|
Routine Name |
Mark of Introduction |
Purpose |
|
f08aec
Example Text Example Data |
7 |
nag_dgeqrf
QR factorization of real general rectangular matrix |
|
f08afc
Example Text Example Data |
7 |
nag_dorgqr
Form all or part of orthogonal Q from QR factorization determined by f08aec or f08bec |
| f08agc | 7 |
nag_dormqr
Apply orthogonal transformation determined by f08aec or f08bec |
|
f08ahc
Example Text Example Data |
7 |
nag_dgelqf
LQ factorization of real general rectangular matrix |
|
f08ajc
Example Text Example Data |
7 |
nag_dorglq
Form all or part of orthogonal Q from LQ factorization determined by f08ahc |
| f08akc | 7 |
nag_dormlq
Apply orthogonal transformation determined by f08ahc |
|
f08asc
Example Text Example Data |
7 |
nag_zgeqrf
QR factorization of complex general rectangular matrix |
|
f08atc
Example Text Example Data |
7 |
nag_zungqr
Form all or part of unitary Q from QR factorization determined by f08asc or f08bsc |
| f08auc | 7 |
nag_zunmqr
Apply unitary transformation determined by f08asc or f08bsc |
|
f08avc
Example Text Example Data |
7 |
nag_zgelqf
LQ factorization of complex general rectangular matrix |
|
f08awc
Example Text Example Data |
7 |
nag_zunglq
Form all or part of unitary Q from LQ factorization determined by f08avc |
| f08axc | 7 |
nag_zunmlq
Apply unitary transformation determined by f08avc |
|
f08bec
Example Text Example Data |
7 |
nag_dgeqpf
QR factorization of real general rectangular matrix with column pivoting |
|
f08bsc
Example Text Example Data |
7 |
nag_zgeqpf
QR factorization of complex general rectangular matrix with column pivoting |
|
f08fcc
Example Text Example Data |
7 |
nag_dsyevd
All eigenvalues and optionally all eigenvectors of real symmetric matrix, using divide and conquer |
|
f08fec
Example Text Example Data |
7 |
nag_dsytrd
Orthogonal reduction of real symmetric matrix to symmetric tridiagonal form |
|
f08ffc
Example Text Example Data |
7 |
nag_dorgtr
Generate orthogonal transformation matrix from reduction to tridiagonal form determined by f08fec |
|
f08fgc
Example Text Example Data |
7 |
nag_dormtr
Apply orthogonal transformation determined by f08fec |
|
f08fqc
Example Text Example Data |
7 |
nag_zheevd
All eigenvalues and optionally all eigenvectors of complex Hermitian matrix, using divide and conquer |
|
f08fsc
Example Text Example Data |
7 |
nag_zhetrd
Unitary reduction of complex Hermitian matrix to real symmetric tridiagonal form |
|
f08ftc
Example Text Example Data |
7 |
nag_zungtr
Generate unitary transformation matrix from reduction to tridiagonal form determined by f08fsc |
|
f08fuc
Example Text Example Data |
7 |
nag_zunmtr
Apply unitary transformation matrix determined by f08fsc |
|
f08gcc
Example Text Example Data |
7 |
nag_dspevd
All eigenvalues and optionally all eigenvectors of real symmetric matrix, packed storage, using divide and conquer |
|
f08gec
Example Text Example Data |
7 |
nag_dsptrd
Orthogonal reduction of real symmetric matrix to symmetric tridiagonal form, packed storage |
|
f08gfc
Example Text Example Data |
7 |
nag_dopgtr
Generate orthogonal transformation matrix from reduction to tridiagonal form determined by f08gec |
|
f08ggc
Example Text Example Data |
7 |
nag_dopmtr
Apply orthogonal transformation determined by f08gec |
|
f08gqc
Example Text Example Data |
7 |
nag_zhpevd
All eigenvalues and optionally all eigenvectors of complex Hermitian matrix, packed storage, using divide and conquer |
|
f08gsc
Example Text Example Data |
7 |
nag_zhptrd
Unitary reduction of complex Hermitian matrix to real symmetric tridiagonal form, packed storage |
|
f08gtc
Example Text Example Data |
7 |
nag_zupgtr
Generate unitary transformation matrix from reduction to tridiagonal form determined by f08gsc |
|
f08guc
Example Text Example Data |
7 |
nag_zupmtr
Apply unitary transformation matrix determined by f08gsc |
|
f08hcc
Example Text Example Data |
7 |
nag_dsbevd
All eigenvalues and optionally all eigenvectors of real symmetric band matrix, using divide and conquer |
|
f08hec
Example Text Example Data |
7 |
nag_dsbtrd
Orthogonal reduction of real symmetric band matrix to symmetric tridiagonal form |
|
f08hqc
Example Text Example Data |
7 |
nag_zhbevd
All eigenvalues and optionally all eigenvectors of complex Hermitian band matrix, using divide and conquer |
|
f08hsc
Example Text Example Data |
7 |
nag_zhbtrd
Unitary reduction of complex Hermitian band matrix to real symmetric tridiagonal form |
