| Routine Name |
Purpose |
| F07ADF | LU factorization of realm by n matrix |
| F07AEF | Solution of real system of linear equations, multiple right-hand sides, matrix already factorized by F07ADF (DGETRF) |
| F07AHF | Refined solution with error bounds of real system of linear equations, multiple right-hand sides |
| F07ARF | LU factorization of complex m by n matrix |
| F07ASF | Solution of complex system of linear equations, multiple right-hand sides, matrix already factorized by F07ARF (ZGETRF) |
| F07AVF | Refined solution with error bounds of complex system of linear equations, multiple right-hand sides |
| F07BDF | LU factorization of realm by n band matrix |
| F07BEF | Solution of real band system of linear equations, multiple right-hand sides, matrix already factorized by F07BDF (DGBTRF) |
| F07BHF | Refined solution with error bounds of real band system of linear equations, multiple right-hand sides |
| F07BRF | LU factorization of complex m by n band matrix |
| F07BSF | Solution of complex band system of linear equations, multiple right-hand sides, matrix already factorized by F07BRF (ZGBTRF) |
| F07BVF | Refined solution with error bounds of complex band system of linear equations, multiple right-hand sides |
| F07CHF | Refined solution with error bounds of real tridiagonal system of linear equations, multiple right-hand sides |
| F07CVF | Refined solution with error bounds of complex tridiagonal system of linear equations, multiple right-hand sides |
| F07FDF | Cholesky factorization of real symmetric positive-definite matrix |
| F07FEF | Solution of real symmetric positive-definite system of linear equations, multiple right-hand sides, matrix already factorized by F07FDF (DPOTRF) |
| F07FHF | Refined solution with error bounds of real symmetric positive-definite system of linear equations, multiple right-hand sides |
| F07FRF | Cholesky factorization of complex Hermitian positive-definite matrix |
| F07FSF | Solution of complex Hermitian positive-definite system of linear equations, multiple right-hand sides, matrix already factorized by F07FRF (ZPOTRF) |
| F07FVF | Refined solution with error bounds of complex Hermitian positive-definite system of linear equations, multiple right-hand sides |
| F07GEF | Solution of real symmetric positive-definite system of linear equations, multiple right-hand sides, matrix already factorized by F07GDF (DPPTRF), packed storage |
| F07GHF | Refined solution with error bounds of real symmetric positive-definite system of linear equations, multiple right-hand sides, packed storage |
| F07GSF | Solution of complex Hermitian positive-definite system of linear equations, multiple right-hand sides, matrix already factorized by F07GRF (ZPPTRF), packed storage |
| F07GVF | Refined solution with error bounds of complex Hermitian positive-definite system of linear equations, multiple right-hand sides, packed storage |
| F07HEF | Solution of real symmetric positive-definite band system of linear equations, multiple right-hand sides, matrix already factorized by F07HDF (DPBTRF) |
| F07HHF | Refined solution with error bounds of real symmetric positive-definite band system of linear equations, multiple right-hand sides |
| F07HSF | Solution of complex Hermitian positive-definite band system of linear equations, multiple right-hand sides, matrix already factorized by F07HRF (ZPBTRF) |
| F07HVF | Refined solution with error bounds of complex Hermitian positive-definite band system of linear equations, multiple right-hand sides |
| F07JHF | Refined solution with error bounds of real symmetric positive-definite tridiagonal system of linear equations, multiple right-hand sides |
| F07JVF | Refined solution with error bounds of complex Hermitian positive-definite tridiagonal system of linear equations, multiple right-hand sides |
| F07MHF | Refined solution with error bounds of real symmetric indefinite system of linear equations, multiple right-hand sides |
| F07MVF | Refined solution with error bounds of complex Hermitian indefinite system of linear equations, multiple right-hand sides |
| F07NVF | Refined solution with error bounds of complex symmetric system of linear equations, multiple right-hand sides |
| F07PHF | Refined solution with error bounds of real symmetric indefinite system of linear equations, multiple right-hand sides, packed storage |
| F07PVF | Refined solution with error bounds of complex Hermitian indefinite system of linear equations, multiple right-hand sides, packed storage |
| F07QVF | Refined solution with error bounds of complex symmetric system of linear equations, multiple right-hand sides, packed storage |
| F07THF | Error bounds for solution of real triangular system of linear equations, multiple right-hand sides |
| F07TVF | Error bounds for solution of complex triangular system of linear equations, multiple right-hand sides |
| F07UEF | Solution of real triangular system of linear equations, multiple right-hand sides, packed storage |
| F07UHF | Error bounds for solution of real triangular system of linear equations, multiple right-hand sides, packed storage |
| F07USF | Solution of complex triangular system of linear equations, multiple right-hand sides, packed storage |
| F07UVF | Error bounds for solution of complex triangular system of linear equations, multiple right-hand sides, packed storage |
| F07VEF | Solution of real band triangular system of linear equations, multiple right-hand sides |
| F07VHF | Error bounds for solution of real band triangular system of linear equations, multiple right-hand sides |
| F07VSF | Solution of complex band triangular system of linear equations, multiple right-hand sides |
| F07VVF | Error bounds for solution of complex band triangular system of linear equations, multiple right-hand sides |
| F08AEF | QR factorization of real general rectangular matrix |
| F08AFF | Form all or part of orthogonal Q from QR factorization determined by F08AEF (DGEQRF) or F08BEF (DGEQPF) |
| F08AGF | Apply orthogonal transformation determined by F08AEF (DGEQRF) or F08BEF (DGEQPF) |
| F08ASF | QR factorization of complex general rectangular matrix |
| F08ATF | Form all or part of unitary Q from QR factorization determined by F08ASF (ZGEQRF) or F08BSF (ZGEQPF) |
| F08AUF | Apply unitary transformation determined by F08ASF (ZGEQRF) or F08BSF (ZGEQPF) |
| F08FEF | Orthogonal reduction of real symmetric matrix to symmetric tridiagonal form |
| F08FFF | Generate orthogonal transformation matrix from reduction to tridiagonal form determined by F08FEF (DSYTRD) |
| F08FSF | Unitary reduction of complex Hermitian matrix to real symmetric tridiagonal form |
| F08FTF | Generate unitary transformation matrix from reduction to tridiagonal form determined by F08FSF (ZHETRD) |
| F08GFF | Generate orthogonal transformation matrix from reduction to tridiagonal form determined by F08GEF (DSPTRD) |
| F08GTF | Generate unitary transformation matrix from reduction to tridiagonal form determined by F08GSF (ZHPTRD) |
| F08HEF | Orthogonal reduction of real symmetric band matrix to symmetric tridiagonal form |
| F08HSF | Unitary reduction of complex Hermitian band matrix to real symmetric tridiagonal form |
