| f06pbc | Matrix-vector product, real rectangular band matrix |
| f06pdc | Matrix-vector product, real symmetric band matrix |
| f06pgc | Matrix-vector product, real triangular band matrix |
| f06pkc | System of equations, real triangular band matrix |
| f06sbc | Matrix-vector product, complex rectangular band matrix |
| f06sdc | Matrix-vector product, complex Hermitian band matrix |
| f06sgc | Matrix-vector product, complex triangular band matrix |
| f06skc | System of equations, complex triangular band matrix |
| f07bdc | LU factorization of real m by n band matrix |
| f07bec | Solution of real band system of linear equations, multiple right-hand sides, matrix already factorized by f07bdc |
| f07bgc | Estimate condition number of real band matrix, matrix already factorized by f07bdc |
| f07bhc | Refined solution with error bounds of real band system of linear equations, multiple right-hand sides |
| f07brc | LU factorization of complex m by n band matrix |
| f07bsc | Solution of complex band system of linear equations, multiple right-hand sides, matrix already factorized by f07brc |
| f07buc | Estimate condition number of complex band matrix, matrix already factorized by f07brc |
| f07bvc | Refined solution with error bounds of complex band system of linear equations, multiple right-hand sides |
| f07hdc | Cholesky factorization of real symmetric positive-definite band matrix |
| f07hec | Solution of real symmetric positive-definite band system of linear equations, multiple right-hand sides, matrix already factorized by f07hdc |
| f07hgc | Estimate condition number of real symmetric positive-definite band matrix, matrix already factorized by f07hdc |
| f07hhc | Refined solution with error bounds of real symmetric positive-definite band system of linear equations, multiple right-hand sides |
| f07hrc | Cholesky factorization of complex Hermitian positive-definite band matrix |
| f07hsc | Solution of complex Hermitian positive-definite band system of linear equations, multiple right-hand sides, matrix already factorized by f07hrc |
| f07huc | Estimate condition number of complex Hermitian positive-definite band matrix, matrix already factorized by f07hrc |
| f07hvc | Refined solution with error bounds of complex Hermitian positive-definite band system of linear equations, multiple right-hand sides |
| f07vec | Solution of real band triangular system of linear equations, multiple right-hand sides |
| f07vgc | Estimate condition number of real band triangular matrix |
| f07vhc | Error bounds for solution of real band triangular system of linear equations, multiple right-hand sides |
| f07vsc | Solution of complex band triangular system of linear equations, multiple right-hand sides |
| f07vuc | Estimate condition number of complex band triangular matrix |
| f07vvc | Error bounds for solution of complex band triangular system of linear equations, multiple right-hand sides |
| f08hcc | All eigenvalues and optionally all eigenvectors of real symmetric band matrix, using divide and conquer |
| f08hec | Orthogonal reduction of real symmetric band matrix to symmetric tridiagonal form |
| f08hqc | All eigenvalues and optionally all eigenvectors of complex Hermitian band matrix, using divide and conquer |
| f08hsc | Unitary reduction of complex Hermitian band matrix to real symmetric tridiagonal form |
| f08lec | Reduction of real rectangular band matrix to upper bidiagonal form |
| f08lsc | Reduction of complex rectangular band matrix to upper bidiagonal form |
| f08ufc | Computes a split Cholesky factorization of real symmetric positive-definite band matrix A |
| f08utc | Computes a split Cholesky factorization of complex Hermitian positive-definite band matrix A |
| f16rbc | 1-norm, ∞-norm, Frobenius norm, largest absolute element, real band matrix |
| f16rec | 1-norm, ∞-norm, Frobenius norm, largest absolute element, real symmetric band matrix |
| f16ubc | 1-norm, ∞-norm, Frobenius norm, largest absolute element, complex band matrix |
| f16uec | 1-norm, ∞-norm, Frobenius norm, largest absolute element, complex Hermitian band matrix |