Ax, Ay, Az: [N-by-N]

B=AA (a dyadic product)

It means :

```
B(i,j)= [Ax(i,j);Ay(i,j);Az(i,j)]*[Ax(i,j) Ay(i,j) Az(i,j)]
```

B(i,j) : a 3x3 matrix. One way to construct B is:

```
N=2;
Ax=rand(N); Ay=rand(N); Az=rand(N); %# [N-by-N]
t=1;
F=zeros(3,3,N^2);
for i=1:N
for j=1:N
F(:,:,t)= [Ax(i,j);Ay(i,j);Az(i,j)]*[Ax(i,j) Ay(i,j) Az(i,j)];
t=t+1; %# t is just a counter
end
end
%# then we can write
B = mat2cell(F,3,3,ones(N^2,1));
B = reshape(B,N,N)';
B = cell2mat(B);
```

Is there a faster way for when N is large.

Edit:

Thanks for your answer. (It's faster) Let's put: N=2; Ax=[1 2;3 4]; Ay=[5 6;7 8]; Az=[9 10;11 12];

```
B =
1 5 9 4 12 20
5 25 45 12 36 60
9 45 81 20 60 100
9 21 33 16 32 48
21 49 77 32 64 96
33 77 121 48 96 144
```

Run:

??? Error using ==> mtimes
Inner matrix dimensions must agree.

If I write :`P = Ai*Aj;`

then

```
B =
7 19 31 15 43 71
23 67 111 31 91 151
39 115 191 47 139 231
10 22 34 22 50 78
34 78 122 46 106 166
58 134 210 70 162 254
```

That is defferent from above A(:,:,1) deffer from [Ax(1,1) Ay(1,1) Az(1,1)]

Edit:

```
N=100;
Me :Elapsed time is 1.614244 seconds.
gnovice :Elapsed time is 0.056575 seconds.
N=200;
Me :Elapsed time is 6.044628 seconds.
gnovice :Elapsed time is 0.182455 seconds.
N=400;
Me :Elapsed time is 23.775540 seconds.
gnovice :Elapsed time is 0.756682 seconds.
Fast!
rwong: B was not the same.
```

Edit:

After some modification for my application : by gnovice codes

```
1st code : 19.303310 seconds
2nd code: 23.128920 seconds
3rd code: 13.363585 seconds
```

It seems that any function calling like ceil,ind2sub ... make thw loops slow and shoud avoid if possible.

`symIndex`

was interesting! Thank you.