| F08JEF | All eigenvalues and eigenvectors of real symmetric tridiagonal matrix, reduced from real symmetric matrix using the implicit QL or QR algorithm |
| F08JJF | Selected eigenvalues of real symmetric tridiagonal matrix by bisection |
| F08JKF | Selected eigenvectors of real symmetric tridiagonal matrix by inverse iteration, storing eigenvectors in real array |
| F08JSF | All eigenvalues and eigenvectors of real symmetric tridiagonal matrix, reduced from complex Hermitian matrix, using the implicit QL or QR algorithm |
| F08JXF | Selected eigenvectors of real symmetric tridiagonal matrix by inverse iteration, storing eigenvectors in complex array |
| F08KEF | Orthogonal reduction of real general rectangular matrix to bidiagonal form |
| F08KSF | Unitary reduction of complex general rectangular matrix to bidiagonal form |
| F08MEF | SVD of real bidiagonal matrix reduced from real general matrix |
| F08MSF | SVD of real bidiagonal matrix reduced from complex general matrix |
| F08PKF | Selected right and/or left eigenvectors of real upper Hessenberg matrix by inverse iteration |
| F08PXF | Selected right and/or left eigenvectors of complex upper Hessenberg matrix by inverse iteration |
| F08TAF | Computes all the eigenvalues, and optionally, the eigenvectors of a real generalized symmetric-definite eigenproblem, packed storage |
| F08TBF | Computes selected eigenvalues, and optionally, the eigenvectors of a real generalized symmetric-definite eigenproblem, packed storage |
| F08TCF | Computes all the eigenvalues, and optionally, the eigenvectors of a real generalized symmetric-definite eigenproblem, packed storage (divide-and-conquer) |
| F08TNF | Computes all the eigenvalues, and optionally, the eigenvectors of a complex generalized Hermitian-definite eigenproblem, packed storage |
| F08TPF | Computes selected eigenvalues, and optionally, the eigenvectors of a complex generalized Hermitian-definite eigenproblem, packed storage |
| F08TQF | Computes selected eigenvalues, and optionally, the eigenvectors of a complex generalized Hermitian-definite eigenproblem, packed storage (divide-and-conquer) |
| Routine Name |
Purpose |
| C02AKF | All zeros of real cubic equation |
| C02ALF | All zeros of real quartic equation |
| C02AMF | All zeros of complex cubic equation |
| C02ANF | All zeros of complex quartic equation |
| C05NBF | Solution of system of nonlinear equations using function values only (easy-to-use) |
| C05NCF | Solution of system of nonlinear equations using function values only (comprehensive) |
| C05NDF | Solution of system of nonlinear equations using function values only (reverse communication) |
| C05PBF | Solution of system of nonlinear equations using first derivatives (easy-to-use) |
| C05PCF | Solution of system of nonlinear equations using first derivatives (comprehensive) |
| C05PDF | Solution of system of nonlinear equations using first derivatives (reverse communication) |
| D02HAF | Ordinary differential equations, boundary value problem, shooting and matching, boundary values to be determined |
| D02HBF | Ordinary differential equations, boundary value problem, shooting and matching, general parameters to be determined |
| D02NEF | Implicit ordinary differential equations/DAEs, initial value problem, DASSL method integrator |
| D02SAF | Ordinary differential equations, boundary value problem, shooting and matching technique, subject to extra algebraic equations, general parameters to be determined |
| D02TKF | Ordinary differential equations, general nonlinear boundary value problem, collocation technique |
| D03NCF | Finite difference solution of the Black–Scholes equations |
| D05BDF | Nonlinear convolution Volterra–Abel equation, second kind, weakly singular |
| D05BEF | Nonlinear convolution Volterra–Abel equation, first kind, weakly singular |
| E04FCF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using function values only (comprehensive) |
| E04FYF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using function values only (easy-to-use) |
| E04GBF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and quasi-Newton algorithm using first derivatives (comprehensive) |
| E04GDF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using first derivatives (comprehensive) |
| E04GYF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and quasi-Newton algorithm, using first derivatives (easy-to-use) |
| E04GZF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using first derivatives (easy-to-use) |
| E04HEF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm, using second derivatives (comprehensive) |
| E04HYF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm, using second derivatives (easy-to-use) |
| E04NCF | Convex QP problem or linearly-constrained linear least-squares problem (dense) |
| E04UCF | Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (comprehensive) |
| E04UFF | Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (reverse communication, comprehensive) |
| E04USF | Minimum of a sum of squares, nonlinear constraints, sequential QP method, using function values and optionally first derivatives (comprehensive) |
| F01ABF | Inverse of real symmetric positive-definite matrix using iterative refinement |
| F01ADF | Inverse of real symmetric positive-definite matrix |
| F01ECF | Real matrix exponential |
| F02ECF | Selected eigenvalues and eigenvectors of real nonsymmetric matrix (Black Box) |
| F02FJF | Selected eigenvalues and eigenvectors of sparse symmetric eigenproblem (Black Box) |
| F02GCF | Selected eigenvalues and eigenvectors of complex nonsymmetric matrix (Black Box) |
| F02WDF | QR factorization, possibly followed by SVD |
| F02WGF | Computes leading terms in the singular value decomposition of a real general matrix; also computes corresponding left and right singular vectors |
| F02WUF | SVD of real upper triangular matrix (Black Box) |
| F02XUF | SVD of complex upper triangular matrix (Black Box) |
| F03ABF | Determinant of real symmetric positive-definite matrix (Black Box) |
| F03AEF | LLT factorization and determinant of real symmetric positive-definite matrix |
| F04ABF | Solution of real symmetric positive-definite simultaneous linear equations with multiple right-hand sides using iterative refinement (Black Box) |
| F04ASF | Solution of real symmetric positive-definite simultaneous linear equations, one right-hand side using iterative refinement (Black Box) |
| F04BAF | Computes the solution and error-bound to a real system of linear equations |
| F04BBF | Computes the solution and error-bound to a real banded system of linear equations |
| F04BDF | Computes the solution and error-bound to a real symmetric positive-definite system of linear equations |
| F04BEF | Computes the solution and error-bound to a real symmetric positive-definite system of linear equations, packed storage |
| F04BFF | Computes the solution and error-bound to a real symmetric positive-definite banded system of linear equations |
| F04CAF | Computes the solution and error-bound to a complex system of linear equations |
| F04CBF | Computes the solution and error-bound to a complex banded system of linear equations |
| F04CDF | Computes the solution and error-bound to a complex Hermitian positive-definite system of linear equations |
