/usr/include/CGAL/Extended_cartesian.h is in libcgal-dev 4.11-2build1.
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// All rights reserved.
//
// This file is part of CGAL (www.cgal.org).
// You can redistribute it and/or modify it under the terms of the GNU
// General Public License as published by the Free Software Foundation,
// either version 3 of the License, or (at your option) any later version.
//
// Licensees holding a valid commercial license may use this file in
// accordance with the commercial license agreement provided with the software.
//
// This file is provided AS IS with NO WARRANTY OF ANY KIND, INCLUDING THE
// WARRANTY OF DESIGN, MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE.
//
// $URL$
// $Id$
//
//
// Author(s) : Michael Seel <seel@mpi-sb.mpg.de>
#ifndef CGAL_EXTENDED_CARTESIAN_H
#define CGAL_EXTENDED_CARTESIAN_H
#include <CGAL/license/Nef_2.h>
#include <CGAL/Simple_cartesian.h>
#include <CGAL/Point_2.h>
#include <CGAL/Line_2_Line_2_intersection.h>
#include <CGAL/Nef_polynomial.h>
#undef CGAL_NEF_DEBUG
#define CGAL_NEF_DEBUG 5
#include <CGAL/Nef_2/debug.h>
#include <CGAL/Nef_2/Line_to_epoint.h>
#include <CGAL/Is_extended_kernel.h>
namespace CGAL {
template <class T> class Extended_cartesian;
template<class T>
struct Is_extended_kernel<Extended_cartesian<T> > {
typedef Tag_true value_type;
};
/*{\Xanpage {Extended_cartesian}{}{An extended geometric kernel model}{K}}*/
template <class pFT>
class Extended_cartesian : public
CGAL::Simple_cartesian< CGAL::Nef_polynomial<pFT> > {
public:
typedef CGAL::Simple_cartesian< CGAL::Nef_polynomial<pFT> > Base;
typedef Extended_cartesian<pFT> Self;
typedef Cartesian_tag Kernel_tag;
/*{\Xdefinition |\Mname| is a kernel model realizing the concept
extended geometry. }*/
/*{\Xtypes 6.5}*/
/*{\Xtext \headerline{Affine kernel and types}}*/
typedef CGAL::Simple_cartesian<pFT> Standard_kernel;
/*{\Xtypemember the standard affine kernel.}*/
typedef typename Standard_kernel::RT Standard_RT;
/*{\Xtypemember the standard ring type.}*/
typedef typename Standard_kernel::FT Standard_FT;
/*{\Xtypemember the field type.}*/
typedef typename Standard_kernel::Point_2 Standard_point_2;
/*{\Xtypemember standard points.}*/
typedef typename Standard_kernel::Segment_2 Standard_segment_2;
/*{\Xtypemember standard segments.}*/
typedef typename Standard_kernel::Line_2 Standard_line_2;
/*{\Xtypemember standard oriented lines.}*/
typedef typename Standard_kernel::Direction_2 Standard_direction_2;
/*{\Xtypemember standard directions.}*/
typedef typename Standard_kernel::Ray_2 Standard_ray_2;
/*{\Xtypemember standard rays.}*/
typedef typename Standard_kernel::Aff_transformation_2
Standard_aff_transformation_2;
/*{\Xtypemember standard affine transformations.}*/
/*{\Xtext \headerline{Extended kernel types}}*/
typedef typename Base::RT RT;
/*{\Xtypemember the ring type of our extended kernel.}*/
typedef typename Base::FT FT;
/*{\Xtypemember the ring type of our extended kernel.}*/
typedef typename Base::Point_2 Point_2;
/*{\Xtypemember extended points.}*/
typedef typename Base::Segment_2 Segment_2;
/*{\Xtypemember extended segments.}*/
typedef typename Base::Line_2 Line_2;
/*{\Xtypemember extended lines.}*/
typedef typename Base::Direction_2 Direction_2;
/*{\Xtypemember extended directions.}*/
enum Point_type { SWCORNER=1, LEFTFRAME, NWCORNER,
BOTTOMFRAME, STANDARD, TOPFRAME,
SECORNER, RIGHTFRAME, NECORNER };
/*{\Xenum a type descriptor for extended points.}*/
Point_2 epoint(const Standard_FT& m1, const Standard_FT& n1,
const Standard_FT& m2, const Standard_FT& n2) const
{ return Point_2(FT(n1,m1),FT(n2,m2)); }
public:
/*{\Xoperations 2}*/
/*{\Xtext \headerline{Interfacing the affine kernel types}}*/
Point_2 construct_point(const Standard_point_2& p) const
/*{\Xop creates an extended point |Point_2| and initializes it to the
standard point |p|.}*/
{ return Point_2(p.x(), p.y()); }
Point_2 construct_point(const Standard_line_2& l, Point_type& t) const
/*{\Xop creates an extended point initialized to the equivalence
class of all the rays underlying the oriented line |l|.
