| D02AGF | ODEs, boundary value problem, shooting and matching technique, allowing interior matching point, general parameters to be determined |
| D02BGF | ODEs, IVP, Runge–Kutta–Merson method, until a component attains given value (simple driver) |
| D02BHF | ODEs, IVP, Runge–Kutta–Merson method, until function of solution is zero (simple driver) |
| D02BJF | ODEs, IVP, Runge–Kutta method, until function of solution is zero, integration over range with intermediate output (simple driver) |
| D02CJF | ODEs, IVP, Adams method, until function of solution is zero, intermediate output (simple driver) |
| D02EJF | ODEs, stiff IVP, BDF method, until function of solution is zero, intermediate output (simple driver) |
| D02GAF | ODEs, boundary value problem, finite difference technique with deferred correction, simple nonlinear problem |
| D02GBF | ODEs, boundary value problem, finite difference technique with deferred correction, general linear problem |
| D02HAF | ODEs, boundary value problem, shooting and matching, boundary values to be determined |
| D02HBF | ODEs, boundary value problem, shooting and matching, general parameters to be determined |
| D02JAF | ODEs, boundary value problem, collocation and least-squares, single nth-order linear equation |
| D02JBF | ODEs, boundary value problem, collocation and least-squares, system of first-order linear equations |
| D02LAF | Second-order ODEs, IVP, Runge–Kutta–Nystrom method |
| D02LXF | Second-order ODEs, IVP, setup for D02LAF |
| D02LYF | Second-order ODEs, IVP, diagnostics for D02LAF |
| D02LZF | Second-order ODEs, IVP, interpolation for D02LAF |
| D02MVF | ODEs, IVP, DASSL method, setup for D02M–N routines |
| D02MZF | ODEs, IVP, interpolation for D02M–N routines, natural interpolant |
| D02NBF | Explicit ODEs, stiff IVP, full Jacobian (comprehensive) |
| D02NCF | Explicit ODEs, stiff IVP, banded Jacobian (comprehensive) |
| D02NDF | Explicit ODEs, stiff IVP, sparse Jacobian (comprehensive) |
| D02NGF | Implicit/algebraic ODEs, stiff IVP, full Jacobian (comprehensive) |
| D02NHF | Implicit/algebraic ODEs, stiff IVP, banded Jacobian (comprehensive) |
| D02NJF | Implicit/algebraic ODEs, stiff IVP, sparse Jacobian (comprehensive) |
| D02NMF | Explicit ODEs, stiff IVP (reverse communication, comprehensive) |
| D02NNF | Implicit/algebraic ODEs, stiff IVP (reverse communication, comprehensive) |
| D02NRF | ODEs, IVP, for use with D02M–N routines, sparse Jacobian, enquiry routine |
| D02NSF | ODEs, IVP, for use with D02M–N routines, full Jacobian, linear algebra set up |
| D02NTF | ODEs, IVP, for use with D02M–N routines, banded Jacobian, linear algebra set up |
| D02NUF | ODEs, IVP, for use with D02M–N routines, sparse Jacobian, linear algebra set up |
| D02NVF | ODEs, IVP, BDF method, setup for D02M–N routines |
| D02NWF | ODEs, IVP, Blend method, setup for D02M–N routines |
| D02NXF | ODEs, IVP, sparse Jacobian, linear algebra diagnostics, for use with D02M–N routines |
| D02NYF | ODEs, IVP, integrator diagnostics, for use with D02M–N routines |
| D02NZF | ODEs, IVP, setup for continuation calls to integrator, for use with D02M–N routines |
| D02PCF | ODEs, IVP, Runge–Kutta method, integration over range with output |
| D02PDF | ODEs, IVP, Runge–Kutta method, integration over one step |
| D02PVF | ODEs, IVP, setup for D02PCF and D02PDF |
| D02PWF | ODEs, IVP, resets end of range for D02PDF |
| D02PXF | ODEs, IVP, interpolation for D02PDF |
| D02PYF | ODEs, IVP, integration diagnostics for D02PCF and D02PDF |
| D02PZF | ODEs, IVP, error assessment diagnostics for D02PCF and D02PDF |
| D02QFF | ODEs, IVP, Adams method with root-finding (forward communication, comprehensive) |
| D02QGF | ODEs, IVP, Adams method with root-finding (reverse communication, comprehensive) |
| D02QWF | ODEs, IVP, setup for D02QFF and D02QGF |
| D02QXF | ODEs, IVP, diagnostics for D02QFF and D02QGF |
| D02QYF | ODEs, IVP, root-finding diagnostics for D02QFF and D02QGF |
| D02QZF | ODEs, IVP, interpolation for D02QFF or D02QGF |
| D02RAF | ODEs, general nonlinear boundary value problem, finite difference technique with deferred correction, continuation facility |
| D02SAF | ODEs, boundary value problem, shooting and matching technique, subject to extra algebraic equations, general parameters to be determined |
| D02TGF | nth-order linear ODEs, boundary value problem, collocation and least-squares |
| D02TKF | ODEs, general nonlinear boundary value problem, collocation technique |
| D02TVF | ODEs, general nonlinear boundary value problem, setup for D02TKF |
| D02TXF | ODEs, general nonlinear boundary value problem, continuation facility for D02TKF |
| D02TYF | ODEs, general nonlinear boundary value problem, interpolation for D02TKF |
| D02TZF | ODEs, general nonlinear boundary value problem, diagnostics for D02TKF |
| D02XJF | ODEs, IVP, interpolation for D02M–N routines, natural interpolant |
| D02XKF | ODEs, IVP, interpolation for D02M–N routines, C1 interpolant |
| D02ZAF | ODEs, IVP, weighted norm of local error estimate for D02M–N routines |