D01AHF | One-dimensional quadrature, adaptive, finite interval, strategy due to Patterson, suitable for well-behaved integrands |

D01AJF | One-dimensional quadrature, adaptive, finite interval, strategy due to Piessens and de Doncker, allowing for badly behaved integrands |

D01AKF | One-dimensional quadrature, adaptive, finite interval, method suitable for oscillating functions |

D01ALF | One-dimensional quadrature, adaptive, finite interval, allowing for singularities at user-specified break-points |

D01AMF | One-dimensional quadrature, adaptive, infinite or semi-infinite interval |

D01ANF | One-dimensional quadrature, adaptive, finite interval, weight function $\mathrm{cos}\left(\omega x\right)$ or $\mathrm{sin}\left(\omega x\right)$ |

D01APF | One-dimensional quadrature, adaptive, finite interval, weight function with end-point singularities of algebraico-logarithmic type |

D01AQF | One-dimensional quadrature, adaptive, finite interval, weight function $1/\left(x-c\right)$, Cauchy principal value (Hilbert transform) |

D02KEF | Second-order Sturm–Liouville problem, regular/singular system, finite/infinite range, eigenvalue and eigenfunction, user-specified break-points |

© The Numerical Algorithms Group Ltd, Oxford UK. 2013