|t| returns the type of the new extended point.}*/
{
t = (Point_type)Line_to_epoint<Standard_kernel>::determine_type(l);
Point_2 res;
switch (t) {
case SWCORNER: res = epoint(-1, 0, -1, 0); break;
case NWCORNER: res = epoint(-1, 0, 1, 0); break;
case SECORNER: res = epoint( 1, 0, -1, 0); break;
case NECORNER: res = epoint( 1, 0, 1, 0); break;
case LEFTFRAME:
res = epoint(-1, 0, l.a()/l.b(), -l.c()/l.b()); break;
case RIGHTFRAME:
res = epoint( 1, 0, -l.a()/l.b(), -l.c()/l.b()); break;
case BOTTOMFRAME:
res = epoint( l.b()/l.a(), -l.c()/l.a(), -1, 0); break;
case TOPFRAME:
res = epoint(-l.b()/l.a(), -l.c()/l.a(), 1, 0); break;
default: CGAL_error_msg("EPoint type not correct!");
}
return res;
}
Point_2 construct_point(const Standard_point_2& p1,
const Standard_point_2& p2,
Point_type& t) const
/*{\Xop creates an extended point and initializes it to the equivalence
class of all the rays underlying the oriented line |l(p1,p2)|.
|t| returns the type of the new extended point.}*/
{ return construct_point(Standard_line_2(p1,p2),t); }
Point_2 construct_point(const Standard_line_2& l) const
/*{\Xop creates an extended point and initializes it to the equivalence
class of all the rays underlying the oriented line |l|. }*/
{ Point_type dummy; return construct_point(l,dummy); }
Point_2 construct_point(const Standard_point_2& p1,
const Standard_point_2& p2) const
/*{\Xop creates an extended point and initializes it to the equivalence
class of all the rays underlying the oriented line |l(p1,p2)|.}*/
{ return construct_point(Standard_line_2(p1,p2)); }
Point_2 construct_point(const Standard_point_2& p,
const Standard_direction_2& d) const
/*{\Xop creates an extended point and initializes it to the equivalence
class of all the rays underlying the ray starting in |p| in direction |d|.}*/
{ return construct_point(Standard_line_2(p,d)); }
Point_2 construct_opposite_point(const Standard_line_2& l) const
/*{\Xop creates an extended point and initializes it to the equivalence
class of all the rays underlying the oriented line opposite to |l|. }*/
{ Point_type dummy; return construct_point(l.opposite(),dummy); }
Point_type type(const Point_2& p) const
/*{\Xop determines the type of |p| and returns it.}*/
{
CGAL_assertion(p.x().degree()>=0 && p.y().degree()>=0 );
if ( p.x().degree() == 0 && p.y().degree() == 0)
return STANDARD;
// now we are on the square frame
FT rx = p.x();
FT ry = p.y();
int sx = CGAL_NTS sign(rx);
int sy = CGAL_NTS sign(ry);
if (sx < 0) rx = -rx;
if (sy < 0) ry = -ry;
if (rx>ry) {
if (sx > 0) return RIGHTFRAME;
else return LEFTFRAME;
}
if (rx<ry) {
if (sy > 0) return TOPFRAME;
else return BOTTOMFRAME;
}
// now (rx == ry)
if (sx==sy) {
if (sx < 0) return SWCORNER;
else return NECORNER;
} else { CGAL_assertion(sx==-sy);
if (sx < 0) return NWCORNER;
else return SECORNER;
}
}
bool is_standard(const Point_2& p) const
/*{\Xop returns |true| iff |p| is a standard point.}*/
{ return (type(p)==STANDARD); }
Standard_point_2 standard_point(const Point_2& p) const
/*{\Xop returns the standard point represented by |p|.
\precond |\Mvar.is_standard(p)|.}*/
{ CGAL_assertion( type(p)==STANDARD );
return Standard_point_2(p.x()[0],p.y()[0]);
}
Standard_line_2 standard_line(const Point_2& p) const
/*{\Xop returns the oriented line representing the
bundle of rays defining |p|.
