| 1. | Let be a symmetric matrix of random variables that is positive definite.
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| 2. | Non-uniform scaling is accomplished by multiplication with any symmetric matrix.
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| 3. | Where A ( x ) is a positive symmetric matrix.
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| 4. | With these, we can define a real symmetric matrix
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| 5. | This means that " A " is a symmetric matrix such that
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| 6. | R given by the above skew-symmetric matrix is
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| 7. | An algorithm to compute such an equivalent symmetric matrix was developed ( Intern.
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| 8. | The entries of a symmetric matrix are symmetric with respect to the main diagonal.
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| 9. | A symmetric matrix is necessarily a normal matrix.
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| 10. | So that the corresponding symmetric matrix is nondegenerate " bilinear " form.
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