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I want to estimate three parameters while minimizing the least squares quadratic error with the function fmincon in MATLAB. My objective function looks like:

f = @(a,b,c) sum(sum(sum((M - a - b - c).^2)));

where M is a 3D array with dimensions 20x7x16 and the estimated parameters a, b, c are vectors with dimensions 20x1, 7x1 and 16x1 respectively. In order to estimate it I 'make' them 3D as well by repeating the vector a into the array 20x7x16 and I do the same for b and c. I need the sum of the elements in vector a and b to be 1 as linear constraints. My problems are two:

  1. How should I specify the linear constraints when Aeq is a 2D matrix and beq a vector?
  2. How can I set the starting points for a,b,c so that MATLAB knows that the estimates of them are vectors repeated in this 3D array?

I wanted to unfold the 3D array M into 2D matrix and adjust the the parameters a,b,c but the problem with starting points is still there since I must define them as a vector and not as a matrix.

I would very appreciate your ideas and suggestions. Probably I'm thinking to complicated and there's another way how to do it.

Thank you in advance.

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1 Answer 1

DO NOT REPLICATE a b and c! use bsxfun instead

 f = @(a,b,c) sum( reshape( bsxfun( @minus, bsxfun( @minus, bsxfun(@minus, M, a), b' ), permute( c, [2 3 1] ) ), [], 1 ) )

Now your parameters are vecotrs and not replicates of vectors. I believe this will solve all your other problems as well.

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Thank you very much for the answer! This function is really what I need. I just don't understand why do you permute the array M (I guess, since c is a 16x1 vector). –  user2655769 Aug 6 '13 at 12:47
@user2655769 I do not permute M, I only permute c since I need its non-singelton dimension to co-incide with the third dimension of M. Try this command in the command line to see its effect. –  Shai Aug 6 '13 at 13:05
@user2655769 BTW, if this solution works for you, please consider "accepting" it by clicking the "V" icon beside it. Thanks. –  Shai Aug 6 '13 at 13:06
Ok, I understand now. In order to subtract the last parameter c we must reorder what ist left of 3D array M. And in order to use sum just once you reshaped it into one big vector. I changed it into f = @(a,b,c) sum (reshape( bsxfun( @minus, permute( bsxfun( @minus, bsxfun(@minus, M, a), b'), [2 3 1]), c), [], 1 ).^2 ) –  user2655769 Aug 6 '13 at 13:06
@user2655769 it's a bit difficult for me to see the permute at the comment - so I can't tell if it looks correct or not. Best way is to try this out in command line and comapre it to your previous version that used vectors replications. –  Shai Aug 6 '13 at 13:07

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