PCA by optimization
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I'd like to find the principal components of a data matrix X by solving the optimization problem min||X-XBB'||, where the norm is the Frobenius norm, and B is an orthonormal matrix. I'm wondering if anyone could tell me how to do that. Ideally, I'd like to be able to do this using the optimization toolbox. I know how to find the principal components using other methods. My goal is to understand how to set up and solve an optimization problem which has a matrix as the answer. I'd very much appreciate any suggestions or comments.
Thanks! MJ
Respuestas (1)
Steve Grikschat
el 10 de Mayo de 2012
Hi MJ,
Optimization toolbox functions will minimize over "X" where X can be a matrix or vector. Internally, matrices get flattened out into vectors (i.e. x = X(:)). When calling your function, the optimization solvers will call with a matrix of the correct size.
You can pass your constraints in a similar way, although beware about the sizes of the linear constraint matrices. Their sizes should match with the vector length (size(A,2) == numel(X)).
Try it out:
% Define B and initial guess at solution X0
[Xsol,fval] = fminunc(@(X) norm(X-X*B*B','fro'),X0);
1 comentario
MJ
el 12 de Mayo de 2012
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