Copyright | (c) 2011 diagrams-lib team (see LICENSE) |
---|---|

License | BSD-style (see LICENSE) |

Maintainer | diagrams-discuss@googlegroups.com |

Safe Haskell | None |

Language | Haskell2010 |

A *cubic spline* is a smooth, connected sequence of cubic curves
passing through a given sequence of points. This module provides
the `cubicSpline`

method, which can be used to create closed or
open cubic splines from a list of points. For access to the
internals of the spline generation algorithm (including in
particular a solver for cyclic tridiagonal systems of linear
equations), see Diagrams.CubicSpline.Internal.

- cubicSpline :: (V t ~ v, N t ~ n, TrailLike t, Fractional (v n)) => Bool -> [Point v n] -> t

# Constructing paths from cubic splines

cubicSpline :: (V t ~ v, N t ~ n, TrailLike t, Fractional (v n)) => Bool -> [Point v n] -> t Source #

Construct a spline path-like thing of cubic segments from a list of vertices, with the first vertex as the starting point. The first argument specifies whether the path should be closed.

pts = map p2 [(0,0), (2,3), (5,-2), (-4,1), (0,3)] spot = circle 0.2 # fc blue # lw none mkPath closed = position (zip pts (repeat spot)) <> cubicSpline closed pts cubicSplineEx = (mkPath False ||| strutX 2 ||| mkPath True) # centerXY # pad 1.1

For more information, see http://mathworld.wolfram.com/CubicSpline.html.