| C06BAF | Acceleration of convergence of sequence, Shanks' transformation and epsilon algorithm |
| D06DAF | Generates a mesh resulting from an affine transformation of a given mesh |
| F06ABF | Constructs a modified Givens transformation matrix |
| F06EQF | Applies a modified givens transformation to two row vectors |
| F06QMF | Orthogonal similarity transformation of real symmetric matrix as a sequence of plane rotations |
| F06TMF | Unitary similarity transformation of Hermitian matrix as a sequence of plane rotations |
| F08AGF | Apply orthogonal transformation determined by F08AEF, F08BEF or F08BFF |
| F08AKF | Apply orthogonal transformation determined by F08AHF |
| F08AUF | Apply unitary transformation determined by F08ASF, F08BSF or F08BTF |
| F08AXF | Apply unitary transformation determined by F08AVF |
| F08BKF | Apply orthogonal transformation determined by F08BHF |
| F08BXF | Apply unitary transformation determined by F08BVF |
| F08CGF | Apply orthogonal transformation determined by F08CEF |
| F08CKF | Apply orthogonal transformation determined by F08CHF |
| F08CUF | Apply unitary transformation determined by F08CSF |
| F08CXF | Apply unitary transformation determined by F08CVF |
| F08FFF | Generate orthogonal transformation matrix from reduction to tridiagonal form determined by F08FEF |
| F08FGF | Apply orthogonal transformation determined by F08FEF |
| F08FTF | Generate unitary transformation matrix from reduction to tridiagonal form determined by F08FSF |
| F08FUF | Apply unitary transformation matrix determined by F08FSF |
| F08GFF | Generate orthogonal transformation matrix from reduction to tridiagonal form determined by F08GEF |
| F08GGF | Apply orthogonal transformation determined by F08GEF |
| F08GTF | Generate unitary transformation matrix from reduction to tridiagonal form determined by F08GSF |
| F08GUF | Apply unitary transformation matrix determined by F08GSF |
| F08KFF | Generate orthogonal transformation matrices from reduction to bidiagonal form determined by F08KEF |
| F08KGF | Apply orthogonal transformations from reduction to bidiagonal form determined by F08KEF |
| F08KTF | Generate unitary transformation matrices from reduction to bidiagonal form determined by F08KSF |
| F08KUF | Apply unitary transformations from reduction to bidiagonal form determined by F08KSF |
| F08NFF | Generate orthogonal transformation matrix from reduction to Hessenberg form determined by F08NEF |
| F08NGF | Apply orthogonal transformation matrix from reduction to Hessenberg form determined by F08NEF |
| F08NTF | Generate unitary transformation matrix from reduction to Hessenberg form determined by F08NSF |
| F08NUF | Apply unitary transformation matrix from reduction to Hessenberg form determined by F08NSF |
| F08QFF | Reorder Schur factorization of real matrix using orthogonal similarity transformation |
| F08QTF | Reorder Schur factorization of complex matrix using unitary similarity transformation |
| 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 |
| 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 |