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Let's say I have two vectors:

    A = [1 2 3];
    B = [10;20;30];

They could also be two line vectors - doesn't matter, I'll choose whatever is best. I now want to create a line vector by multiplying B with each element of A:

    C = [1*10;1*20;1*30;2*20;2*20;2*30;3*10;3*20;3*30];

This can easily and rather efficiently be done by using a tensor product B*A and reshaping it into a line vector. But is there a faster way? This happens inside a fitting function, so it would be possible to pass additional vectors like indexing arrays.

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2  
Are you sure that this is a bottleneck, because that sounds pretty efficient. Especially on a multi-core machine... –  Dan Jan 15 '14 at 13:23
    
Even if it were the most time consuming part, it is likely not the point with most improvement potential (unless the remainder runs really quick). –  Dennis Jaheruddin Jan 15 '14 at 15:10
    
possible duplicate of A matrix operation in MATLAB –  Eitan T Jan 16 '14 at 10:00

3 Answers 3

up vote 4 down vote accepted

I'm surprised no-one has thought of this one yet:

C = bsxfun(@times, A,B);
C = C(:);

A small comparison (Win 7 64-bit, MATLAB R2010a 64-bit):

A = rand(1,1000);
B = rand(1000,1);

tic
D = kron(A.',B);
toc

tic
D2 = B*A;
D2 = D2(:);
toc

tic
D3 = bsxfun(@times, A,B);
D3 = D3(:);
toc

isequal(D,D2)
isequal(D,D3)

Results:

Elapsed time is 0.123301 seconds.  %// kron
Elapsed time is 0.034271 seconds.  %// B*A
Elapsed time is 0.010617 seconds.  %// bsxfun
ans =
     1
ans =
     1

Results with A = rand(1,5000); B = rand(5000,1); :

Elapsed time is 7.134506 seconds.  %// kron
Elapsed time is 0.119705 seconds.  %// B*A
Elapsed time is 0.162295 seconds.  %// bsxfun

It seems the algorithm underlying kron scales as O(N²) or worse...

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+1! I'm surprised kron is that slow for larger matrices in MATLAB. I left my MATLAB computer now, but using this online compiler, I get quite different results. Check my update. –  Stewie Griffin Jan 15 '14 at 14:25
1  
I get quite consistent results with this answer. Surprising to see that bsxfun actually takes the cake, In the range of size 100-10000 it is significantly faster than regular multiplication and using the processor much less in the meantime. However it does seem to scale a little less good so I suppose that depending on your hardware there is a switch to where * becomes faster. –  Dennis Jaheruddin Jan 15 '14 at 15:07

Fifth time I've answered with kron the last two days:

kron(A',B)
   10
   20
   30
   20
   40
   60
   30
   60
   90

A time comparison with:

C = B*A;
C = C(:);

gives the following results:

t1 =  0.21601    % kron
t2 =  0.56776    % C = B*A

Update:

I just left my MATLAB computer, so these results are obtained here:

A = rand(1,4000);
B = rand(4000,1);

tic
for ii = 1:10
D = kron(A',B);
end
t1 = toc

tic
for ii = 1:10
D2 = B*A;
D2 = D2(:);
end
t2 = toc

tic
for ii = 1:10
D3 = bsxfun(@times, A,B);
D3 = D3(:);
end
t3 = toc

sum(sum(abs(D-D2))) < 1e-10
sum(sum(abs(D-D3))) < 1e-10

t1 =  0.43138
t2 =  0.85762
t3 =  0.43332
ans =  1
ans =  1
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Actually this appears to be slower than the originally proposed solution. Edit: Your timing does not seem to match mine, could you show the timing code? –  Dennis Jaheruddin Jan 15 '14 at 13:19
    
@DennisJaheruddin: Can you post your benchmark results? I don't get the same results... –  Stewie Griffin Jan 15 '14 at 13:22
1  
What Matlab version do (both of) you use? –  Marv Jan 15 '14 at 13:24
    
Is kron multithreaded? Because * is on later versions which means architecture could make a big difference –  Dan Jan 15 '14 at 13:25
1  
Try that test again with A = rand(1,5000); B = rand(5000,1);. I bet the outcomes will be quite different :) –  Rody Oldenhuis Jan 15 '14 at 13:50

Actually I doubt whether there can be significant improvement in this case, because matrix multiplication is known to be the strength of Matlab and flattening an array is trivial, here is how I came to the conclusion that using kron won't help:

A = [1 2 3];
B = [10;20;30];

tic,C = B*A;C = C(:);toc % Typically takes about  0.000012 seconds
tic, C=kron(A',B);toc    % Typically takes about  0.000093 seconds

Of course this may change for different input sizes, but this is what I get from the question.

I don't think the matlab version will matter much but it was tested on 2012b. It was tested with 12 cores. When using both solutions in a loop, 6 cores appeared to be used in each case so I don't think that is the 'problem' either.

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I get figures which support yours, 0.000043 s for the first version, 0.000167 s for the second. Version R2013b on dual 4-core machine. –  High Performance Mark Jan 15 '14 at 13:48

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