Sparse Matrix Factorization Problem

Question

Aqeel Anwar am 27 Jun. 2016

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Beantwortet: sufyan masood am 18 Aug. 2018

I am trying to solve the following problem

Is their a name for such sparse factorization or something similar. Can anyone please guide me or refer some text from where I can find methods of solving such problem, or may be modify an existing problem to get this one.

Any help in this regard will be highly appreciated. Thanks.

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Chris Turnes am 29 Jun. 2016

In MATLAB Online öffnen

What is the norm on

||AXB-C||?

Is this the operator norm, or the Frobenius norm?

Aqeel Anwar am 29 Jun. 2016

It is the frobenius norm.

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Answer 1

John D'Errico am 29 Jun. 2016

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So you want to solve the problem

A*X*B == C

Subject to minimizing an L_0 norm on X?

You have stated that A and B are full rank. n and m are apparently not equal, but that does not really matter a lot. Assume that

n > m

for no good reason. We have essentially n*m unknowns in X. And we have n*m equations.

This is a linear system in the unknowns, but with full rank matrices. So we have no degrees of freedom to play with.

X = pinv(A)*C*pinv(B);

In general, there will probably be no zero elements in X. That you wish to minimize the L_0 norm, so you wish to minimize the number of non-zeros, (or maximize the number of zeros) is not relevant. As long as A and B are full rank, there will be no flexibility in the solution that I can see.

I wrote the above using pinv. I could also have written it using slash.

X = A\C/B;

In either case, there is simply no flexibility. A and B are full rank, square matrices. For example:

X0 = randn(5,3)
X0 =
     -0.58903       1.6555      0.79142
     -0.29375      0.30754       -1.332
     -0.84793      -1.2571      -2.3299
      -1.1201     -0.86547      -1.4491
        2.526     -0.17653      0.33351
A = randn(5);
B = randn(3);
C = A*X0*B;
X = pinv(A)*C*pinv(B)
X =
     -0.58903       1.6555      0.79142
     -0.29375      0.30754       -1.332
     -0.84793      -1.2571      -2.3299
      -1.1201     -0.86547      -1.4491
        2.526     -0.17653      0.33351
X = A\C/B
X =
     -0.58903       1.6555      0.79142
     -0.29375      0.30754       -1.332
     -0.84793      -1.2571      -2.3299
      -1.1201     -0.86547      -1.4491
        2.526     -0.17653      0.33351

As you can see, in either case, X recovers the original X0.

If it were true that A and(or) B were NOT square matrices, or not full rank, then some things would change. As you have stated it though, there is no way to solve this problem otherwise.

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John D'Errico am 29 Jun. 2016

Bearbeitet: John D'Errico am 29 Jun. 2016

That changes things, though it was not stated that way, it makes more sense with some flexibility given.

Aqeel Anwar am 29 Jun. 2016

Yes I dont need an exact solution rather constrained solution as mentioned by Torsten. I guess I forgot to put the constrained when typing in LaTeX.

Also i need the matrix X to be sparse, and the measure of sparsity being controlled by the lambda parameter

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Answer 2

sufyan masood am 18 Aug. 2018

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hello can any one tell about sparsify subband signal and subband modification of subband signals coeffiects in compressive signal. kindly guide me about it. i will be highly thankful to all for help me counter this problem.