Difference between revisions of "Manuals/calci/SVF"
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==Related Videos== | ==Related Videos== | ||
| − | {{#ev:youtube|v=4g-zS32oKEw|280|center|}} | + | {{#ev:youtube|v=4g-zS32oKEw|280|center|Singular Values}} |
==See Also== | ==See Also== | ||
Latest revision as of 12:05, 25 April 2019
SVF (Matrix)
- is any set of values.
is any set of values.Description
- This function shows the Singular value of a given matrix in descending order.
- In , is any matrix with array of values.
- Singular value decomposition is defined by the factorization of a real or complex matrix.
- It is the generalization of the Eigen decomposition of a symmetric matrix with positive eigen values to any mxn matrix through an extension of the polar decomposition.
- Singular value decomposition is of the form where is any square real or complex Unitary matrix of order .
- is a mxn rectangular diagonal matrix with non negative real numbers.
- V is also any square real or complex Unitary matrix of order nxn.
- The columns of U and V are called left Singular and right Singular vectors of the matrix.
- To find Singular Value Decomposition we have to follow the below rules:
, 
where 
is any square real or complex Unitary matrix of order 
.
is a mxn rectangular diagonal matrix with non negative real numbers.*The left-singular vectors of the matrix M are a set of orthonormal eigenvectors of MM∗. *The right-singular vectors of M are a set of orthonormal eigenvectors of . *The non-zero singular values of M (found on the diagonal entries of Σ) are the square roots of the non-zero eigenvalues of both and .
.
*The non-zero singular values of M (found on the diagonal entries of Σ) are the square roots of the non-zero eigenvalues of both 
.
Examples
Related Videos
See Also
References