| C05AVF
| Binary search for interval containing zero of continuous function (reverse communication) |
| C05AXF
| Zero of continuous function, continuation method, from a given starting value (reverse communication) |
| C05AZF
| Zero of continuous function in a given interval, Brent algorithm (reverse communication) |
| C05QDF
| Solution of a system of nonlinear equations using function values only (reverse communication) |
| C05RDF
| Solution of a system of nonlinear equations using first derivatives (reverse communication) |
| D01RAF
| One-dimensional quadrature, adaptive, finite interval, multiple integrands, vectorized abscissae, reverse communication |
| 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) |
| D02QGF
| Ordinary differential equations, initial value problem, Adams' method with root-finding (reverse communication, comprehensive) |
| D04BAF
| Numerical differentiation, user-supplied function values, derivatives up to order , derivatives with respect to one real variable |
| E04UFF
| Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (reverse communication, comprehensive) |
| F01GBF
| Action of a real matrix exponential on a real matrix (reverse communication) |
| F01HBF
| Action of a complex matrix exponential on a complex matrix (reverse communication) |
| F11DUF
| Solution of complex sparse nonsymmetric linear system, RGMRES, CGS, Bi-CGSTAB or TFQMR method, incomplete block diagonal preconditioner computed by F11DTF |
| F12ABF
| Selected eigenvalues and, optionally, eigenvectors of a real nonsymmetric sparse eigenproblem, reverse communication |
| F12APF
| Selected eigenvalues and, optionally, eigenvectors of a complex sparse eigenproblem, reverse communication |
| F12FBF
| Selected eigenvalues and, optionally, eigenvectors of a real symmetric sparse eigenproblem, reverse communication |
| H05AAF
| Best subsets of size (reverse communication) |