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Say I have three vectors a,b,c and want to apply a function f on all combinations. So I use [A,B,C] = ndgrid(a,b,c); result = f(A,B,C) and implement f using pointwise evaluation, e.g. (A.^B).*C.

However, there is a separate evaluation of a second function g that only depends on a and b but not on c. So a call of G=g(A,B) (in my example A.^B) would waste time by calling the function with the same arguments for length(c) times redundantly. I could use a separate ndgrid, but I want the result of g be stored in the same dimensions like A,B and C so I can later call e.g. h(G,A,C) without further modifications.

How can this be achieved, and how to not waste space by this redundancy without slowing the program down by using nested for loops instead?

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1 Answer 1

up vote 2 down vote accepted

You can use just the first planes of A and B for the computation, then replicate the result with the function REPMAT to make G the same size as the other variables:

G = g(A(:,:,1),B(:,:,1));       %# Compute one unique plane of G
G = repmat(G,[1 1 length(c)]);  %# Replicate that plane for a 3-D matrix


If replicating G seems like it could be wasting memory (i.e. if you're dealing with very large matrices), then a for loop is probably a better way to go. In addition, you could try using the function BSXFUN in your calculations. For example, to multiply the 2-D G by your 3-D C, you can do this:


Which would end up giving the same results as:

repmat(G,[1 1 length(c)]).*C;

Will it save on memory? That I can't be sure of, since I don't know exactly how BSXFUN is implemented. You'll have to try it out for your specific problem to see which approach gives better speed or memory usage.

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I wonder if this repmating (or using ndgrid) doesn't waste lots of memory by adding redundancy, or whether matlab stores this in a sophisticated manner... –  Tobias Kienzler Apr 6 '11 at 12:25
...apparently not. a = linspace(0,1,1e3); [A,B,C] = ndgrid(a,a,a) killed my matlab session –  Tobias Kienzler Apr 6 '11 at 12:31
thanks for the update, I'll try and have a look at bsxfun, too. At the moment memory is probably not my main concern though, I was just curious –  Tobias Kienzler Apr 6 '11 at 12:42
@Tobias: I'm not surprised MATLAB crashed on you, since you were trying to create 3 double-precision matrices with 1 billion elements each, leading to a grand total of around 24 GB of storage (likely enough to crash any system). –  gnovice Apr 6 '11 at 12:42
True. But I guess there are shorter command to crash matlab on purpose :-7 I did ndgrid(a,a) first, but I wanted to see if there was some optimization that only kicks in for larger sizes. bsxfun is quite useful indeed, I could e.g. let g be bsxfun(@power, a', b) without the need to create A and B at all, and use bsxfun(@times, G, shiftdim(c,-1)) as f –  Tobias Kienzler Apr 6 '11 at 12:51

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