#include <CGAL/Delaunay_d.h>

Inherits from

Definition

Deprecated:: This package is deprecated since the version 4.6 of CGAL.

The package dD Triangulations should be used instead.

An instance DT of type Delaunay_d< R, Lifted_R > is the nearest and furthest site Delaunay triangulation of a set S of points in some d-dimensional space. We call S the underlying point set and d or dim the dimension of the underlying space. We use dcur to denote the affine dimension of S. The data type supports incremental construction of Delaunay triangulations and various kind of query operations (in particular, nearest and furthest neighbor queries and range queries with spheres and simplices).

A Delaunay triangulation is a simplicial complex. All simplices in the Delaunay triangulation have dimension dcur. In the nearest site Delaunay triangulation the circumsphere of any simplex in the triangulation contains no point of \( S\) in its interior. In the furthest site Delaunay triangulation the circumsphere of any simplex contains no point of \( S\) in its exterior. If the points in \( S\) are co-circular then any triangulation of \( S\) is a nearest as well as a furthest site Delaunay triangulation of \( S\). If the points in \( S\) are not co-circular then no simplex can be a simplex of both triangulations. Accordingly, we view DT as either one or two collection(s) of simplices. If the points in \( S\) are co-circular there is just one collection: the set of simplices of some triangulation. If the points in \( S\) are not co-circular there are two collections. One collection consists of the simplices of a nearest site Delaunay triangulation and the other collection consists of the simplices of a furthest site Delaunay triangulation.

For each simplex of maximal dimension there is a handle of type Simplex_handle and for each vertex of the triangulation there is a handle of type Vertex_handle. Each simplex has 1 + dcur vertices indexed from 0 to dcur. For any simplex s and any index i, DT.vertex_of(s,i) returns the i-th vertex of s. There may or may not be a simplex t opposite to the vertex of s with index i. The function DT.opposite_simplex(s,i) returns t if it exists and returns Simplex_handle() otherwise. If t exists then s and t share dcur vertices, namely all but the vertex with index i of s and the vertex with index DT.index_of_vertex_in_opposite_simplex(s,i) of t. Assume that t = DT.opposite_simplex(s,i) exists and let j = DT.index_of_vertex_in_opposite_simplex(s,i). Then s = DT.opposite_simplex(t,j) and i = DT.index_of_vertex_in_opposite_simplex(t,j). In general, a vertex belongs to many simplices.

Any simplex of DT belongs either to the nearest or to the furthest site Delaunay triangulation or both. The test DT.simplex_of_nearest(dt_simplex s) returns true if s belongs to the nearest site triangulation and the test DT.simplex_of_furthest(dt_simplex s) returns true if s belongs to the furthest site triangulation.

Template Parameters

R	must be a model of the concept `DelaunayTraits_d`.
Lifted_R	must be a model of the concept `DelaunayLiftedTraits_d`.

Implementation

The data type is derived from Convex_hull_d via the lifting map. For a point x in d-dimensional space let lift(x) be its lifting to the unit paraboloid of revolution. There is an intimate relationship between the Delaunay triangulation of a point set \( S\) and the convex hull of lift(S): The nearest site Delaunay triangulation is the projection of the lower hull and the furthest site Delaunay triangulation is the upper hull. For implementation details we refer the reader to the implementation report available from the CGAL server.

The space requirement is the same as for convex hulls. The time requirement for an insert is the time to insert the lifted point into the convex hull of the lifted points.

Example

The abstract data type Delaunay_d has a default instantiation by means of the d-dimensional geometric kernel.

#include <CGAL/Homogeneous_d.h>
#include <CGAL/leda_integer.h>
#include <CGAL/Delaunay_d.h>
typedef leda_integer RT;
typedef CGAL::Homogeneous_d<RT> Kernel;
typedef CGAL::Delaunay_d<Kernel> Delaunay_d;
typedef Delaunay_d::Point_d Point;
typedef Delaunay_d::Simplex_handle Simplex_handle;
typedef Delaunay_d::Vertex_handle Vertex_handle;
int main()
{
Delaunay_d T(2);
Vertex_handle v1 = T.insert(Point_d(2,11));
...
}

Traits Requirements

Delaunay_d< R, Lifted_R > requires the following types from the kernel traits Lifted_R:

and uses the following function objects from the kernel traits:

Construct_hyperplane_d
Construct_vector_d
Vector_to_point_d / Point_to_vector_d
Orientation_d
Orthogonal_vector_d
Oriented_side_d / Has_on_positive_side_d
Affinely_independent_d
Contained_in_simplex_d
Contained_in_affine_hull_d
Intersect_d
Lift_to_paraboloid_d / Project_along_d_axis_d
Component_accessor_d

Delaunay_d< R, Lifted_R > requires the following types from the kernel traits R:

FT
Point_d
Sphere_d
Construct_sphere_d
Squared_distance_d
Point_of_sphere_d
Affinely_independent_d
Contained_in_simplex_d

Related Functions
(Note that these are not member functions.)
template<typename R , typename Lifted_R >
void	d2_map (const Delaunay_d< R, Lifted_R > &D, GRAPH< typename Delaunay_d< R, Lifted_R >::Point_d, int > &DTG, typename Delaunay_d< R, Lifted_R >::Delaunay_voronoi_kind k=Delaunay_d< R, Lifted_R >::NEAREST)
	constructs a LEDA graph representation of the nearest (`kind = NEAREST` or the furthest (`kind = FURTHEST`) site Delaunay triangulation. More...

