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replacing the usage of section in user man by \cgalHeading macro call

This commit is contained in:
Sébastien Loriot 2013-01-07 18:04:37 +01:00
parent 2daeae5678
commit 5ec28b1cf4
225 changed files with 450 additions and 450 deletions
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6
Alpha_shapes_2/doc/Alpha_shapes_2/CGAL/Alpha_shape_2.h
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@ -27,7 +27,7 @@ kernel. By default the `ExactAlphaComparisonTag` is set to \link Tag_false `Tag_
overhead. Note that since such a strategy does not make sense if used together with a traits class with exact constructions, overhead. Note that since such a strategy does not make sense if used together with a traits class with exact constructions,
the tag `ExactAlphaComparisonTag` is not taken into account if `Dt::Geom_traits::FT` is not a floating point number type. the tag `ExactAlphaComparisonTag` is not taken into account if `Dt::Geom_traits::FT` is not a floating point number type.
### Inherits From ### \cgalHeading{Inherits From}
Inherits from `Dt`. Inherits from `Dt`.
@ -36,12 +36,12 @@ This class is the underlying triangulation class.
The modifying functions `Alpha_shape_2::insert()` and `Alpha_shape_2::remove()` will overwrite The modifying functions `Alpha_shape_2::insert()` and `Alpha_shape_2::remove()` will overwrite
the inherited functions. At the moment, only the static version is implemented. the inherited functions. At the moment, only the static version is implemented.
### I/O ### \cgalHeading{I/O}
The I/O operators are defined for `std::iostream`. The format for the iostream The I/O operators are defined for `std::iostream`. The format for the iostream
is an internal format. is an internal format.
### Implementation ### \cgalHeading{Implementation}
The set of intervals associated with the The set of intervals associated with the
\f$ k\f$-dimensional faces of the underlying triangulation are \f$ k\f$-dimensional faces of the underlying triangulation are

6
Alpha_shapes_3/doc/Alpha_shapes_3/CGAL/Alpha_shape_3.h
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@ -19,7 +19,7 @@ the tag `ExactAlphaComparisonTag` is not taken into account if `Dt::Geom_traits:
Note that this class is at the same time used for <I>basic</I> and Note that this class is at the same time used for <I>basic</I> and
for <I>weighted</I> Alpha Shapes. for <I>weighted</I> Alpha Shapes.
### Inherits From ### \cgalHeading{Inherits From}
Inherits from `Dt`. Inherits from `Dt`.
@ -28,13 +28,13 @@ This class is the underlying triangulation class.
The modifying functions `insert` and `remove` will overwrite The modifying functions `insert` and `remove` will overwrite
the inherited functions. At the moment, only the static version is implemented. the inherited functions. At the moment, only the static version is implemented.
### I/O ### \cgalHeading{I/O}
The I/O operators are defined for `iostream`, and for The I/O operators are defined for `iostream`, and for
the window stream provided by \cgal. The format for the iostream the window stream provided by \cgal. The format for the iostream
is an internal format. is an internal format.
### Implementation ### \cgalHeading{Implementation}
In `GENERAL` mode, the alpha intervals of each triangulation In `GENERAL` mode, the alpha intervals of each triangulation
face is computed and stored at initialization time. face is computed and stored at initialization time.

4
Alpha_shapes_3/doc/Alpha_shapes_3/CGAL/Fixed_alpha_shape_3.h
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@ -15,7 +15,7 @@ a classification that specifies its status in the alpha complex, alpha being fix
Note that this class can be used at the same time to build a <I>basic</I> or Note that this class can be used at the same time to build a <I>basic</I> or
a <I>weighted</I> Alpha Shape. a <I>weighted</I> Alpha Shape.
### Inherits From ### \cgalHeading{Inherits From}
Inherits from `Dt`. Inherits from `Dt`.
@ -24,7 +24,7 @@ This class is the underlying triangulation class.
The modifying functions `insert` and `remove` will overwrite The modifying functions `insert` and `remove` will overwrite
the inherited functions. the inherited functions.
### I/O ### \cgalHeading{I/O}
The I/O operators are defined for `iostream`, and for The I/O operators are defined for `iostream`, and for
the window stream provided by \cgal. The format for the iostream the window stream provided by \cgal. The format for the iostream