\precond |!\Mvar.is_standard(p)|.}*/
{ CGAL_assertion( type(p)!=STANDARD );
FT x = p.x(), y = p.y();
Standard_FT dx = x.degree()>0 ? x[1] : Standard_FT(0);
Standard_FT dy = y.degree()>0 ? y[1] : Standard_FT(0);
Standard_point_2 p0(x[0],y[0]);
Standard_point_2 p1(x[0]+dx,y[0]+dy);
return Standard_line_2(p0,p1);
}
Standard_ray_2 standard_ray(const Point_2& p) const
/*{\Xop a ray defining |p|. \precond |!\Mvar.is_standard(p)|.}*/
{
CGAL_assertion( type(p)!=STANDARD );
FT x = p.x(), y = p.y();
Standard_FT dx = x.degree()>0 ? x[1] : Standard_FT(0);
Standard_FT dy = y.degree()>0 ? y[1] : Standard_FT(0);
Standard_point_2 p0(x[0],y[0]);
Standard_point_2 p1(x[0]+dx,y[0]+dy);
return Standard_ray_2(p0,p1);
}
Point_2 NE() const { return construct_point(Standard_line_2(-1, 1,0)); }
/*{\Xop returns the point on the north east frame corner.}*/
Point_2 SE() const { return construct_point(Standard_line_2( 1, 1,0)); }
/*{\Xop returns the point on the south east frame corner.}*/
Point_2 NW() const { return construct_point(Standard_line_2(-1,-1,0)); }
/*{\Xop returns the point on the north west frame corner.}*/
Point_2 SW() const { return construct_point(Standard_line_2( 1,-1,0)); }
/*{\Xop returns the point on the south west frame corner.}*/
Line_2 upper() const { return construct_line(NW(),NE()); }
/*{\Xop returns the line underlying the upper frame segment.}*/
Line_2 lower() const { return construct_line(SW(),SE()); }
/*{\Xop returns the line underlying the lower frame segment.}*/
Line_2 left() const { return construct_line(SW(),NW()); }
/*{\Xop returns the line underlying the left frame segment.}*/
Line_2 right() const { return construct_line(SE(),NE()); }
/*{\Xop returns the line underlying the right frame segment.}*/
/*{\Xtext \headerline{Geometric kernel calls}}*/
Point_2 source(const Segment_2& s) const
/*{\Xop returns the source point of |s|.}*/
{ typename Base::Construct_vertex_2 _source =
this->construct_vertex_2_object();
return _source(s,0); }
Point_2 target(const Segment_2& s) const
/*{\Xop returns the target point of |s|.}*/
{ typename Base::Construct_vertex_2 _target =
this->construct_vertex_2_object();
return _target(s,1); }
Segment_2 construct_segment(const Point_2& p, const Point_2& q) const
/*{\Xop constructs a segment |pq|.}*/
{ typename Base::Construct_segment_2 _segment =
this->construct_segment_2_object();
return _segment(p,q); }
Line_2 construct_line(const Standard_line_2& l) const
/*{\Xop returns an extended line.}*/
{ return Line_2(l.a(),l.b(),l.c()); }
Line_2 construct_line(const Point_2& p1, const Point_2& p2) const
/*{\Xop returns a line through the two extended points |p1| and |p2|.}*/
{ Line_2 l(p1,p2);
CGAL_NEF_TRACEN("eline("<<p1<<p2<<")="<<l);
RT a=l.a(), b=l.b(), c=l.c();
l = Line_2(a,b,c);
return l;
}
int orientation(const Segment_2& s, const Point_2& p) const
/*{\Xop returns the orientation of |p| with respect to the line
through |s|.}*/
{ typename Base::Orientation_2 _orientation =
this->orientation_2_object();
return static_cast<int> ( _orientation(source(s),target(s),p) );
}
int orientation(const Point_2& p1, const Point_2& p2, const Point_2& p3)
const
/*{\Xop returns the orientation of |p2| with respect to the line
through |p1p2|.}*/
{ typename Base::Orientation_2 _orientation =
this->orientation_2_object();
return static_cast<int> ( _orientation(p1,p2,p3) );
}
bool left_turn(const Point_2& p1, const Point_2& p2, const Point_2& p3)
const
/*{\Xop return true iff the |p3| is left of the line through |p1p2|.}*/
{ return orientation(p1,p2,p3) > 0; }