|
f08jcc
Example Text Example Data |
7 |
nag_dstevd
All eigenvalues and optionally all eigenvectors of real symmetric tridiagonal matrix, using divide and conquer |
|
f08jec
Example Text Example Data |
7 |
nag_dsteqr
All eigenvalues and eigenvectors of real symmetric tridiagonal matrix, reduced from real symmetric matrix using implicit QL or QR |
|
f08jfc
Example Text Example Data |
7 |
nag_dsterf
All eigenvalues of real symmetric tridiagonal matrix, root-free variant of QL or QR |
|
f08jgc
Example Text Example Data |
7 |
nag_dpteqr
All eigenvalues and eigenvectors of real symmetric positive-definite tridiagonal matrix, reduced from real symmetric positive-definite matrix |
| f08jjc | 7 |
nag_dstebz
Selected eigenvalues of real symmetric tridiagonal matrix by bisection |
| f08jkc | 7 |
nag_dstein
Selected eigenvectors of real symmetric tridiagonal matrix by inverse iteration, storing eigenvectors in real array |
| f08jsc | 7 |
nag_zsteqr
All eigenvalues and eigenvectors of real symmetric tridiagonal matrix, reduced from complex Hermitian matrix, using implicit QL or QR |
|
f08juc
Example Text Example Data |
7 |
nag_zpteqr
All eigenvalues and eigenvectors of real symmetric positive-definite tridiagonal matrix, reduced from complex Hermitian positive-definite matrix |
| f08jxc | 7 |
nag_zstein
Selected eigenvectors of real symmetric tridiagonal matrix by inverse iteration, storing eigenvectors in complex array |
|
f08kec
Example Text Example Data |
7 |
nag_dgebrd
Orthogonal reduction of real general rectangular matrix to bidiagonal form |
|
f08kfc
Example Text Example Data |
7 |
nag_dorgbr
Generate orthogonal transformation matrices from reduction to bidiagonal form determined by f08kec |
|
f08kgc
Example Text Example Data |
7 |
nag_dormbr
Apply orthogonal transformations from reduction to bidiagonal form determined by f08kec |
|
f08ksc
Example Text Example Data |
7 |
nag_zgebrd
Unitary reduction of complex general rectangular matrix to bidiagonal form |
|
f08ktc
Example Text Example Data |
7 |
nag_zungbr
Generate unitary transformation matrices from reduction to bidiagonal form determined by f08ksc |
|
f08kuc
Example Text Example Data |
7 |
nag_zunmbr
Apply unitary transformations from reduction to bidiagonal form determined by f08ksc |
|
f08lec
Example Text Example Data |
7 |
nag_dgbbrd
Reduction of real rectangular band matrix to upper bidiagonal form |
|
f08lsc
Example Text Example Data |
7 |
nag_zgbbrd
Reduction of complex rectangular band matrix to upper bidiagonal form |
|
f08mec
Example Text Example Data |
7 |
nag_dbdsqr
SVD of real bidiagonal matrix reduced from real general matrix |
| f08msc | 7 |
nag_zbdsqr
SVD of real bidiagonal matrix reduced from complex general matrix |
|
f08nec
Example Text Example Data |
7 |
nag_dgehrd
Orthogonal reduction of real general matrix to upper Hessenberg form |
|
f08nfc
Example Text Example Data |
7 |
nag_dorghr
Generate orthogonal transformation matrix from reduction to Hessenberg form determined by f08nec |
|
f08ngc
Example Text Example Data |
7 |
nag_dormhr
Apply orthogonal transformation matrix from reduction to Hessenberg form determined by f08nec |
|
f08nhc
Example Text Example Data |
7 |
nag_dgebal
Balance real general matrix |
| f08njc | 7 |
nag_dgebak
Transform eigenvectors of real balanced matrix to those of original matrix supplied to f08nhc |
|
f08nsc
Example Text Example Data |
7 |
nag_zgehrd
Unitary reduction of complex general matrix to upper Hessenberg form |
|
f08ntc
Example Text Example Data |
7 |
nag_zunghr
Generate unitary transformation matrix from reduction to Hessenberg form determined by f08nsc |
|
f08nuc
Example Text Example Data |
7 |
nag_zunmhr
Apply unitary transformation matrix from reduction to Hessenberg form determined by f08nsc |
|
f08nvc
Example Text Example Data |
7 |
nag_zgebal
Balance complex general matrix |
| f08nwc | 7 |
nag_zgebak
Transform eigenvectors of complex balanced matrix to those of original matrix supplied to f08nvc |
|
f08pec
Example Text Example Data |
7 |
nag_dhseqr
Eigenvalues and Schur factorization of real upper Hessenberg matrix reduced from real general matrix |
| f08pkc | 7 |
nag_dhsein
Selected right and/or left eigenvectors of real upper Hessenberg matrix by inverse iteration |
|
f08psc
Example Text Example Data |
7 |
nag_zhseqr
Eigenvalues and Schur factorization of complex upper Hessenberg matrix reduced from complex general matrix |
