Matrix Multiplication Along Pages of Multidimensional Matrix

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What is the most efficient way of matrix-multiplying along a page (2d plane) of a multidimensional matrix. Speed is important here as this operation will be in the objective-function of a calibration.
Specifically I have a 4d matrix of dimension [m,n,p,2], and I want to matrix-multiply it by a [2x1] vector
So conceptually I need
b*y0'
Taking for example:
b = rand(5,3,4,2); %
y0 = [0.1;0.2]; y0 = reshape(y0,[1,1,1,2]); %
I should end up with a 3d matrix of size [5,3,4]
I could, of course, dot-multiply by a repmatted y0 and then sum along the 4d but is this really the most efficient?
y0 = y0(ones(5,1,1),ones(1,3,1),ones(1,1,4),:);
sum(b.*y0,4);
All the best

Respuesta aceptada

Matt J
Matt J el 27 de Ag. de 2014
If size(b,4)=2 all the time, it would probably be best just to generate two separate 3D arrays b1 and b2
result=b1*y0(1)+b2*y0(2);
  2 comentarios
Matt J
Matt J el 27 de Ag. de 2014
Note, this is different from (and faster than)
result=b(:,:,:,1)*y0(1)+b(:,:,:,2)*y0(2);
Mark Whirdy
Mark Whirdy el 27 de Ag. de 2014
you're right - talk about overengineering :-D
thanks!

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Más respuestas (2)

Matt J
Matt J el 27 de Ag. de 2014
Editada: Matt J el 27 de Ag. de 2014
I could, of course, dot-multiply by a repmatted y0 and then sum along the 4d but is this really the most efficient?
Probably, if you're stuck with b in the shape you describe. However, it is better to use bsxfun, rather than repmat;
y0 = [0.1;0.2]; y0 = reshape(y0,[1,1,1,2]); %
result = sum( bsxfun(@times, b,y0) , 4)
  3 comentarios
Matt J
Matt J el 27 de Ag. de 2014
It's not a meaningful test with m,n,p that small. If your dimensions are truly that size, you should be thinking about vectorizing across the different batches of b.
Mark Whirdy
Mark Whirdy el 27 de Ag. de 2014
[4000,10,2,2] is the real size

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Matt J
Matt J el 27 de Ag. de 2014
Editada: Matt J el 27 de Ag. de 2014
If you can re-organize the code that generates b so that, without using permute() , it is instead 2 x m x n x p , that would be ideal. You can then do it all by straight matrix multiplication
result=squeeze( y0.'*reshape(b,2,[]) );

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