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Non-singularity of A^T*A |
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| Aug28-12, 01:46 PM | #1 |
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Non-singularity of A^T*A
Is it true to say that if [itex]X^T X[/itex] is non-singular, then the column vectors of X must be linearly independent? I know how to prove that if the columns of X are linearly independent, then [itex]X^T X[/itex] is non-singular. Just not sure about the other way around. Thanks!
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| Aug28-12, 11:16 PM | #2 |
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Is X a square matrix? If so use
[tex]det(X^TX) = det(X)^2=0[/tex] If not X is not square, but is real, then QR decomposition should reduce the problem to that of square matrices (something simpler may suffice, but this is the simplest approach I can think of right now). |
| Aug29-12, 09:05 AM | #3 |
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Prove it by contradition. If the columns of X are linearly dependent, there is a non-zero vector ##y## such that ##X^TXy = 0##.
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| Aug29-12, 12:22 PM | #4 |
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Non-singularity of A^T*A
Thank you. I suspected it was true, but couldn't prove it to myself.
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| Aug29-12, 03:03 PM | #5 |
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Just one remark, instead of "contradiction", maybe you should have used "contraposition". |
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| Aug29-12, 06:24 PM | #6 |
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