(**************************************************************************) (* *) (* Ocamlgraph: a generic graph library for OCaml *) (* Copyright (C) 2004-2010 *) (* Sylvain Conchon, Jean-Christophe Filliatre and Julien Signoles *) (* *) (* This software is free software; you can redistribute it and/or *) (* modify it under the terms of the GNU Library General Public *) (* License version 2.1, with the special exception on linking *) (* described in file LICENSE. *) (* *) (* This software is distributed in the hope that it will be useful, *) (* but WITHOUT ANY WARRANTY; without even the implied warranty of *) (* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. *) (* *) (**************************************************************************) (* $Id: delaunay.mli,v 1.8 2004-02-20 14:37:40 signoles Exp $ *) (** Delaunay triangulation. *) (** Delaunay triangulation is available for any CCC system in the sense of Knuth's ``Axioms and Hulls'' *) module type CCC = sig type point val ccw : point -> point -> point -> bool (** The counterclockwise relation [ccw p q r] states that the circle through points [(p,q,r)] is traversed counterclockwise when we encounter the points in cyclic order [p,q,r,p,...] **) val in_circle : point -> point -> point -> point -> bool (** The relation [in_circle p q r s] states that [s] lies inside the circle [(p,q,r)] if [ccw p q r] is true, or outside that circle if [ccw p q r] is false. *) end (** The result of triangulation is an abstract value of type [triangulation]. Then one can iterate over all edges of the triangulation. *) module type Triangulation = sig module S : CCC type triangulation val triangulate : S.point array -> triangulation (** [triangulate a] computes the Delaunay triangulation of a set of points, given as an array [a]. If [N] is the number of points (that is [Array.length a]), then the running time is $O(N \log N)$ on the average and $O(N^2)$ on the worst-case. The space used is always $O(N)$. *) val iter : (S.point -> S.point -> unit) -> triangulation -> unit (** [iter f t] iterates over all edges of the triangulation [t]. [f u v] is called once for each undirected edge [(u,v)]. *) val fold : (S.point -> S.point -> 'a -> 'a) -> triangulation -> 'a -> 'a val iter_triangles : (S.point -> S.point -> S.point -> unit) -> triangulation -> unit end (** Generic Delaunay triangulation *) module Make(S : CCC) : Triangulation with module S = S (** Points with integer coordinates *) module IntPoints : CCC with type point = int * int (** Delaunay triangulation with integer coordinates *) module Int : Triangulation with module S = IntPoints (** Points with floating point coordinates *) module FloatPoints : CCC with type point = float * float (** Delaunay triangulation with floating point coordinates *) module Float : Triangulation with module S = FloatPoints
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