F08FLF
| Computes the reciprocal condition numbers for the eigenvectors of a real symmetric or complex Hermitian matrix or for the left or right singular vectors of a general matrix |
F08QFF
| Reorder Schur factorization of real matrix using orthogonal similarity transformation |
F08QGF
| Reorder Schur factorization of real matrix, form orthonormal basis of right invariant subspace for selected eigenvalues, with estimates of sensitivities |
F08QLF
| Estimates of sensitivities of selected eigenvalues and eigenvectors of real upper quasi-triangular matrix |
F08QTF
| Reorder Schur factorization of complex matrix using unitary similarity transformation |
F08QUF
| Reorder Schur factorization of complex matrix, form orthonormal basis of right invariant subspace for selected eigenvalues, with estimates of sensitivities |
F08QYF
| Estimates of sensitivities of selected eigenvalues and eigenvectors of complex upper triangular matrix |
F08YFF
| Reorders the generalized real Schur decomposition of a real matrix pair using an orthogonal equivalence transformation |
F08YGF
| Reorders the generalized real Schur decomposition of a real matrix pair using an orthogonal equivalence transformation, computes the generalized eigenvalues of the reordered pair and, optionally, computes the estimates of reciprocal condition numbers for eigenvalues and eigenspaces |
F08YLF
| Estimates reciprocal condition numbers for specified eigenvalues and/or eigenvectors of a real matrix pair in generalized real Schur canonical form |
F08YTF
| Reorders the generalized Schur decomposition of a complex matrix pair using an unitary equivalence transformation |
F08YUF
| Reorders the generalized Schur decomposition of a complex matrix pair using an unitary equivalence transformation, computes the generalized eigenvalues of the reordered pair and, optionally, computes the estimates of reciprocal condition numbers for eigenvalues and eigenspaces |
F08YYF
| Estimates reciprocal condition numbers for specified eigenvalues and/or eigenvectors of a complex matrix pair in generalized Schur canonical form |