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Suppose I have an AxBxC matrix X and a BxD matrix Y.

Is there a non-loop method by which I can multiply each of the C AxB matrices with Y?

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4  
Why would you bother? I look at Gnovice's (correct) solution and it would take me a significant amount of time to understand what that does. I then look at Zaid's and understand instantly. If there is a performance difference, there is a maintance cost to consider also. –  MatlabDoug Nov 17 '09 at 13:38
1  
This isn't about performance or readability - just mere curiosity since I knew it was possible to operate on each 3D matrix individually but couldn't figure out how. I know that Gnovice's solution will be much slower than Zaid's "solution" and Amro's solution but, as I said, that's not the point. –  Jacob Nov 17 '09 at 13:47
1  
Now you've totally lost me... what is it that you're after? –  Zaid Nov 17 '09 at 15:14
    
A non-loop method by which I can multiply each of the C AxB matrices with Y, e.g. Amro's & GNovice's solutions. –  Jacob Nov 17 '09 at 15:33
5  
@Jacob: 1. the solution by gnovice IS NOT slower then that of amro. 2. The solution of gnovice uses cellfun which is a wrapper around a loop. So you can make a function from Zaid's solution, call it prod3D.m and voilà, you have a non-loop method for multiplying X and Y. 3. Do not forget that 80% of software cost is maintenance. –  Mikhail Nov 18 '09 at 10:01

7 Answers 7

up vote 8 down vote accepted

You can do this in one line using the functions NUM2CELL to break the matrix X into a cell array and CELLFUN to operate across the cells:

Z = cellfun(@(x) x*Y,num2cell(X,[1 2]),'UniformOutput',false);

The result Z is a 1-by-C cell array where each cell contains an A-by-D matrix. If you want Z to be an A-by-D-by-C matrix, you can use the CAT function:

Z = cat(3,Z{:});



NOTE: My old solution used MAT2CELL instead of NUM2CELL, which wasn't as succinct:

[A,B,C] = size(X);
Z = cellfun(@(x) x*Y,mat2cell(X,A,B,ones(1,C)),'UniformOutput',false);
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This is exactly what I was looking for. –  Jacob Nov 17 '09 at 4:45
2  
With this solution the loop is inside cellfun. But it is nevertheless 10% faster then solution provided by amro (on large matrces, shortly before MATLAB runs out of memory). –  Mikhail Nov 17 '09 at 11:37
    
I'm curious as to the 2 downvotes I got. Whether or not you like the answer, it does answer the question by avoiding explicit use of a for loop. –  gnovice Nov 17 '09 at 15:01
    
Man, who would've thought a simple question like this would be so controversial? –  Jacob Nov 17 '09 at 15:42
    
@Jacob: Yeah, it appears to have spawned some debate. Since I had seen you answering MATLAB questions before, I figured you already knew how to do this using loops (the most straight-forward way). I just assumed you were asking the question out of curiosity for what other ways it could also be done. –  gnovice Nov 17 '09 at 15:51

As a personal preference, I like my code to be as succinct and readable as possible.

Here's what I would have done, though it doesn't meet your 'no-loops' requirement:

for m = 1:C

    Z(:,:,m) = X(:,:,m)*Y;

end

This results in an A x D x C matrix Z.

And of course, you can always pre-allocate Z to speed things up by using Z = zeros(A,D,C);.

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2  
-1 : because this is not a real solution regardless of your disclaimer. If you have any opinions on succinctness or readability, please leave them as comments. –  Jacob Nov 17 '09 at 13:51
4  
+1 because it's also faster than gnovice and amro's fine solutions. –  Ramashalanka Mar 9 '10 at 0:28
    
+1 for readability - but please pre-allocate Z with Z = zeros([A D C]);! –  Floris Jul 9 '13 at 15:44

Here's a one-line solution (two if you want to split into 3rd dimension):

A = 2;
B = 3;
C = 4;
D = 5;

X = rand(A,B,C);
Y = rand(B,D);

%# calculate result in one big matrix
Z = reshape(reshape(permute(X, [2 1 3]), [A B*C]), [B A*C])' * Y;

