CGAL 4.4 - 2D and Surface Function Interpolation
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The functions regular_neighbor_coordinates_2()
compute natural neighbor coordinates, also called Sibson's coordinates, for weighted 2D
points provided a two-dimensional regular triangulation and a (weighted) query point inside the convex hull of the vertices of the triangulation.
We call these coordinates regular neighbor coordinates.
Requirements
Rt
are equivalent to the class Regular_triangulation_2<Traits, Tds>
. Traits
of Rt
is a model of the concept RegularTriangulationTraits_2
. It provides the number type FT
which is a model for FieldNumberType
and it must meet the requirements for the traits class of the polygon_area_2()
function. A model of this traits class is Regular_triangulation_euclidean_traits_2<K, Weight>
. OutputIterator
is equivalent to std::pair<Rt::Weighted_point, Rt::Geom_traits::FT>
, i.e. a pair associating a point and its regular neighbor coordinate. Implementation
This function computes the areas stolen from the Voronoi cells of points in rt
by the insertion of p
. The total area of the Voronoi cell of p
is also computed and returned by the function. If p
lies outside the convex hull, the coordinate values cannot be computed and the third value of the result triple is set to false
.
Functions | |
template<class Rt , class OutputIterator > | |
CGAL::Triple< OutputIterator, typename Rt::Geom_traits::FT, bool > | CGAL::regular_neighbor_coordinates_2 (const Rt &rt, const typename Rt::Weighted_point &p, OutputIterator out, typename Rt::Face_handle start=typename Rt::Face_handle()) |
computes the regular neighbor coordinates for p with respect to the weighted points in the two-dimensional regular triangulation rt . More... | |
template<class Rt , class OutputIterator , class EdgeIterator , class VertexIterator > | |
CGAL::Triple< OutputIterator, typename Traits::FT, bool > | CGAL::regular_neighbor_coordinates_2 (const Rt &rt, const typename Traits::Weighted_point &p, OutputIterator out, EdgeIterator hole_begin, EdgeIterator hole_end, VertexIterator hidden_vertices_begin, VertexIterator hidden_vertices_end) |
The same as above. More... | |
template<class Rt , class OutputIterator > | |
CGAL::Triple< OutputIterator, typename Rt::Geom_traits::FT, bool > | CGAL::regular_neighbor_coordinates_2 (const Rt &rt, typename Rt::Vertex_handle vh, OutputIterator out) |
computes the regular neighbor coordinates of the point vh->point() with respect to the vertices of rt excluding vh->point() . More... | |
CGAL::Triple<OutputIterator, typename Rt::Geom_traits::FT, bool > CGAL::regular_neighbor_coordinates_2 | ( | const Rt & | rt, |
const typename Rt::Weighted_point & | p, | ||
OutputIterator | out, | ||
typename Rt::Face_handle | start = typename Rt::Face_handle() |
||
) |
computes the regular neighbor coordinates for p
with respect to the weighted points in the two-dimensional regular triangulation rt
.
Rt | must be a Regular_triangulation_2<Traits, Tds> . |
OutputIterator | must have the value type std::pair<Rt::Weighted_point, Rt::Geom_traits::FT . The sequence of point/coordinate pairs that is computed by the function is placed starting at out . |
The function returns a triple with an iterator that is placed past-the-end of the resulting sequence of point/coordinate pairs, the normalization factor of the coordinates and a Boolean value which is set to true
, iff the coordinate computation was successful, i.e., if p
lies inside the convex hull of the points in rt
.
#include <CGAL/regular_neighbor_coordinates_2.h>
CGAL::Triple<OutputIterator, typename Traits::FT, bool > CGAL::regular_neighbor_coordinates_2 | ( | const Rt & | rt, |
const typename Traits::Weighted_point & | p, | ||
OutputIterator | out, | ||
EdgeIterator | hole_begin, | ||
EdgeIterator | hole_end, | ||
VertexIterator | hidden_vertices_begin, | ||
VertexIterator | hidden_vertices_end | ||
) |
The same as above.
The iterator range [hole_begin, hole_end)
determines the boundary edges of the conflict zone of p
in the triangulation rt
. rt.hidden_vertices_begin()
and rt.hidden_vertices_end()
determines the iterator range over the hidden vertices of the conflict zone of p
inrt
. It is the result of the function rt.get_boundary_of_conflicts(p,std::back_inserter(hole), std::back_inserter(hidden_vertices), start)
.
#include <CGAL/regular_neighbor_coordinates_2.h>
CGAL::Triple< OutputIterator, typename Rt::Geom_traits::FT, bool > CGAL::regular_neighbor_coordinates_2 | ( | const Rt & | rt, |
typename Rt::Vertex_handle | vh, | ||
OutputIterator | out | ||
) |
computes the regular neighbor coordinates of the point vh->point()
with respect to the vertices of rt
excluding vh->point()
.
The same as above for the remaining parameters.
#include <CGAL/regular_neighbor_coordinates_2.h>