Programmer Guide/Command Reference/EVAL/svd: Difference between revisions
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---- | ---- | ||
;Usage 2: <code>svd('''1''', <var>A</var>, <var>trn</var>)</code> | ;Usage 2: <code>svd('''1''', <var>A</var>, <var>trn</var>)</code> | ||
;Result 2: Returns the matrix ''C''= | ;Result 2: Returns the matrix <code>''C''=trn(''T'')*''T''</code>. ''C'' is a square matrix with M rows and columns (MxM). | ||
---- | ---- | ||
;Usage 3: <code>svd('''2''', <var>A</var>, <var>trn</var>, <var>U</var>, <var>S</var>, <var>V</var>)</code> | ;Usage 3: <code>svd('''2''', <var>A</var>, <var>trn</var>, <var>U</var>, <var>S</var>, <var>V</var>)</code> | ||
| Line 45: | Line 45: | ||
:;<var>V</var>:contains on return the MxM matrix ''V'' | :;<var>V</var>:contains on return the MxM matrix ''V'' | ||
;Result 4: Computes the SVD of the transformed and squared input matrix ''T''. | ;Result 4: Computes the SVD of the transformed and squared input matrix ''T''. | ||
::<code>''C'' = trn(''T'') * ''T'' | ::<code>''C'' = trn(''T'') * ''T''</code> | ||
::<code>solve: ''C'' = ''V'' * Σ * trn(''V'')</code> | ::<code>solve: ''C'' = ''V'' * Σ * trn(''V'')</code> | ||
:The results are stored in the (optional) numerical tables (references) ''S'' (Mx1, diagonal of Σ) and ''V'' (MxM). The return value is the NxM matrix <code>''PC''=''A'' * ''V''</code>. | :The results are stored in the (optional) numerical tables (references) ''S'' (Mx1, diagonal of Σ) and ''V'' (MxM). The return value is the NxM matrix <code>''PC''=''A'' * ''V''</code>. | ||
Latest revision as of 09:50, 21 April 2011
Singular value decomposition (SVD).
- Usage 1
svd(0, A, trn)- A
- the NxM matrix to be transformed
- trn
- transformation to be applied to A
trn transformed matrix T (NxM) description trn(T)*T
(MxM)0 T[i,j] = A[i,j] no transformation "Streumatrix" 1 T[i,j] = A[i,j]-avr(A) subtract matrix mean 2 T[i,j] = A[i,j]-avr(A[*,j]) subtract column mean (center columns) covariance matrix 3 T[i,j] = (A[i,j]-avr(A[*,j]))/dev(A[*,j]) subtract column mean, devide by column deviation (center and standardize columns) correlation matrix 4 T[i,j] = A[i,j]-(avr(A[i,*])+avr(A[*,j]))+avr(A) subtract row and column mean, add matrix mean (center rows and columns)
- Result 1
- The transformed matrix T.
- Usage 2
svd(1, A, trn)- Result 2
- Returns the matrix
C=trn(T)*T. C is a square matrix with M rows and columns (MxM).
- Usage 3
svd(2, A, trn, U, S, V)- U
- contains on return the NxM matrix U
- S
- contains on return the vector S with M elements; Note: the returned vector contains the diagonal elements of the matrix Σ, which are called the singular values.
- V
- contains on return the MxM matrix V
- Result 3
- Computes the SVD of the transformed input matrix T.
solve: T = U * Σ * trn(V)
- The results are stored in the (optional) numerical tables (references) U (NxM), S (Mx1, diagonal of Σ) and V (MxM). The return value is the NxM matrix
PC=U * Σ.
- Usage 4
svd(3, A, trn, U, S, V)- S
- contains on return the vector S with M elements; Note: the returned vector contains the diagonal elements of the matrix Σ (singular values).
- V
- contains on return the MxM matrix V
- Result 4
- Computes the SVD of the transformed and squared input matrix T.
C = trn(T) * Tsolve: C = V * Σ * trn(V)
- The results are stored in the (optional) numerical tables (references) S (Mx1, diagonal of Σ) and V (MxM). The return value is the NxM matrix
PC=A * V.
- Usage 5
svd(4, C, S, V)- C
- the MxM input data matrix
- S
- contains on return the vector S with M elements; Note: the returned vector contains the diagonal elements of the matrix Σ (singular values).
- V
- contains on return the MxM matrix V
- Result 5
- Computes the SVD of the matrix C. It is assumed that C is (optional) transformed and squared matrix derived from a NxM data matrix.
solve: C = V * Σ * trn(V)
- The results are stored in the (optional) numerical tables (references) S (Mx1, diagonal of Σ) and V (MxM). The return value is always 0.