4
Apollonius_graph_2/doc/Apollonius_graph_2/CGAL/Apollonius_graph_2.h
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@ -13,13 +13,13 @@ The second template argument defaults to
`CGAL::Triangulation_data_structure_2< CGAL::Apollonius_graph_vertex_base_2<Gt,true>, CGAL::Triangulation_face_base_2<Gt> >`. `CGAL::Triangulation_data_structure_2< CGAL::Apollonius_graph_vertex_base_2<Gt,true>, CGAL::Triangulation_face_base_2<Gt> >`.
\cgalModels `DelaunayGraph_2` \cgalModels `DelaunayGraph_2`
### Traversal of the Apollonius Graph ### \cgalHeading{Traversal of the Apollonius Graph}
An Apollonius graph can be seen as a container of faces and vertices. An Apollonius graph can be seen as a container of faces and vertices.
Therefore the Apollonius graph provides several iterators and Therefore the Apollonius graph provides several iterators and
circulators that allow to traverse it (completely or partially). circulators that allow to traverse it (completely or partially).
### Traversal of the Convex Hull ### \cgalHeading{Traversal of the Convex Hull}
Applied on the `infinite_vertex` the `incident_*` functions allow to Applied on the `infinite_vertex` the `incident_*` functions allow to
visit the vertices on the convex hull and the infinite edges and visit the vertices on the convex hull and the infinite edges and

2
Apollonius_graph_2/doc/Apollonius_graph_2/CGAL/Apollonius_graph_hierarchy_2.h
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@ -35,7 +35,7 @@ The `Apollonius_graph_hierarchy_2` class derives publicly from the
the same with its base class. In the sequel only the methods the same with its base class. In the sequel only the methods
overridden are documented. overridden are documented.
### Types ### \cgalHeading{Types}
`Apollonius_graph_hierarchy_2` does not introduce other types than those introduced by `Apollonius_graph_hierarchy_2` does not introduce other types than those introduced by
its base class `Apollonius_graph_2<Gt,Agds>`. its base class `Apollonius_graph_2<Gt,Agds>`.

4
Apollonius_graph_2/doc/Apollonius_graph_2/CGAL/Apollonius_site_2.h
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@ -10,12 +10,12 @@ The class `Apollonius_site_2` is a model for the concept
\cgalModels `ApolloniusSite_2` \cgalModels `ApolloniusSite_2`
### Types ### \cgalHeading{Types}
The class `Apollonius_site_2` does not introduce any types in addition to the The class `Apollonius_site_2` does not introduce any types in addition to the
concept `ApolloniusSite_2`. concept `ApolloniusSite_2`.
### I/O ### \cgalHeading{I/O}
The I/O operators are defined for `iostream`. The I/O operators are defined for `iostream`.

2
Arrangement_on_surface_2/doc/Arrangement_on_surface_2/CGAL/Arr_batched_point_location.h
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@ -14,7 +14,7 @@ pairs in the output sequence are sorted in increasing \f$ xy\f$-lexicographical
order of the query points. The function returns a past-the-end iterator of order of the query points. The function returns a past-the-end iterator of
the output sequence. the output sequence.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>`InputIterator::value_type` must be `Traits::Point_2`. <LI>`InputIterator::value_type` must be `Traits::Point_2`.

