Optimization with respect to matrix

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Mateusz
Mateusz el 30 de Ag. de 2011
Hi,
I have the following problem to solve: argmin_X || Xu - b ||^2 where u and b are given (vectors), and || . || is l-2 norm. So it looks like ordinary least squares but with optimization that goes over matrix X. Is it possible to do this in Matlab?
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Mateusz
Mateusz el 30 de Ag. de 2011
It should be argmin, not armin.
argmin_X represents minimization with respect to X.
So argmin_X f(X) means minimization of the objective f with respect to X.
Chaowei Chen
Chaowei Chen el 3 de Sept. de 2011
what is the dimension of u and b? But generally I think you will get infinite many solutions giving you || X*u - b || ^2 =0.
For example, say u and b are both 2D vectors. X is therefore 2 by 2 matrix, having 4 degree of freedom to let you assign values. You can arbitrarily choose x_11 and x_12 such that u_1*x_11+u_2*x_12=b_1 and u_1*x_21+u_2*x_22=b_2. Therefore, the 2-norm is zero.

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Daniel Shub
Daniel Shub el 30 de Ag. de 2011
The l^2-norm does not care about the shape of your data so you can just reshape your matrix into a vector.
u = u(:);
b = b(:);
  3 comentarios
Daniel Shub
Daniel Shub el 30 de Ag. de 2011
see my edit.
Mateusz
Mateusz el 30 de Ag. de 2011
Well, I think it doesn't make sense.
u and b are vectors. X is a matrix.
If X := X(:) and do nothing with u and b (u(:) do nothing with vectors), then I have problems with dimensions (u and b has different dimensionality).

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