C05NBF | Solution of system of nonlinear equations using function values only (easy-to-use) |

C05NCF | Solution of system of nonlinear equations using function values only (comprehensive) |

C05NDF | Solution of system of nonlinear equations using function values only (reverse communication) |

C05PBF | Solution of system of nonlinear equations using first derivatives (easy-to-use) |

C05PCF | Solution of system of nonlinear equations using first derivatives (comprehensive) |

C05PDF | Solution of system of nonlinear equations using first derivatives (reverse communication) |

D02GAF | ODEs, boundary value problem, finite difference technique with deferred correction, simple nonlinear problem |

D02RAF | ODEs, general nonlinear boundary value problem, finite difference technique with deferred correction, continuation facility |

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 |

D05BAF | Nonlinear Volterra convolution equation, second kind |

D05BDF | Nonlinear convolution Volterra–Abel equation, second kind, weakly singular |

D05BEF | Nonlinear convolution Volterra–Abel equation, first kind, weakly singular |

E04UCF | Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (forward communication, comprehensive) |

E04UFF | Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (reverse communication, comprehensive) |

E04USF | Minimum of a sum of squares, nonlinear constraints, sequential QP method, using function values and optionally first derivatives (comprehensive) |

E04YCF | Covariance matrix for nonlinear least-squares problem (unconstrained) |

Library Contents

Keywords in Context Index

© The Numerical Algorithms Group Ltd, Oxford UK. 2001