2
Arrangement_on_surface_2/doc/Arrangement_on_surface_2/CGAL/Arr_conic_traits_2.h
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@ -77,7 +77,7 @@ supports the merging of curves of opposite directions.
\cgalModels `ArrangementLandmarkTraits_2` \cgalModels `ArrangementLandmarkTraits_2`
\cgalModels `ArrangementDirectionalXMonotoneTraits_2` \cgalModels `ArrangementDirectionalXMonotoneTraits_2`
### Types ### \cgalHeading{Types}
*/ */

4
Arrangement_on_surface_2/doc/Arrangement_on_surface_2/CGAL/Arr_iostream.h
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@ -6,7 +6,7 @@ namespace CGAL {
The function `read` reads a given arrangement from a given input stream The function `read` reads a given arrangement from a given input stream
using a specific input format. using a specific input format.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `Formatter` class must model the <LI>The instantiated `Formatter` class must model the
@ -43,7 +43,7 @@ std::istream& read (Arrangement_2<Traits,Dcel>& arr,
The function `write` writes a given arrangement into a given output stream The function `write` writes a given arrangement into a given output stream
using a specific output format. using a specific output format.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `Formatter` class must model the <LI>The instantiated `Formatter` class must model the

2
Arrangement_on_surface_2/doc/Arrangement_on_surface_2/CGAL/Arr_vertical_decomposition_2.h
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@ -42,7 +42,7 @@ is no feature above it.
</UL> </UL>
The function returns a past-the-end iterator for its output sequence. The function returns a past-the-end iterator for its output sequence.
### Requirements ### \cgalHeading{Requirements}
`OutputIterator::value_type` must be `OutputIterator::value_type` must be
`pair<Arrangement_2::Vertex_const_handle, pair<Object, Object> >`. `pair<Arrangement_2::Vertex_const_handle, pair<Object, Object> >`.

18
Arrangement_on_surface_2/doc/Arrangement_on_surface_2/CGAL/Arrangement_2.h
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@ -979,7 +979,7 @@ namespace CGAL {
into \f$ x\f$-monotone subcurves (and perhaps isolated points), which are into \f$ x\f$-monotone subcurves (and perhaps isolated points), which are
inserted into the arrangement. inserted into the arrangement.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>If the curve is \f$ x\f$-monotone curve then The instantiated <LI>If the curve is \f$ x\f$-monotone curve then The instantiated
@ -1067,7 +1067,7 @@ void insert (Arrangement_2<Traits,Dcel>& arr,
edges or vertices of the existing arrangement `arr`. edges or vertices of the existing arrangement `arr`.
\pre If provided, `pl` must be attached to the given arrangement `arr`. \pre If provided, `pl` must be attached to the given arrangement `arr`.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>If `c` is \f$ x\f$-monotone then the instantiated `GeomTraits` <LI>If `c` is \f$ x\f$-monotone then the instantiated `GeomTraits`
@ -1108,7 +1108,7 @@ bool do_intersect (
\pre If provided, `pl` must be attached to the given arrangement `arr`. \pre If provided, `pl` must be attached to the given arrangement `arr`.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `Traits` class must model the restricted <LI>The instantiated `Traits` class must model the restricted
@ -1135,7 +1135,7 @@ insert_non_intersecting_curve (Arrangement_2<Traits,Dcel>& arr,
disjoint in their interior and pairwise interior-disjoint from all existing disjoint in their interior and pairwise interior-disjoint from all existing
arrangement vertices and edges. arrangement vertices and edges.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `Traits` class must model the <LI>The instantiated `Traits` class must model the
@ -1166,7 +1166,7 @@ void insert_non_intersecting_curves(Arrangement_2<Traits,Dcel>& arr,
\pre If provided, `pl` must be attached to the given arrangement `arr`. \pre If provided, `pl` must be attached to the given arrangement `arr`.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `Traits` class must model the <LI>The instantiated `Traits` class must model the
@ -1201,7 +1201,7 @@ insert_point (Arrangement_2<Traits,Dcel>& arr,
function may take a considerable amount of time; it is recommended to be function may take a considerable amount of time; it is recommended to be
used only for debugging purposes. used only for debugging purposes.
### Requirements ### \cgalHeading{Requirements}
The instantiated traits class must model the concept The instantiated traits class must model the concept
`ArranagmentXMonotoneTraits_2`. `ArranagmentXMonotoneTraits_2`.
@ -1229,7 +1229,7 @@ bool is_valid (const Arrangement_2<Traits, Dcel>& arr);
is returned. Otherwise, the face to which the edge was incident before the is returned. Otherwise, the face to which the edge was incident before the
removal is returned. removal is returned.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated traits class must model the concept <LI>The instantiated traits class must model the concept
@ -1254,7 +1254,7 @@ remove_edge (Arrangement_2<Traits,Dcel>& arr,
The function returns a boolean value that indicates whether it succeeded The function returns a boolean value that indicates whether it succeeded
removing the vertex from the arrangement. removing the vertex from the arrangement.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `Traits` class must model the <LI>The instantiated `Traits` class must model the
@ -1286,7 +1286,7 @@ bool remove_vertex (Arrangement_2<Traits,Dcel>& arr,
arrangement `arr`. arrangement `arr`.
\pre If provided, `pl` must be attached to the given arrangement `arr`. \pre If provided, `pl` must be attached to the given arrangement `arr`.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>The instantiated `GeomTraits` class must model the <LI>The instantiated `GeomTraits` class must model the