Related Functions inherited from CGAL::Convex_hull_d< Lifted_R >
void	convex_hull_d_to_polyhedron_3 (const Convex_hull_d< Lifted_R > &C, Polyhedron_3< T, HDS > &P)

void	d3_surface_map (const Convex_hull_d< Lifted_R > &C, GRAPH< typename Convex_hull_d< Lifted_R >::Point_d, int > &G)

Types
enum	Delaunay_voronoi_kind { NEAREST, FURTHEST }
	interface flags More...

typedef unspecified_type	Simplex_handle
	handles to the simplices of the complex.

typedef unspecified_type	Vertex_handle
	handles to vertices of the complex.

typedef unspecified_type	Point_d
	the point type More...

typedef unspecified_type	Sphere_d
	the sphere type More...

typedef unspecified_type	Point_const_iterator
	the iterator for points.

typedef unspecified_type	Vertex_iterator
	the iterator for vertices.

typedef unspecified_type	Simplex_iterator
	the iterator for simplices.

Creation
The data type `Delaunay_d` offers neither copy constructor nor assignment operator.
	Delaunay_d (int d, R k1=R(), Lifted_R k2=Lifted_R())
	creates an instance `DT` of type `Delaunay_d`. More...

Operations
All operations below that take a point `x` as an argument have the common precondition that `x.dimension() == DT.dimension()`.
int	dimension ()
	returns the dimension of ambient space.

int	current_dimension ()
	returns the affine dimension of the current point set, i.e., `-1` is \( S\) is empty, `0` if \( S\) consists of a single point, `1` if all points of \( S\) lie on a common line, etc.

bool	is_simplex_of_nearest (Simplex_handle s)
	returns true if `s` is a simplex of the nearest site triangulation.

bool	is_simplex_of_furthest (Simplex_handle s)
	returns true if `s` is a simplex of the furthest site triangulation.

Vertex_handle	vertex_of_simplex (Simplex_handle s, int i)
	returns the vertex associated with the `i`-th node of `s`. More...

Point_d	associated_point (Vertex_handle v)
	returns the point associated with vertex `v`.

Point_d	point_of_simplex (Simplex_handle s, int i)
	returns the point associated with the `i`-th vertex of `s`. More...

Simplex_handle	opposite_simplex (Simplex_handle s, int i)
	returns the simplex opposite to the `i`-th vertex of `s` (`Simplex_handle()` if there is no such simplex). More...

int	index_of_vertex_in_opposite_simplex (Simplex_handle s, int i)
	returns the index of the vertex opposite to the `i`-th vertex of `s`. More...

Simplex_handle	simplex (Vertex_handle v)
	returns a simplex of the nearest site triangulation incident to `v`.

int	index (Vertex_handle v)
	returns the index of `v` in `DT.simplex(v)`.

bool	contains (Simplex_handle s, const Point_d &x)
	returns true if `x` is contained in the closure of simplex `s`.

bool	empty ()
	decides whether `DT` is empty.

void	clear ()
	re-initializes `DT` to the empty Delaunay triangulation.

Vertex_handle	insert (const Point_d &x)
	inserts point `x` into `DT` and returns the corresponding `Vertex_handle`. More...

Simplex_handle	locate (const Point_d &x)
	returns a simplex of the nearest site triangulation containing `x` in its closure (returns `Simplex_handle()` if `x` lies outside the convex hull of \( S\)).

Vertex_handle	lookup (const Point_d &x)
	if `DT` contains a vertex `v` with `associated_point(v) = x` the result is `v` otherwise the result is `Vertex_handle()`.

Vertex_handle	nearest_neighbor (const Point_d &x)
	computes a vertex `v` of `DT` that is closest to `x`, i.e., `dist(x,associated_point(v)) = min{dist(x, associated_point(u) \| u` \(\in S\) `}`.

std::list< Vertex_handle >	range_search (const Sphere_d &C)
	returns the list of all vertices contained in the closure of sphere \( C\).

std::list< Vertex_handle >	range_search (const std::vector< Point_d > &A)
	returns the list of all vertices contained in the closure of the simplex whose corners are given by `A`. More...

std::list< Simplex_handle >	all_simplices (Delaunay_voronoi_kind k=NEAREST)
	returns a list of all simplices of either the nearest or the furthest site Delaunay triangulation of `S`.

std::list< Vertex_handle >	all_vertices (Delaunay_voronoi_kind k=NEAREST)
	returns a list of all vertices of either the nearest or the furthest site Delaunay triangulation of `S`.

std::list< Point_d >	all_points ()
	returns \( S\).

Point_const_iterator	points_begin ()
	returns the start iterator for points in `DT`.

Point_const_iterator	points_end ()
	returns the past the end iterator for points in `DT`.

Simplex_iterator	simplices_begin (Delaunay_voronoi_kind k=NEAREST)
	returns the start iterator for simplices of `DT`.

Simplex_iterator	simplices_end ()
	returns the past the end iterator for simplices of `DT`.