# MATLAB: How to efficiently create a matrix, which is the result of an outer product?

I have two vectors a and b and some function f. What is the best way (in performance) to define a matrix in MATLAB of such a kind:

``````A(m,n) = f(a(m)*b(n)) / ( (f(a(m)) * f(b(n)) )
``````

Is it possible not to use nested loops?

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Not at a computer right now, but try

``````A=f(a*b')./(f(a)*f(b)')
``````

where a and b are column vectors. a*b' is outer product.

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That depends on whether a,b are row vectors or column vectors. You can make it more robust by doing a = a(:), b= b(:) first. – Andrey Rubshtein Sep 27 '12 at 12:13
I tried it. It works fine. I choose this one. Thanks. – jacksonslsmg4 Sep 27 '12 at 12:44

If `f` supports vector syntax, than it is just:

``````   [A,B] = meshgrid(a,b);
M = f(A.*B) ./ ( f(A).*f(B) );
``````

By the way, I am not sure that the performance will be better than regular loop. Better profile and check. Since the introduction of JIT, Matlab loops often run faster than vectorized operations.

Here is an example:

``````function CalcGrid()
a = 1:10;
b = 1:10;

[A,B] = meshgrid(a,b);
M = f(A.*B) ./ ( f(A).*f(B) );
figure;surf(M);
end

function y = f(x)
y = x-1;
end
``````
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Cool. i've totally forgotten about meshgrid! – jacksonslsmg4 Sep 27 '12 at 12:28
@jacksonslsmg4 this implementation evaluates f too many times. You don't want to pass matrices to f since most of the entries are repeated.. – angainor Sep 27 '12 at 12:35
I prefer to use `ndgrid` in calculations, since the first output increments along the first dimension, and the second output increments along the second dimension. – Jonas Sep 27 '12 at 12:42