| f08pxc | 7 |
nag_zhsein
Selected right and/or left eigenvectors of complex upper Hessenberg matrix by inverse iteration |
|
f08qfc
Example Text Example Data |
7 |
nag_dtrexc
Reorder Schur factorization of real matrix using orthogonal similarity transformation |
|
f08qgc
Example Text Example Data |
7 |
nag_dtrsen
Reorder Schur factorization of real matrix, form orthonormal basis of right invariant subspace for selected eigenvalues, with estimates of sensitivities |
|
f08qhc
Example Text Example Data |
7 |
nag_dtrsyl
Solve real Sylvester matrix equation AX + XB = C, A and B are upper quasi-triangular or transposes |
| f08qkc | 7 |
nag_dtrevc
Left and right eigenvectors of real upper quasi-triangular matrix |
|
f08qlc
Example Text Example Data |
7 |
nag_dtrsna
Estimates of sensitivities of selected eigenvalues and eigenvectors of real upper quasi-triangular matrix |
|
f08qtc
Example Text Example Data |
7 |
nag_ztrexc
Reorder Schur factorization of complex matrix using unitary similarity transformation |
|
f08quc
Example Text Example Data |
7 |
nag_ztrsen
Reorder Schur factorization of complex matrix, form orthonormal basis of right invariant subspace for selected eigenvalues, with estimates of sensitivities |
|
f08qvc
Example Text Example Data |
7 |
nag_ztrsyl
Solve complex Sylvester matrix equation AX + XB = C, A and B are upper triangular or conjugate-transposes |
| f08qxc | 7 |
nag_ztrevc
Left and right eigenvectors of complex upper triangular matrix |
|
f08qyc
Example Text Example Data |
7 |
nag_ztrsna
Estimates of sensitivities of selected eigenvalues and eigenvectors of complex upper triangular matrix |
|
f08sec
Example Text Example Data |
7 |
nag_dsygst
Reduction to standard form of real symmetric-definite generalized eigenproblem Ax = λ Bx, ABx = λ x or BAx = λ x, B factorized by f07fdc |
|
f08ssc
Example Text Example Data |
7 |
nag_zhegst
Reduction to standard form of complex Hermitian-definite generalized eigenproblem Ax = λ Bx, ABx = λ x or BAx = λ x, B factorized by f07frc |
|
f08tec
Example Text Example Data |
7 |
nag_dspgst
Reduction to standard form of real symmetric-definite generalized eigenproblem Ax=λ Bx, ABx = λ x or BAx = λ x, packed storage, B factorized by f07gdc |
|
f08tsc
Example Text Example Data |
7 |
nag_zhpgst
Reduction to standard form of complex Hermitian-definite generalized eigenproblem Ax=λ Bx, ABx = λ x or BAx = λ x, packed storage, B factorized by f07grc |
|
f08uec
Example Text Example Data |
7 |
nag_dsbgst
Reduction of real symmetric-definite banded generalized eigenproblem Ax = λ Bx to standard form Cy = λ y, such that C has the same bandwidth as A |
| f08ufc | 7 |
nag_dpbstf
Computes a split Cholesky factorization of real symmetric positive-definite band matrix A |
|
f08usc
Example Text Example Data |
7 |
nag_zhbgst
Reduction of complex Hermitian-definite banded generalized eigenproblem Ax = λ Bx to standard form Cy = λ y, such that C has the same bandwidth as A |
| f08utc | 7 |
nag_zpbstf
Computes a split Cholesky factorization of complex Hermitian positive-definite band matrix A |
| f08wec | 7 |
nag_dgghrd
Orthogonal reduction of a pair of real general matrices to generalized upper Hessenberg form |
| f08whc | 7 |
nag_dggbal
Balance a pair of real general matrices |
| f08wjc | 7 |
nag_dggbak
Transform eigenvectors of a pair of real balanced matrices to those of original matrix pair supplied to f08whc |
| f08wsc | 7 |
nag_zgghrd
Unitary reduction of a pair of complex general matrices to generalized upper Hessenberg form |
| f08wvc | 7 |
nag_zggbal
Balance a pair of complex general matrices |
| f08wwc | 7 |
nag_zggbak
Transform eigenvectors of a pair of complex balanced matrices to those of original matrix pair supplied to f08wvc |
|
f08xec
Example Text Example Data |
7 |
nag_dhgeqz
Eigenvalues and generalized Schur factorization of real generalized upper Hessenberg form reduced from a pair of real general matrices |
|
f08xsc
Example Text Example Data |
7 |
nag_zhgeqz
Eigenvalues and generalized Schur factorization of complex generalized upper Hessenberg form reduced from a pair of complex general matrices |
|
f08ykc
Example Text Example Data |
7 |
nag_dtgevc
Left and right eigenvectors of a pair of real upper quasi-triangular matrices |
|
f08yxc
Example Text Example Data |
7 |
nag_ztgevc
Left and right eigenvectors of a pair of complex upper triangular matrices |