I have the following problem and can not think of a way around without for loops.

Consider two matrices:

a=rand(N,3), b=rand(3,N)

What I want to get is: b(:, i)*a(i, :) (a 3*3 matrix) concatenated in the third dimension for all i.

Thus for the above example the result should be a (3*3*N) matrix.

  • No it is (3x1)*(1x3) -> 3x3 b has N columns which are vectors 3x1 and a has N rows which are vectors 1x3 – Paramar Feb 13 '17 at 15:37
  • I am sure there is a very nice solution using kron and reshape but I can not figure it out. Else just loop it – Ander Biguri Feb 13 '17 at 15:42
  • Are you sure the correction you made is correct? I think it is a multiplication of a 1x3 x 3x1 ->1x1. By the way the kronecker product seems to make more computations than necessary here. You can see it from their dimensions 3x3xN and 3Nx3N. – Paramar Feb 13 '17 at 15:53
  • You are absolutely right, I apologize. I would just loop this, it seems the most straightforward solution and MATLAB has gotten quite good in computational times with loops – Ander Biguri Feb 13 '17 at 15:57
  • This would allow you to do it efficiently in one line: mathworks.com/matlabcentral/fileexchange/… – jez Feb 13 '17 at 16:05

Matlab R2016b version:

c = reshape(a.',[1,3,N]) .* reshape(b,[3,1,N]);

Earlier Matlab versions:

c = repmat(reshape(a.',[1,3,N]),[3,1,1]) .* repmat(reshape(b,[3,1,N]),[1,3,1]);

edit: Here is a quick benchmark on Matlab R2016b (Win7x64). Speedup of vectorization is around a factor of 50.

Benchmark on R2016b (Win7x64)

  • ah! exploiting broadcasting! neat. – Ander Biguri Feb 13 '17 at 17:56
  • 1
    Thanks! :) I added a benchmark to show the speedup. I think it's worth it... – Florian Feb 13 '17 at 18:12
  • @AnderBiguri What is broadcasting? Never heard of it before. Is this the definition? Just curious. Thanks. – codeaviator Feb 13 '17 at 23:50
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    @Cebri No its not, and maybe officially MATLAB uses another name for it, broadcasting is definitely the one used in Python. I could explain but this python tutorial is very nice. In MATLAB < 2016b this would be a matrix dimensions mismatch but now MATLAB can deal with it. In short, when matrices are not the same size one of them is repeated as many times as needed automatically – Ander Biguri Feb 14 '17 at 10:32
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    In Matlab parlance, it is called Binary Singleton Expansion. From R2016 onward, Matlab does it automatically, before you had to call bsxfun or use repmat like I did. – Florian Feb 14 '17 at 11:44

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