| F04CEF | Computes the solution and error-bound to a complex Hermitian positive-definite system of linear equations, packed storage |
| F04CFF | Computes the solution and error-bound to a complex Hermitian positive-definite banded system of linear equations |
| F04JGF | Least-squares (if rank = n) or minimal least-squares (if rank < n) solution of mreal equations in n unknowns, m ≥ n |
| F07AAF | Computes the solution to a real system of linear equations |
| F07ABF | Uses the LU factorization to compute the solution, error-bound and condition estimate for a real system of linear equations |
| F07ACF | Mixed precision real system solver |
| F07ANF | Computes the solution to a complex system of linear equations |
| F07APF | Uses the LU factorization to compute the solution, error-bound and condition estimate for a complex system of linear equations |
| F07AQF | Mixed precision complex system solver |
| F07BAF | Computes the solution to a real banded system of linear equations |
| F07BBF | Uses the LU factorization to compute the solution, error-bound and condition estimate for a real banded system of linear equations |
| F07BNF | Computes the solution to a complex banded system of linear equations |
| F07BPF | Uses the LU factorization to compute the solution, error-bound and condition estimate for a complex banded system of linear equations |
| F07CBF | Uses the LU factorization to compute the solution, error-bound and condition estimate for a real tridiagonal system of linear equations |
| F07CPF | Uses the LU factorization to compute the solution, error-bound and condition estimate for a complex tridiagonal system of linear equations |
| F07FAF | Computes the solution to a real symmetric positive-definite system of linear equations |
| F07FBF | Uses the Cholesky factorization to compute the solution, error-bound and condition estimate for a real symmetric positive-definite system of linear equations |
| F07FNF | Computes the solution to a complex Hermitian positive-definite system of linear equations |
| F07FPF | Uses the Cholesky factorization to compute the solution, error-bound and condition estimate for a complex Hermitian positive-definite system of linear equations |
| F07GAF | Computes the solution to a real symmetric positive-definite system of linear equations, packed storage |
| F07GBF | Uses the Cholesky factorization to compute the solution, error-bound and condition estimate for a real symmetric positive-definite system of linear equations, packed storage |
| F07GNF | Computes the solution to a complex Hermitian positive-definite system of linear equations, packed storage |
| F07GPF | Uses the Cholesky factorization to compute the solution, error-bound and condition estimate for a complex Hermitian positive-definite system of linear equations, packed storage |
| F07HAF | Computes the solution to a real symmetric positive-definite banded system of linear equations |
| F07HBF | Uses the Cholesky factorization to compute the solution, error-bound and condition estimate for a real symmetric positive-definite banded system of linear equations |
| F07HNF | Computes the solution to a complex Hermitian positive-definite banded system of linear equations |
| F07HPF | Uses the Cholesky factorization to compute the solution, error-bound and condition estimate for a complex Hermitian positive-definite banded system of linear equations |
| F07JBF | Uses the modified Cholesky factorization to compute the solution, error-bound and condition estimate for a real symmetric positive-definite tridiagonal system of linear equations |
| F07JPF | Uses the modified Cholesky factorization to compute the solution, error-bound and condition estimate for a complex Hermitian positive-definite tridiagonal system of linear equations |
| F07MBF | Uses the diagonal pivoting factorization to compute the solution to a real symmetric system of linear equations |
| F07MPF | Uses the diagonal pivoting factorization to compute the solution to a complex Hermitian system of linear equations |
| F07NPF | Uses the diagonal pivoting factorization to compute the solution to a complex symmetric system of linear equations |
| F07PBF | Uses the diagonal pivoting factorization to compute the solution to a real symmetric system of linear equations, packed storage |
| F07PPF | Uses the diagonal pivoting factorization to compute the solution to a complex Hermitian system of linear equations, packed storage |
| F07QPF | Uses the diagonal pivoting factorization to compute the solution to a complex symmetric system of linear equations, packed storage |
| F08AAF | Solves an overdetermined or underdetermined real linear system |
| F08ANF | Solves an overdetermined or underdetermined complex linear system |
| F08BAF | Computes the minimum-norm solution to a real linear least-squares problem |
| F08BFF | QR factorization of real general rectangular matrix with column pivoting, using BLAS-3 |
| F08BNF | Computes the minimum-norm solution to a complex linear least-squares problem |
| F08BTF | QR factorization of complex general rectangular matrix with column pivoting, using BLAS-3 |
| F08FAF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric matrix |
| F08FBF | Computes selected eigenvalues and, optionally, eigenvectors of a real symmetric matrix |
| F08FCF | Computes all eigenvalues and, optionally, all eigenvectors of real symmetric matrix (divide-and-conquer) |
| F08FDF | Computes selected eigenvalues and, optionally, eigenvectors of a real symmetric matrix (Relatively Robust Representations) |
| F08FGF | Apply orthogonal transformation determined by F08FEF (DSYTRD) |
| F08FNF | Computes all eigenvalues and, optionally, eigenvectors of a complex Hermitian matrix |
| F08FPF | Computes selected eigenvalues and, optionally, eigenvectors of a complex Hermitian matrix |
| F08FQF | Computes all eigenvalues and, optionally, all eigenvectors of complex Hermitian matrix (divide-and-conquer) |
| F08FRF | Computes selected eigenvalues and, optionally, eigenvectors of a complex Hermitian matrix (Relatively Robust Representations) |
| F08FUF | Apply unitary transformation matrix determined by F08FSF (ZHETRD) |
| F08GAF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric matrix, packed storage |
| F08GBF | Computes selected eigenvalues and, optionally, eigenvectors of a real symmetric matrix, packed storage |
| F08GCF | Computes all eigenvalues and, optionally, all eigenvectors of real symmetric matrix, packed storage (divide-and-conquer) |
| F08GNF | Computes all eigenvalues and, optionally, eigenvectors of a complex Hermitian matrix, packed storage |
| F08GPF | Computes selected eigenvalues and, optionally, eigenvectors of a complex Hermitian matrix, packed storage |
| F08GQF | Computes all eigenvalues and, optionally, all eigenvectors of complex Hermitian matrix, packed storage (divide-and-conquer) |
| F08HAF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric band matrix |
| F08HBF | Computes selected eigenvalues and, optionally, eigenvectors of a real symmetric band matrix |
| F08HCF | Computes all eigenvalues and, optionally, all eigenvectors of real symmetric band matrix (divide-and-conquer) |
