| d06dac | Generates a mesh resulting from an affine transformation of a given mesh |
| f08agc | Apply orthogonal transformation determined by f08aec, f08bec or f08bfc |
| f08akc | Apply orthogonal transformation determined by f08ahc |
| f08auc | Apply unitary transformation determined by f08asc, f08bsc or f08btc |
| f08axc | Apply unitary transformation determined by f08avc |
| f08bkc | Apply orthogonal transformation determined by f08bhc |
| f08bxc | Apply unitary transformation determined by f08bvc |
| f08cgc | Apply orthogonal transformation determined by f08cec |
| f08ckc | Apply orthogonal transformation determined by f08chc |
| f08cuc | Apply unitary transformation determined by f08csc |
| f08cxc | Apply unitary transformation determined by f08cvc |
| f08ffc | Generate orthogonal transformation matrix from reduction to tridiagonal form determined by f08fec |
| f08fgc | Apply orthogonal transformation determined by f08fec |
| f08ftc | Generate unitary transformation matrix from reduction to tridiagonal form determined by f08fsc |
| f08fuc | Apply unitary transformation matrix determined by f08fsc |
| f08gfc | Generate orthogonal transformation matrix from reduction to tridiagonal form determined by f08gec |
| f08ggc | Apply orthogonal transformation determined by f08gec |
| f08gtc | Generate unitary transformation matrix from reduction to tridiagonal form determined by f08gsc |
| f08guc | Apply unitary transformation matrix determined by f08gsc |
| f08kfc | Generate orthogonal transformation matrices from reduction to bidiagonal form determined by f08kec |
| f08kgc | Apply orthogonal transformations from reduction to bidiagonal form determined by f08kec |
| f08ktc | Generate unitary transformation matrices from reduction to bidiagonal form determined by f08ksc |
| f08kuc | Apply unitary transformations from reduction to bidiagonal form determined by f08ksc |
| f08nfc | Generate orthogonal transformation matrix from reduction to Hessenberg form determined by f08nec |
| f08ngc | Apply orthogonal transformation matrix from reduction to Hessenberg form determined by f08nec |
| f08ntc | Generate unitary transformation matrix from reduction to Hessenberg form determined by f08nsc |
| f08nuc | Apply unitary transformation matrix from reduction to Hessenberg form determined by f08nsc |
| f08qfc | Reorder Schur factorization of real matrix using orthogonal similarity transformation |
| f08qtc | Reorder Schur factorization of complex matrix using unitary similarity transformation |
| f08yfc | Reorders the generalized real Schur decomposition of a real matrix pair using an orthogonal equivalence transformation |
| f08ygc | 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 |
| f08ytc | Reorders the generalized Schur decomposition of a complex matrix pair using an unitary equivalence transformation |
| f08yuc | 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 |
| g13ewc | Unitary state-space transformation to reduce (A,C) to lower or upper observer Hessenberg form |
| g13exc | Unitary state-space transformation to reduce (B,A) to lower or upper controller Hessenberg form |