%'# split into third dimension
Z = permute(reshape(Z',[D A C]),[2 1 3]);

Hence now: Z(:,:,i) contains the result of X(:,:,i) * Y


Explanation:

The above may look confusing, but the idea is simple. First I start by take the third dimension of X and do a vertical concatenation along the first dim:

XX = cat(1, X(:,:,1), X(:,:,2), ..., X(:,:,C))

... the difficulty was that C is a variable, hence you can't generalize that expression using cat or vertcat. Next we multiply this by Y:

ZZ = XX * Y;

Finally I split it back into the third dimension:

Z(:,:,1) = ZZ(1:2, :);
Z(:,:,2) = ZZ(3:4, :);
Z(:,:,3) = ZZ(5:6, :);
Z(:,:,4) = ZZ(7:8, :);

So you can see it only requires one matrix multiplication, but you have to reshape the matrix before and after.

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Thanks! I was hoping for a solution along the lines of bsxfun but this looks interesting –  Jacob Nov 17 '09 at 0:20
    
there was no need. As you can see from the explanation I added, it was only a matter of preparing the matrix by rearranging its shape, so that a simple multiplication would suffice. –  Amro Nov 17 '09 at 17:18
    
Nice solution but it can produce a memory overflow because of the reshaping –  gaborous Jun 14 '14 at 16:36
    
@user1121352: as was mentioned by the OP in the comments, the motivation here was to explore alternative solutions (for fun) rather than producing faster or more readable code... In production code, I would stick with the straightforward for-loop :) –  Amro Jun 14 '14 at 16:52

I would think recursion, but that's the only other non- loop method you can do

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1  
In MATLAB? I think there might be other options .. –  Jacob Nov 16 '09 at 23:00

Nope. There are several ways, but it always comes out in a loop, direct or indirect.

Just to please my curiosity, why would you want that anyway ?

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Why would I want to do it without a loop? Just old habits. MATLAB is supposed to be loop-optimized now with JITA, but I try to avoid them whenever I can - and I have a strong feeling it is possible to solve this without loops. –  Jacob Nov 16 '09 at 23:02
    
yes, ok, i can understand that. (on the opposite, i sometimes do stuff which can be done without a loop in a loop, since i find it easier to read <-- :( old habits, too :) –  ldigas Nov 16 '09 at 23:38

You could "unroll" the loop, ie write out all the multiplications sequentially that would occur in the loop

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1  
Suppose C is variable .. among other things. –  Jacob Nov 16 '09 at 22:46

To answer the question, and for readability, please see:

  • ndmult, by ajuanpi (Juan Pablo Carbajal), 2013, GNU GPL

Input

  • 2 arrays
  • dim

Example

 nT = 100;
 t = 2*pi*linspace (0,1,nT)’;

 # 2 experiments measuring 3 signals at nT timestamps
 signals = zeros(nT,3,2);
 signals(:,:,1) = [sin(2*t) cos(2*t) sin(4*t).^2];
 signals(:,:,2) = [sin(2*t+pi/4) cos(2*t+pi/4) sin(4*t+pi/6).^2];

 sT(:,:,1) = signals(:,:,1)’;
 sT(:,:,2) = signals(:,:,2)’;
   G = ndmult (signals,sT,[1 2]);

Source

Original source. I added inline comments.

function M = ndmult (A,B,dim)
  dA = dim(1);
  dB = dim(2);

  # reshape A into 2d
  sA = size (A);
  nA = length (sA);
  perA = [1:(dA-1) (dA+1):(nA-1) nA dA](1:nA);
  Ap = permute (A, perA);
  Ap = reshape (Ap, prod (sA(perA(1:end-1))), sA(perA(end)));

  # reshape B into 2d
  sB = size (B);
  nB = length (sB);
  perB = [dB 1:(dB-1) (dB+1):(nB-1) nB](1:nB);
  Bp = permute (B, perB);
  Bp = reshape (Bp, sB(perB(1)), prod (sB(perB(2:end))));

  # multiply
  M = Ap * Bp;

  # reshape back to original format
  s = [sA(perA(1:end-1)) sB(perB(2:end))];
  M = squeeze (reshape (M, s));
endfunction
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