| F08HNF | Computes all eigenvalues and, optionally, eigenvectors of a complex Hermitian band matrix |
| F08HPF | Computes selected eigenvalues and, optionally, eigenvectors of a complex Hermitian band matrix |
| F08HQF | Computes all eigenvalues and, optionally, all eigenvectors of complex Hermitian band matrix (divide-and-conquer) |
| F08JAF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix |
| F08JBF | Computes selected eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix |
| F08JCF | Computes all eigenvalues and, optionally, all eigenvectors of real symmetric tridiagonal matrix (divide-and-conquer) |
| F08JDF | Computes selected eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix (Relatively Robust Representations) |
| F08JGF | Computes all eigenvalues and eigenvectors of real symmetric positive-definite tridiagonal matrix, reduced from real symmetric positive-definite matrix |
| F08JHF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix or a matrix reduced to this form (divide-and-conquer) |
| F08JLF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix or a symmetric matrix reduced to this form (Relatively Robust Representations) |
| F08JUF | Computes all eigenvalues and eigenvectors of real symmetric positive-definite tridiagonal matrix, reduced from complex Hermitian positive-definite matrix |
| F08JVF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix or a complex Hermitian matrix reduced to this form (divide-and-conquer) |
| F08JYF | Computes all eigenvalues and, optionally, eigenvectors of a real symmetric tridiagonal matrix or a complex Hermitian matrix reduced to this form (Relatively Robust Representations) |
| F08KAF | Computes the minimum-norm solution to a real linear least-squares problem using singular value decomposition |
| F08KBF | Computes the singular value decomposition of a real matrix, optionally computing the left and/or right singular vectors |
| F08KCF | Computes the minimum-norm solution to a real linear least-squares problem using singular value decomposition (divide-and-conquer) |
| F08KDF | Computes the singular value decomposition of a real matrix, optionally computing the left and/or right singular vectors (divide-and-conquer) |
| F08KFF | Generate orthogonal transformation matrices from reduction to bidiagonal form determined by F08KEF (DGEBRD) |
| F08KGF | Apply orthogonal transformations from reduction to bidiagonal form determined by F08KEF (DGEBRD) |
| F08KNF | Computes the minimum-norm solution to a complex linear least-squares problem using singular value decomposition |
| F08KPF | Computes the singular value decomposition of a complex matrix, optionally computing the left and/or right singular vectors |
| F08KQF | Computes the minimum-norm solution to a complex linear least-squares problem using singular value decomposition (divide-and-conquer) |
| F08KRF | Computes the singular value decomposition of a complex matrix, optionally computing the left and/or right singular vectors (divide-and-conquer) |
| F08KTF | Generate unitary transformation matrices from reduction to bidiagonal form determined by F08KSF (ZGEBRD) |
| F08KUF | Apply unitary transformations from reduction to bidiagonal form determined by F08KSF (ZGEBRD) |
| F08MDF | Computes the singular value decomposition of a real bidiagonal matrix, optionally computing the singular vectors (divide-and-conquer) |
| F08NAF | Computes all eigenvalues and, optionally, left and/or right eigenvectors of a real nonsymmetric matrix |
| F08NBF | Computes all eigenvalues and, optionally, left and/or right eigenvectors of a real nonsymmetric matrix; also, optionally, the balancing transformation, the reciprocal condition numbers for the eigenvalues and for the right eigenvectors |
| F08NFF | Generate orthogonal transformation matrix from reduction to Hessenberg form determined by F08NEF (DGEHRD) |
| F08NGF | Apply orthogonal transformation matrix from reduction to Hessenberg form determined by F08NEF (DGEHRD) |
| F08NNF | Computes all eigenvalues and, optionally, left and/or right eigenvectors of a complex nonsymmetric matrix |
| F08NPF | Computes all eigenvalues and, optionally, left and/or right eigenvectors of a complex nonsymmetric matrix; also, optionally, the balancing transformation, the reciprocal condition numbers for the eigenvalues and for the right eigenvectors |
| F08NTF | Generate unitary transformation matrix from reduction to Hessenberg form determined by F08NSF (ZGEHRD) |
| F08NUF | Apply unitary transformation matrix from reduction to Hessenberg form determined by F08NSF (ZGEHRD) |
| F08PAF | Computes for real square nonsymmetric matrix, the eigenvalues, the real Schur form, and, optionally, the matrix of Schur vectors |
| F08PBF | Computes for real square nonsymmetric matrix, the eigenvalues, the real Schur form, and, optionally, the matrix of Schur vectors; also, optionally, computes reciprocal condition numbers for selected eigenvalues |
| F08PEF | Computes the eigenvalues and Schur factorization of real upper Hessenberg matrix reduced from real general matrix |
| F08PNF | Computes for complex square nonsymmetric matrix, the eigenvalues, the Schur form, and, optionally, the matrix of Schur vectors |
| F08PPF | Computes for real square nonsymmetric matrix, the eigenvalues, the Schur form, and, optionally, the matrix of Schur vectors; also, optionally, computes reciprocal condition numbers for selected eigenvalues |
| F08PSF | Computes the eigenvalues and Schur factorization of complex upper Hessenberg matrix reduced from complex general matrix |
| F08SAF | Computes all the eigenvalues, and optionally, the eigenvectors of a real generalized symmetric-definite eigenproblem |
| F08SBF | Computes selected eigenvalues, and optionally, the eigenvectors of a real generalized symmetric-definite eigenproblem |
| F08SCF | Computes all the eigenvalues, and optionally, the eigenvectors of a real generalized symmetric-definite eigenproblem (divide-and-conquer) |
| F08SNF | Computes all the eigenvalues, and optionally, the eigenvectors of a complex generalized Hermitian-definite eigenproblem |
| F08SPF | Computes selected eigenvalues, and optionally, the eigenvectors of a complex generalized Hermitian-definite eigenproblem |
| F08SQF | Computes all the eigenvalues, and optionally, the eigenvectors of a complex generalized Hermitian-definite eigenproblem (divide-and-conquer) |
| F08UAF | Computes all the eigenvalues, and optionally, the eigenvectors of a real banded generalized symmetric-definite eigenproblem |
| F08UBF | Computes selected eigenvalues, and optionally, the eigenvectors of a real banded generalized symmetric-definite eigenproblem |
| F08UCF | Computes all the eigenvalues, and optionally, the eigenvectors of a real banded generalized symmetric-definite eigenproblem (divide-and-conquer) |
| F08UNF | Computes all the eigenvalues, and optionally, the eigenvectors of a complex banded generalized Hermitian-definite eigenproblem |
| F08UPF | Computes selected eigenvalues, and optionally, the eigenvectors of a complex banded generalized Hermitian-definite eigenproblem |
| F08UQF | Computes all the eigenvalues, and optionally, the eigenvectors of a complex banded generalized Hermitian-definite eigenproblem (divide-and-conquer) |
