 11:46
3
B = sparse( 1:numel(A), repmat( 1:size(A,2), [1 size(A,1)] ),...
            A(:), numel(A), size(A,2));

should do the trick.

You can B = full(B); if you want a full matrix

  • What if A was a matrix of dimensions (x,y)? – Erol May 6 '13 at 18:29
  • @Erol have you tried the code with arbitrary A? the solution should work as-is for any A. – Shai May 6 '13 at 19:38
  • Thank you. Yours works as well but I had to accept one so I went with the one easiest to understand. – Erol May 7 '13 at 11:42
  • @Erol - glad I could help. – Shai May 7 '13 at 11:44

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