| e04xac | Computes an approximation to the gradient vector and/or the Hessian matrix |
| f06fec | Multiply real vector by reciprocal of scalar |
| f06kec | Multiply complex vector by reciprocal of real scalar |
| f06pac | Matrix-vector product, real rectangular matrix |
| f06pbc | Matrix-vector product, real rectangular band matrix |
| f06pcc | Matrix-vector product, real symmetric matrix |
| f06pdc | Matrix-vector product, real symmetric band matrix |
| f06pec | Matrix-vector product, real symmetric packed matrix |
| f06pfc | Matrix-vector product, real triangular matrix |
| f06pgc | Matrix-vector product, real triangular band matrix |
| f06phc | Matrix-vector product, real triangular packed matrix |
| f06sac | Matrix-vector product, complex rectangular matrix |
| f06sbc | Matrix-vector product, complex rectangular band matrix |
| f06scc | Matrix-vector product, complex Hermitian matrix |
| f06sdc | Matrix-vector product, complex Hermitian band matrix |
| f06sec | Matrix-vector product, complex Hermitian packed matrix |
| f06sfc | Matrix-vector product, complex triangular matrix |
| f06sgc | Matrix-vector product, complex triangular band matrix |
| f06shc | Matrix-vector product, complex triangular packed matrix |
| f06smc | Rank-1 update, complex rectangular matrix, unconjugated vector |
| f06snc | Rank-1 update, complex rectangular matrix, conjugated vector |
| f16dbc | Broadcast scalar into integer vector |
| f16ecc | Multiply real vector by scalar, preserving input vector |
| f16fbc | Broadcast scalar into real vector |
| f16hbc | Broadcast scalar into complex vector |
| f16pac | Matrix-vector product, real rectangular matrix |
| f16pbc | Matrix-vector product, real rectangular band matrix |
| f16pcc | Matrix-vector product, real symmetric matrix |
| f16pdc | Matrix-vector product, real symmetric band matrix |
| f16pec | Matrix-vector product, real symmetric packed matrix |
| f16pfc | Matrix-vector product, real triangular matrix |
| f16pgc | Matrix-vector product, real triangular band matrix |
| f16phc | Matrix-vector product, real triangular packed matrix |
| f16sac | Matrix-vector product, complex rectangular matrix |
| f16sbc | Matrix-vector product, complex rectangular band matrix |
| f16scc | Matrix-vector product, complex Hermitian matrix |
| f16sdc | Matrix-vector product, complex Hermitian band matrix |
| f16sec | Matrix-vector product, complex Hermitian packed matrix |
| f16sfc | Matrix-vector product, complex triangular matrix |
| f16sgc | Matrix-vector product, complex triangular band matrix |
| f16shc | Matrix-vector product, complex triangular packed matrix |
| f16smc | Rank-1 update, complex rectangular matrix, unconjugated vector |
| f16tac | Matrix-vector product, complex symmetric matrix |
| f16tcc | Matrix-vector product, complex symmetric packed matrix |
| g05eac | Set up reference vector for multivariate Normal distribution |
| g05ecc | Set up reference vector for generating pseudo-random integers, Poisson distribution |
| g05edc | Set up reference vector for generating pseudo-random integers, binomial distribution |
| g05ehc | Pseudo-random permutation of an integer vector |
| g05ejc | Pseudo-random sample without replacement from an integer vector |
| g05exc | Set up reference vector from supplied cumulative distribution function or probability distribution function |
| g05eyc | Pseudo-random integer from reference vector |
| g05ezc | Pseudo-random multivariate Normal vector from reference vector |
| g13dxc | Calculates the zeros of a vector autoregressive (or moving average) operator |
| m01fsc | Searches a vector for either the first or last match to a given value |
| m01zac | Inverts a permutation converting a rank vector to an index vector or vice versa |