| F08WAF | Computes, for a real nonsymmetric matrix pair, the generalized eigenvalues, and optionally, the left and/or right generalized eigenvectors |
| F08WBF | Computes, for a real nonsymmetric matrix pair, the generalized eigenvalues, and optionally, the left and/or right generalized eigenvectors; also, optionally, the balancing transformation, the reciprocal condition numbers for the eigenvalues and for the right eigenvectors |
| F08WNF | Computes, for a complex nonsymmetric matrix pair, the generalized eigenvalues, and optionally, the left and/or right generalized eigenvectors |
| F08WPF | Computes, for a complex nonsymmetric matrix pair, the generalized eigenvalues, and optionally, the left and/or right generalized eigenvectors; also, optionally, the balancing transformation, the reciprocal condition numbers for the eigenvalues and for the right eigenvectors |
| F08XAF | Computes, for a real nonsymmetric matrix pair, the generalized eigenvalues, the generalized real Schur form and, optionally, the left and/or right matrices of Schur vectors |
| F08XBF | Computes, for a real nonsymmetric matrix pair, the generalized eigenvalues, the generalized real Schur form and, optionally, the left and/or right matrices of Schur vectors; also, optionally, computes reciprocal condition numbers for selected eigenvalues |
| F08XNF | Computes, for a complex nonsymmetric matrix pair, the generalized eigenvalues, the generalized complex Schur form and, optionally, the left and/or right matrices of Schur vectors |
| F08XPF | Computes, for a complex nonsymmetric matrix pair, the generalized eigenvalues, the generalized complex Schur form and, optionally, the left and/or right matrices of Schur vectors; also, optionally, computes reciprocal condition numbers for selected eigenvalues |
| F08ZAF | Solves the real linear equality-constrained least-squares (LSE) problem |
| F08ZBF | Solves a real general Gauss–Markov linear model (GLM) problem |
| F08ZEF | Computes a generalized QR factorization of a real matrix pair |
| F08ZFF | Computes a generalized RQ factorization of a real matrix pair |
| F08ZNF | Solves the complex linear equality-constrained least-squares (LSE) problem |
| F08ZPF | Solves a complex general Gauss–Markov linear model (GLM) problem |
| F08ZSF | Computes a generalized QR factorization of a complex matrix pair |
| F08ZTF | Computes a generalized RQ factorization of a complex matrix pair |
| F12FCF | Returns the converged approximations (as determined by F12FBF) to eigenvalues of a real symmetric sparse (standard or generalized) eigenproblem and, optionally, the corresponding approximate eigenvectors and/or an orthonormal basis for the associated approximate invariant subspace |
| F12FGF | Computes approximations to selected eigenvalues of a real symmetric banded (standard or generalized) eigenproblem and, optionally, the corresponding approximate eigenvectors and/or an orthonormal basis for the associated approximate invariant subspace |
| G01HBF | Computes probabilities for the multivariate Normal distribution |
| G02BYF | Computes partial correlation/variance-covariance matrix from correlation/variance-covariance matrix computed by G02BXF |
| G02CGF | Multiple linear regression, from correlation coefficients, with constant term |
| G02CHF | Multiple linear regression, from correlation-like coefficients, without constant term |
| G02DAF | Fits a general (multiple) linear regression model |
| G02DDF | Estimates of linear parameters and general linear regression model from updated model |
| G02EAF | Computes residual sums of squares for all possible linear regressions for a set of independent variables |
| G02EEF | Fits a linear regression model by forward selection |
| G02GAF | Fits a generalized linear model with Normal errors |
| G02GBF | Fits a generalized linear model with binomial errors |
| G02GCF | Fits a generalized linear model with Poisson errors |
| G02GDF | Fits a generalized linear model with gamma errors |
| G02HAF | Robust regression, standard M-estimates |
| G02HDF | Robust regression, compute regression with user-supplied functions and weights |
| G02HFF | Robust regression, variance-covariance matrix following G02HDF |
| G02JAF | Linear mixed effects regression using Restricted Maximum Likelihood (REML) |
| G02JBF | Linear mixed effects regression using Maximum Likelihood (ML) |
| G02KAF | Ridge regression, optimizing a ridge regression parameter |
| G02KBF | Ridge regression using a number of supplied ridge regression parameters |
| G02LAF | Partial least-squares (PLS) regression using singular value decomposition |
| G02LCF | PLS parameter estimates following partial least-squares regression by G02LAF or G02LBF |
| G03AAF | Performs principal component analysis |
| G03ACF | Performs canonical variate analysis |
| G03ADF | Performs canonical correlation analysis |
| G03BAF | Computes orthogonal rotations for loading matrix, generalized orthomax criterion |
| G03BCF | Computes Procrustes rotations |
| G03BDF | ProMax rotations |
| G03DAF | Computes test statistic for equality of within-group covariance matrices and matrices for discriminant analysis |
| G03FAF | Performs principal coordinate analysis, classical metric scaling |
| G04BBF | Analysis of variance, randomized block or completely randomized design, treatment means and standard errors |
| G04BCF | Analysis of variance, general row and column design, treatment means and standard errors |
| G05PJF | Generates a realization of a multivariate time series from a VARMA model |
| G08RAF | Regression using ranks, uncensored data |
| G08RBF | Regression using ranks, right-censored data |
| G11CAF | Returns parameter estimates for the conditional analysis of stratified data |
| G11SAF | Contingency table, latent variable model for binary data |
| G12BAF | Fits Cox's proportional hazard model |
| G13AEF | Univariate time series, estimation, seasonal ARIMA model (comprehensive) |
| G13AFF | Univariate time series, estimation, seasonal ARIMA model (easy-to-use) |
| G13AJF | Univariate time series, state set and forecasts, from fully specified seasonal ARIMA model |
| G13ASF | Univariate time series, diagnostic checking of residuals, following G13AEF or G13AFF |
| G13BAF | Multivariate time series, filtering (pre-whitening) by an ARIMA model |
| G13BBF | Multivariate time series, filtering by a transfer function model |
| G13BDF | Multivariate time series, preliminary estimation of transfer function model |
| G13BEF | Multivariate time series, estimation of multi-input model |
| G13BJF | Multivariate time series, state set and forecasts from fully specified multi-input model |
| G13DBF | Multivariate time series, multiple squared partial autocorrelations |
| G13DDF | Multivariate time series, estimation of VARMA model |
| G13DJF | Multivariate time series, forecasts and their standard errors |
| G13DNF | Multivariate time series, sample partial lag correlation matrices, χ2 statistics and significance levels |
| G13DPF | Multivariate time series, partial autoregression matrices |
| G13DSF | Multivariate time series, diagnostic checking of residuals, following G13DDF |