4
BGL/doc/BGL/CGAL/Polyhedron_items_with_id_3.h
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@ -15,11 +15,11 @@ halfedge.
\cgalModels `PolyhedronItems_3` \cgalModels `PolyhedronItems_3`
### Operations ### \cgalHeading{Operations}
Supported as required by the `PolyhedronItems_3` concept. Supported as required by the `PolyhedronItems_3` concept.
### Additional Methods in All Three Items ### \cgalHeading{Additional Methods in All Three Items}
\code \code
int id() const; // Returns the index. int id() const; // Returns the index.

12
Boolean_set_operations_2/doc/Boolean_set_operations_2/CGAL/Boolean_set_operations_2.h
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@ -73,7 +73,7 @@ The signature of the function is
OutputIterator difference(const Type1 & p1, const Type2 & p2, OutputIterator oi); OutputIterator difference(const Type1 & p1, const Type2 & p2, OutputIterator oi);
\endcode \endcode
###Parameters### \cgalHeading{Parameters}
The types of the paramters of the `difference()` function are any of the following combinations. The types of the paramters of the `difference()` function are any of the following combinations.
@ -192,7 +192,7 @@ The signature of the function is
bool do_intersect(const Type1 & p1, const Type2 & p2); bool do_intersect(const Type1 & p1, const Type2 & p2);
\endcode \endcode
###Parameters### \cgalHeading{Parameters}
The types of the paramters of the `do_intersect()` function are any of the following combinations. The types of the paramters of the `do_intersect()` function are any of the following combinations.
@ -322,7 +322,7 @@ The signature of the function is
\endcode \endcode
###Parameters### \cgalHeading{Parameters}
The types of the paramters of the `intersection()` function are any of the following combinations. The types of the paramters of the `intersection()` function are any of the following combinations.
@ -481,7 +481,7 @@ The signature of the function is
bool join(const Type1 & p1, const Type2 & p2, General_polygon_with_holes_2 & res); bool join(const Type1 & p1, const Type2 & p2, General_polygon_with_holes_2 & res);
\endcode \endcode
###Parameters### \cgalHeading{Parameters}
The types of the paramters of the `join()` function are any of the following combinations. The types of the paramters of the `join()` function are any of the following combinations.
@ -635,7 +635,7 @@ The signature of the function is
Oriented_side oriented_side(const Type1 & p1, const Type2 & p2); Oriented_side oriented_side(const Type1 & p1, const Type2 & p2);
\endcode \endcode
###Parameters### \cgalHeading{Parameters}
The types of the paramters of the `oriented_side()` function are any of the following combinations. The types of the paramters of the `oriented_side()` function are any of the following combinations.
@ -721,7 +721,7 @@ The signature of the function is
OutputIterator symmetric_difference(const Type1 & p1, const Type2 & p2, OutputIterator oi); OutputIterator symmetric_difference(const Type1 & p1, const Type2 & p2, OutputIterator oi);
\endcode \endcode
###Parameters### \cgalHeading{Parameters}
The types of the paramters of the `symmetric_difference()` function are any of the following combinations. The types of the paramters of the `symmetric_difference()` function are any of the following combinations.