bool is_degenerate(const Segment_2& s) const
/*{\Xop return true iff |s| is degenerate.}*/
{ typename Base::Is_degenerate_2 _is_degenerate =
this->is_degenerate_2_object();
return _is_degenerate(s); }
int compare_xy(const Point_2& p1, const Point_2& p2) const
/*{\Xop returns the lexicographic order of |p1| and |p2|.}*/
{ typename Base::Compare_xy_2 _compare_xy =
this->compare_xy_2_object();
return static_cast<int>( _compare_xy(p1,p2) );
}
int compare_x(const Point_2& p1, const Point_2& p2) const
/*{\Xop returns the order on the $x$-coordinates of |p1| and |p2|.}*/
{ typename Base::Compare_x_2 _compare_x =
this->compare_x_2_object();
return static_cast<int>( _compare_x(p1,p2) );
}
int compare_y(const Point_2& p1, const Point_2& p2) const
/*{\Xop returns the order on the $y$-coordinates of |p1| and |p2|.}*/
{ typename Base::Compare_y_2 _compare_y =
this->compare_y_2_object();
return static_cast<int>( _compare_y(p1,p2) );
}
Point_2 intersection(
const Segment_2& s1, const Segment_2& s2) const
/*{\Xop returns the point of intersection of the lines supported by |s1|
and |s2|.}*/
{ typename Base::Intersect_2 _intersect =
this->intersect_2_object();
typename Base::Construct_line_2 _line =
this->construct_line_2_object();
Point_2 p;
Line_2 l1 = _line(s1);
Line_2 l2 = _line(s2);
CGAL::Object result =
_intersect(l1, l2);
if ( !CGAL::assign(p, result) )
CGAL_error_msg("intersection: no intersection.");
return p;
}
Direction_2 construct_direction(
const Point_2& p1, const Point_2& p2) const
/*{\Xop returns the direction of the vector |p2| - |p1|.}*/
{ typename Base::Construct_direction_2 _direction =
this->construct_direction_2_object();
return _direction(construct_line(p1,p2)); }
bool strictly_ordered_ccw(const Direction_2& d1,
const Direction_2& d2, const Direction_2& d3) const
/*{\Xop returns |true| iff |d2| is in the interior of the
counterclockwise angular sector between |d1| and |d3|.}*/
{
if ( d1 < d2 ) return ( d2 < d3 )||( d3 <= d1 );
if ( d1 > d2 ) return ( d2 < d3 )&&( d3 <= d1 );
return false;
}
bool contains(const Segment_2& s, const Point_2& p) const
/*{\Xop returns true iff |s| contains |p|.}*/
{ typename Base::Has_on_2 _contains = this->has_on_2_object();
return _contains(s,p);
}
bool strictly_ordered_along_line(
const Point_2& p1, const Point_2& p2, const Point_2& p3) const
/*{\Xop returns |true| iff |p2| is in the relative interior of the
segment |p1p3|.}*/
{ typename Base::Are_strictly_ordered_along_line_2 _ordered =
this->are_strictly_ordered_along_line_2_object();
return _ordered(p1,p2,p3);
}
bool first_pair_closer_than_second(
const Point_2& p1, const Point_2& p2,
const Point_2& p3, const Point_2& p4) const
{ return ( squared_distance(p1,p2) < squared_distance(p3,p4) ); }
template <class Forward_iterator>
void determine_frame_radius(Forward_iterator start, Forward_iterator end,
Standard_RT& R0) const
{ Standard_RT R;
while ( start != end ) {
Point_2 p = *start++;
if ( is_standard(p) ) {
R = (CGAL::max)(CGAL_NTS abs(p.x()[0]), CGAL_NTS abs(p.y()[0]));
} else {
RT rx = CGAL_NTS abs(p.x()), ry = CGAL_NTS abs(p.y());
if ( rx[1] > ry[1] ) R = CGAL_NTS abs(ry[0]-rx[0])/(rx[1]-ry[1]);
else if ( rx[1] < ry[1] ) R = CGAL_NTS abs(rx[0]-ry[0])/(ry[1]-rx[1]);
else /* rx[1] == ry[1] */ R = CGAL_NTS abs(rx[0]-ry[0])/2;
}
R0 = (CGAL::max)(R+1,R0);
}
}
const char* output_identifier() const { return "Extended_cartesian"; }
};
#undef Polynomial
} //namespace CGAL
#endif // CGAL_EXTENDED_CARTESIAN_H
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