| G13DXF | Calculates the zeros of a vector autoregressive (or moving average) operator |
| G13FAF | Univariate time series, parameter estimation for either a symmetric GARCH process or a GARCH process with asymmetry of the form (εt - 1 + γ)2 |
| G13FCF | Univariate time series, parameter estimation for a GARCH process with asymmetry of the form (|εt - 1| + γεt - 1)2 |
| G13FEF | Univariate time series, parameter estimation for an asymmetric Glosten, Jagannathan and Runkle (GJR) GARCH process |
| G13FGF | Univariate time series, parameter estimation for an exponential GARCH (EGARCH) process |
| Routine Name |
Purpose |
| C06FKF | Circular convolution or correlation of two real vectors, extra workspace for greater speed |
| C06FPF | Multiple one-dimensional real discrete Fourier transforms |
| C06FQF | Multiple one-dimensional Hermitian discrete Fourier transforms |
| C06FRF | Multiple one-dimensional complex discrete Fourier transforms |
| C06FUF | Two-dimensional complex discrete Fourier transform |
| C06FXF | Three-dimensional complex discrete Fourier transform |
| C06HAF | Discrete sine transform |
| C06HBF | Discrete cosine transform |
| C06HCF | Discrete quarter-wave sine transform |
| C06HDF | Discrete quarter-wave cosine transform |
| C06PAF | Single one-dimensional real and Hermitian complex discrete Fourier transform, using complex storage format for Hermitian sequences |
| C06PFF | One-dimensional complex discrete Fourier transform of multi-dimensional data (using Complex data type) |
| C06PJF | Multi-dimensional complex discrete Fourier transform of multi-dimensional data (using Complex data type) |
| C06PKF | Circular convolution or correlation of two complex vectors |
| C06PPF | Multiple one-dimensional real and Hermitian complex discrete Fourier transforms, using complex storage format for Hermitian sequences |
| C06PQF | Multiple one-dimensional real and Hermitian complex discrete Fourier transforms, using complex storage format for Hermitian sequences |
| C06PRF | Multiple one-dimensional complex discrete Fourier transforms using complex data type |
| C06PSF | Multiple one-dimensional complex discrete Fourier transforms using complex data type and sequences stored as columns |
| C06PUF | Two-dimensional complex discrete Fourier transform, complex data type |
| C06PXF | Three-dimensional complex discrete Fourier transform, Complex data type |
| C06RAF | Discrete sine transform (easy-to-use) |
| C06RBF | Discrete cosine transform (easy-to-use) |
| C06RCF | Discrete quarter-wave sine transform (easy-to-use) |
| C06RDF | Discrete quarter-wave cosine transform (easy-to-use) |
| D01DAF | Two-dimensional quadrature, finite region |
| D01FCF | Multi-dimensional adaptive quadrature over hyper-rectangle |
| D01GAF | One-dimensional quadrature, integration of function defined by data values, Gill–Miller method |
| D03RAF | General system of second-order PDEs, method of lines, finite differences, remeshing, two space variables, rectangular region |
| D03RBF | General system of second-order PDEs, method of lines, finite differences, remeshing, two space variables, rectilinear region |
| E01SGF | Interpolating functions, modified Shepard's method, two variables |
| E01SHF | Interpolated values, evaluate interpolant computed by E01SGF, function and first derivatives, two variables |
| E01TGF | Interpolating functions, modified Shepard's method, three variables |
| E01THF | Interpolated values, evaluate interpolant computed by E01TGF, function and first derivatives, three variables |
| E02CAF | Least-squares surface fit by polynomials, data on lines parallel to one independent coordinate axis |
| E02CBF | Evaluation of fitted polynomial in two variables |
| E02DFF | Evaluation of fitted bicubic spline at a mesh of points |
| F01CTF | Sum or difference of two real matrices, optional scaling and transposition |
| F01CWF | Sum or difference of two complex matrices, optional scaling and transposition |
| F04AFF | Solution of real symmetric positive-definite simultaneous linear equations using iterative refinement (coefficient matrix already factorized by F03AEF) |
| F04AGF | Solution of real symmetric positive-definite simultaneous linear equations (coefficient matrix already factorized by F03AEF) |
| F04AHF | Solution of real simultaneous linear equations using iterative refinement (coefficient matrix already factorized by F03AFF) |
| F04AJF | Solution of real simultaneous linear equations (coefficient matrix already factorized by F03AFF) |
| F05AAF | Gram–Schmidt orthogonalisation of n vectors of order m |
| F11BEF | Real sparse nonsymmetric linear systems, preconditioned RGMRES, CGS, Bi-CGSTAB or TFQMR method |
| F11BSF | Complex sparse non-Hermitian linear systems, preconditioned RGMRES, CGS, Bi-CGSTAB or TFQMR method |
| F11GEF | Real sparse symmetric linear systems, preconditioned conjugate gradient or Lanczos |
| F11GSF | Complex sparse Hermitian linear systems, preconditioned conjugate gradient or Lanczos |
| F11MEF | LU factorization of real sparse matrix |
| F11MFF | Solution of real sparse simultaneous linear equations (coefficient matrix already factorized) |
| F11MHF | Refined solution with error bounds of real system of linear equations, multiple right-hand sides |
| F11MKF | Real sparse nonsymmetric matrix-matrix multiply, compressed column storage |
| F11XAF | Real sparse nonsymmetric matrix vector multiply |
| F11XEF | Real sparse symmetric matrix vector multiply |
| F11XNF | Complex sparse non-Hermitian matrix vector multiply |
| F11XSF | Complex sparse Hermitian matrix vector multiply |
| F12ABF | Implements a reverse communication interface for the Implicitly Restarted Arnoldi iteration for computing selected eigenvalues and, optionally, eigenvectors of a real nonsymmetric sparse (standard or generalized) eigenproblem |
| F12AGF | Computes approximations to selected eigenvalues of a real nonsymmetric banded (standard or generalized) eigenproblem and, optionally, the corresponding approximate eigenvectors and/or an orthonormal basis for the associated approximate invariant subspace |
| G02AAF | Computes the nearest correlation matrix to a real square matrix, using the method of Qi and Sun |
| G02BAF | Pearson product-moment correlation coefficients, all variables, no missing values |
| G02BDF | Correlation-like coefficients (about zero), all variables, no missing values |
| G02BNF | Kendall/Spearman non-parametric rank correlation coefficients, no missing values, overwriting input data |
| G02BPF | Kendall/Spearman non-parametric rank correlation coefficients, casewise treatment of missing values, overwriting input data |
| G02BQF | Kendall/Spearman non-parametric rank correlation coefficients, no missing values, preserving input data |
| G02BRF | Kendall/Spearman non-parametric rank correlation coefficients, casewise treatment of missing values, preserving input data |
| G03CAF | Computes maximum likelihood estimates of the parameters of a factor analysis model, factor loadings, communalities and residual correlations |
| G03EAF | Computes distance matrix |
| G03ECF | Hierarchical cluster analysis |
| G05RCF | Generates a matrix of pseudorandom numbers from a Student's t-copula |
