E02ACF | Minimax curve fit by polynomials |

E02ADF | Least squares curve fit, by polynomials, arbitrary data points |

E02AEF | Evaluation of fitted polynomial in one variable from Chebyshev series form (simplified parameter list) |

E02AFF | Least squares polynomial fit, special data points (including interpolation) |

E02AGF | Least squares polynomial fit, values and derivatives may be constrained, arbitrary data points |

E02AHF | Derivative of fitted polynomial in Chebyshev series form |

E02AJF | Integral of fitted polynomial in Chebyshev series form |

E02AKF | Evaluation of fitted polynomial in one variable from Chebyshev series form |

E02BAF | Least squares curve cubic spline fit (including interpolation) |

E02BBF | Evaluation of fitted cubic spline, function only |

E02BCF | Evaluation of fitted cubic spline, function and derivatives |

E02BDF | Evaluation of fitted cubic spline, definite integral |

E02BEF | Least squares cubic spline curve fit, automatic knot placement |

E02BFF | Evaluation of fitted cubic spline, function and optionally derivatives at a vector of points |

E02CAF | Least squares surface fit by polynomials, data on lines parallel to one independent coordinate axis |

E02CBF | Evaluation of fitted polynomial in two variables |

E02DAF | Least squares surface fit, bicubic splines |

E02DCF | Least squares surface fit by bicubic splines with automatic knot placement, data on rectangular grid |

E02DDF | Least squares surface fit by bicubic splines with automatic knot placement, scattered data |

E02DEF | Evaluation of fitted bicubic spline at a vector of points |

E02DFF | Evaluation of fitted bicubic spline at a mesh of points |

E02DHF | Evaluation of spline surface at mesh of points with derivatives |

E02GAF | ${L}_{1}$-approximation by general linear function |

E02GBF | ${L}_{1}$-approximation by general linear function subject to linear inequality constraints |

E02GCF | ${L}_{\infty}$-approximation by general linear function |

E02JDF | Spline approximation to a set of scattered data using a two-stage approximation method |

E02JEF | Evaluation at a vector of points of a spline computed by E02JDF |

E02JFF | Evaluation at a mesh of points of a spline computed by E02JDF |

E02RAF | Padé approximants |

E02RBF | Evaluation of fitted rational function as computed by E02RAF |

E02ZAF | Sort two-dimensional data into panels for fitting bicubic splines |

E02ZKF | Option setting routine |

E02ZLF | Option getting routine |

© The Numerical Algorithms Group Ltd, Oxford UK. 2013