| G05RDF | Generates a matrix of pseudorandom numbers from a Gaussian copula |
| G05YJF | Generates a Normal quasi-random number sequence |
| G05YKF | Generates a log-normal quasi-random number sequence |
| G05YMF | Generates a uniform quasi-random number sequence |
| G13EAF | Combined measurement and time update, one iteration of Kalman filter, time-varying, square root covariance filter |
| G13EBF | Combined measurement and time update, one iteration of Kalman filter, time-invariant, square root covariance filter |
| M01CAF | Sort a vector, real numbers |
| M01CBF | Sort a vector, integer numbers |
| M01CCF | Sort a vector, character data |
| S30AAF | Black–Scholes–Merton option pricing formula |
| S30ABF | Black–Scholes–Merton option pricing formula with Greeks |
| S30BAF | Floating-strike lookback option pricing formula |
| S30BBF | Floating-strike lookback option pricing formula with Greeks |
| S30CAF | Binary option: cash-or-nothing pricing formula |
| S30CBF | Binary option: cash-or-nothing pricing formula with Greeks |
| S30CCF | Binary option: asset-or-nothing pricing formula |
| S30CDF | Binary option: asset-or-nothing pricing formula with Greeks |
| S30FAF | Standard barrier option pricing formula |
| S30JAF | Jump-diffusion, Merton's model, option pricing formula |
| S30JBF | Jump-diffusion, Merton's model, option pricing formula with Greeks |
| S30NAF | Heston's model option pricing formula |
| S30QCF | American option: Bjerksund and Stensland pricing formula |
| S30SAF | Asian option: geometric continuous average rate pricing formula |
| S30SBF | Asian option: geometric continuous average rate pricing formula with Greeks |
| Routine Name |
Purpose |
| D01PAF | Multi-dimensional quadrature over an n-simplex |
| D02AGF | Ordinary differential equations, boundary value problem, shooting and matching technique, allowing interior matching point, general parameters to be determined |
| D02EJF | Ordinary differential equations, stiff initial value problem, backward diffential formulae method, until function of solution is zero, intermediate output (simple driver) |
| D02NBF | Explicit ordinary differential equations, stiff initial value problem, full Jacobian (comprehensive) |
| D02NCF | Explicit ordinary differential equations, stiff initial value problem, banded Jacobian (comprehensive) |
| D02NDF | Explicit ordinary differential equations, stiff initial value problem, sparse Jacobian (comprehensive) |
| D02NGF | Implicit/algebraic ordinary differential equations, stiff initial value problem, full Jacobian (comprehensive) |
| D02NHF | Implicit/algebraic ordinary differential equations, stiff initial value problem, banded Jacobian (comprehensive) |
| D02NJF | Implicit/algebraic ordinary differential equations, stiff initial value problem, sparse Jacobian (comprehensive) |
| D02NMF | Explicit ordinary differential equations, stiff initial value problem (reverse communication, comprehensive) |
| D02NNF | Implicit/algebraic ordinary differential equations, stiff initial value problem (reverse communication, comprehensive) |
| D03FAF | Elliptic PDE, Helmholtz equation, three-dimensional Cartesian coordinates |
| D03PCF | General system of parabolic PDEs, method of lines, finite differences, one space variable |
| D03PDF | General system of parabolic PDEs, method of lines, Chebyshev C0 collocation, one space variable |
| D03PEF | General system of first-order PDEs, method of lines, Keller box discretisation, one space variable |
| D03PFF | General system of convection-diffusion PDEs with source terms in conservative form, method of lines, upwind scheme using numerical flux function based on Riemann solver, one space variable |
| D03PHF | General system of parabolic PDEs, coupled DAEs, method of lines, finite differences, one space variable |
| D03PJF | General system of parabolic PDEs, coupled DAEs, method of lines, Chebyshev C0 collocation, one space variable |
| D03PKF | General system of first-order PDEs, coupled DAEs, method of lines, Keller box discretisation, one space variable |
| D03PLF | General system of convection-diffusion PDEs with source terms in conservative form, coupled DAEs, method of lines, upwind scheme using numerical flux function based on Riemann solver, one space variable |
| D03PPF | General system of parabolic PDEs, coupled DAEs, method of lines, finite differences, remeshing, one space variable |
| D03PRF | General system of first-order PDEs, coupled DAEs, method of lines, Keller box discretisation, remeshing, one space variable |
| D03PSF | General system of convection-diffusion PDEs with source terms in conservative form, coupled DAEs, method of lines, upwind scheme using numerical flux function based on Riemann solver, remeshing, one space variable |
| D05AAF | Linear non-singular Fredholm integral equation, second kind, split kernel |
| D05ABF | Linear non-singular Fredholm integral equation, second kind, smooth kernel |
| D06CBF | Generates a sparsity pattern of a Finite Element matrix associated with a given mesh |
| D06CCF | Renumbers a given mesh using Gibbs method |
| E02RAF | Padé approximants |
| E04FCF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using function values only (comprehensive) |
| E04FYF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using function values only (easy-to-use) |
| E04GBF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and quasi-Newton algorithm using first derivatives (comprehensive) |
| E04GDF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using first derivatives (comprehensive) |
| E04GYF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and quasi-Newton algorithm, using first derivatives (easy-to-use) |
| E04GZF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm using first derivatives (easy-to-use) |
| E04HEF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm, using second derivatives (comprehensive) |
| E04HYF | Unconstrained minimum of a sum of squares, combined Gauss–Newton and modified Newton algorithm, using second derivatives (easy-to-use) |
| E04NCF | Convex QP problem or linearly-constrained linear least-squares problem (dense) |
| E04UCF | Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (comprehensive) |
| E04UFF | Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (reverse communication, comprehensive) |
| E04USF | Minimum of a sum of squares, nonlinear constraints, sequential QP method, using function values and optionally first derivatives (comprehensive) |
| E04YCF | Covariance matrix for nonlinear least-squares problem (unconstrained) |
| E05JBF | Global optimization by multi-level coordinate search, simple bounds, using function values only |
| F01ABF | Inverse of real symmetric positive-definite matrix using iterative refinement |
| F02FJF | Selected eigenvalues and eigenvectors of sparse symmetric eigenproblem (Black Box) |
| F02WDF | QR factorization, possibly followed by SVD |
| F02WUF | SVD of real upper triangular matrix (Black Box) |
| F02XUF | SVD of complex upper triangular matrix (Black Box) |
| F03AAF | Determinant of real matrix (Black Box) |
| F03ADF | Determinant of complex matrix (Black Box) |
| F03AFF | LU factorization and determinant of real matrix |
| F04ABF | Solution of real symmetric positive-definite simultaneous linear equations with multiple right-hand sides using iterative refinement (Black Box) |
| F04AEF | Solution of real simultaneous linear equations with multiple right-hand sides using iterative refinement (Black Box) |
| F04ASF | Solution of real symmetric positive-definite simultaneous linear equations, one right-hand side using iterative refinement (Black Box) |
| F04ATF | Solution of real simultaneous linear equations, one right-hand side using iterative refinement (Black Box) |
| F04JGF | Least-squares (if rank = n) or minimal least-squares (if rank < n) solution of mreal equations in n unknowns, m ≥ n |
| F11DCF | Solution of real sparse nonsymmetric linear system, RGMRES, CGS, Bi-CGSTAB or TFQMR method, preconditioner computed by F11DAF |
| F11DEF | Solution of real sparse nonsymmetric linear system, RGMRES, CGS, Bi-CGSTAB, or TFQMR method, Jacobi or SSOR preconditioner (Black Box) |
| F11DKF | Real sparse nonsymmetric linear systems, line Jacobi preconditioner |
| F11DQF | Solution of complex sparse non-Hermitian linear system, RGMRES, CGS, Bi-CGSTAB or TFQMR method, preconditioner computed by F11DNF (Black Box) |
| F11DSF | Solution of complex sparse non-Hermitian linear system, RGMRES, CGS, Bi-CGSTAB or TFQMR method, Jacobi or SSOR preconditioner Black Box |
| F11DXF | Complex sparse nonsymmetric linear systems, line Jacobi preconditioner |
| F11JCF | Solution of real sparse symmetric linear system, conjugate gradient/Lanczos method, preconditioner computed by F11JAF (Black Box) |
| F11JEF | Solution of real sparse symmetric linear system, conjugate gradient/Lanczos method, Jacobi or SSOR preconditioner (Black Box) |
| F11JQF | Solution of complex sparse Hermitian linear system, conjugate gradient/Lanczos method, preconditioner computed by F11JNF (Black Box) |
| F11JSF | Solution of complex sparse Hermitian linear system, conjugate gradient/Lanczos method, Jacobi or SSOR preconditioner (Black Box) |
| F11MDF | Real sparse nonsymmetric linear systems, setup for F11MEF |
| G01AGF | Lineprinter scatterplot of two variables |
| G01AHF | Lineprinter scatterplot of one variable against Normal scores |
| G01ARF | Constructs a stem and leaf plot |
| G01EMF | Computes probability for the Studentized range statistic |
| G01HBF | Computes probabilities for the multivariate Normal distribution |
| G01JDF | Computes lower tail probability for a linear combination of (central) χ2 variables |
| G02CGF | Multiple linear regression, from correlation coefficients, with constant term |
| G02CHF | Multiple linear regression, from correlation-like coefficients, without constant term |
| G02DAF | Fits a general (multiple) linear regression model |
| G02DDF | Estimates of linear parameters and general linear regression model from updated model |
| G02DEF | Add a new independent variable to a general linear regression model |
| G02DGF | Fits a general linear regression model to new dependent variable |
| G02DKF | Estimates and standard errors of parameters of a general linear regression model for given constraints |
| G02EEF | Fits a linear regression model by forward selection |
| G02GAF | Fits a generalized linear model with Normal errors |
| G02GBF | Fits a generalized linear model with binomial errors |
| G02GCF | Fits a generalized linear model with Poisson errors |
| G02GDF | Fits a generalized linear model with gamma errors |
| G02GKF | Estimates and standard errors of parameters of a general linear model for given constraints |
| G02HAF | Robust regression, standard M-estimates |
| G02HDF | Robust regression, compute regression with user-supplied functions and weights |
| G02HFF | Robust regression, variance-covariance matrix following G02HDF |
| G02HKF | Calculates a robust estimation of a correlation matrix, Huber's weight function |
| G02JAF | Linear mixed effects regression using Restricted Maximum Likelihood (REML) |
| G02JBF | Linear mixed effects regression using Maximum Likelihood (ML) |
| G02KAF | Ridge regression, optimizing a ridge regression parameter |
| G02KBF | Ridge regression using a number of supplied ridge regression parameters |
| G03ACF | Performs canonical variate analysis |
| G03ADF | Performs canonical correlation analysis |
| G04EAF | Computes orthogonal polynomials or dummy variables for factor/classification variable |
| G05PJF | Generates a realization of a multivariate time series from a VARMA model |
| G05PYF | Generates a random correlation matrix |
| G07BEF | Computes maximum likelihood estimates for parameters of the Weibull distribution |
| G07DAF | Robust estimation, median, median absolute deviation, robust standard deviation |
| G07DBF | Robust estimation, M-estimates for location and scale parameters, standard weight functions |
| G07DCF | Robust estimation, M-estimates for location and scale parameters, user-defined weight functions |
| G07DDF | Computes a trimmed and winsorized mean of a single sample with estimates of their variance |
| G07EAF | Robust confidence intervals, one-sample |
| G07EBF | Robust confidence intervals, two-sample |
| G08AGF | Performs the Wilcoxon one-sample (matched pairs) signed rank test |
| G08AKF | Computes the exact probabilities for the Mann–Whitney U statistic, ties in pooled sample |
| G08CBF | Performs the one-sample Kolmogorov–Smirnov test for standard distributions |
| G08CCF | Performs the one-sample Kolmogorov–Smirnov test for a user-supplied distribution |
| G08CDF | Performs the two-sample Kolmogorov–Smirnov test |
| G08RAF | Regression using ranks, uncensored data |
| G08RBF | Regression using ranks, right-censored data |
| G11BBF | Computes multiway table from set of classification factors using given percentile/quantile |
| G11BCF | Computes marginal tables for multiway table computed by G11BAF or G11BBF |
| G11SAF | Contingency table, latent variable model for binary data |
| G13ADF | Univariate time series, preliminary estimation, seasonal ARIMA model |
| G13AEF | Univariate time series, estimation, seasonal ARIMA model (comprehensive) |
| G13AFF | Univariate time series, estimation, seasonal ARIMA model (easy-to-use) |
| G13AJF | Univariate time series, state set and forecasts, from fully specified seasonal ARIMA model |
| G13BEF | Multivariate time series, estimation of multi-input model |
| G13BJF | Multivariate time series, state set and forecasts from fully specified multi-input model |
| G13DBF | Multivariate time series, multiple squared partial autocorrelations |
| G13DDF | Multivariate time series, estimation of VARMA model |
| G13DNF | Multivariate time series, sample partial lag correlation matrices, χ2 statistics and significance levels |
| G13FAF | Univariate time series, parameter estimation for either a symmetric GARCH process or a GARCH process with asymmetry of the form (εt - 1 + γ)2 |
| G13FCF | Univariate time series, parameter estimation for a GARCH process with asymmetry of the form (|εt - 1| + γεt - 1)2 |
| G13FEF | Univariate time series, parameter estimation for an asymmetric Glosten, Jagannathan and Runkle (GJR) GARCH process |
| G13FGF | Univariate time series, parameter estimation for an exponential GARCH (EGARCH) process |