4
Bounding_volumes/doc/Bounding_volumes/CGAL/Approximate_min_ellipsoid_d.h
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@ -113,7 +113,7 @@ using the \f$ d\f$-dimensional \cgal kernel; the models
\sa `CGAL::Min_ellipse_2<Traits>` \sa `CGAL::Min_ellipse_2<Traits>`
### Implementation ### \cgalHeading{Implementation}
We implement Khachyian's algorithm for rounding We implement Khachyian's algorithm for rounding
polytopes \cite cgal:k-rprnm-96. Internally, we use polytopes \cite cgal:k-rprnm-96. Internally, we use
@ -122,7 +122,7 @@ Cholesky-decomposition. The algorithm's running time is
\f$ {\cal O}(nd^2(\epsilon^{-1}+\ln d + \ln\ln(n)))\f$, where \f$ n=|P|\f$ and \f$ {\cal O}(nd^2(\epsilon^{-1}+\ln d + \ln\ln(n)))\f$, where \f$ n=|P|\f$ and
\f$ 1+\epsilon\f$ is the desired approximation ratio. \f$ 1+\epsilon\f$ is the desired approximation ratio.
## Example ### \cgalHeading{Example}
To illustrate the usage of `Approximate_min_ellipsoid_d` we give two examples in 2D. The To illustrate the usage of `Approximate_min_ellipsoid_d` we give two examples in 2D. The
first program generates a random set \f$ P\subset\E^2\f$ and outputs the first program generates a random set \f$ P\subset\E^2\f$ and outputs the

4
Bounding_volumes/doc/Bounding_volumes/CGAL/Min_annulus_d.h
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@ -36,7 +36,7 @@ two-, three-, and \f$ d\f$-dimensional \cgal kernel, respectively.
\sa `CGAL::Optimisation_d_traits_d<K,ET,NT>` \sa `CGAL::Optimisation_d_traits_d<K,ET,NT>`
\sa `OptimisationDTraits` \sa `OptimisationDTraits`
### Implementation ### \cgalHeading{Implementation}
The problem of finding the smallest enclosing annulus of a finite point set The problem of finding the smallest enclosing annulus of a finite point set
can be formulated as an optimization problem with linear constraints and a can be formulated as an optimization problem with linear constraints and a
@ -268,7 +268,7 @@ FT squared_outer_radius( ) const;
returns an iterator referring to the first coordinate returns an iterator referring to the first coordinate
of the center of `min_annulus`. of the center of `min_annulus`.
### Note ### \cgalHeading{Note}
The coordinates have a rational The coordinates have a rational
representation, i.e. the first \f$ d\f$ elements of the iterator representation, i.e. the first \f$ d\f$ elements of the iterator

4
Bounding_volumes/doc/Bounding_volumes/CGAL/Min_circle_2.h
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@ -50,7 +50,7 @@ two-dimensional \cgal kernel.
\sa `CGAL::Min_circle_2_traits_2<K>` \sa `CGAL::Min_circle_2_traits_2<K>`
\sa `MinCircle2Traits` \sa `MinCircle2Traits`
### Implementation ### \cgalHeading{Implementation}
We implement the incremental algorithm of Welzl, with move-to-front We implement the incremental algorithm of Welzl, with move-to-front
heuristic \cite w-sedbe-91a. The whole implementation is described heuristic \cite w-sedbe-91a. The whole implementation is described
@ -63,7 +63,7 @@ take up to linear time, but substantially less than computing the new
smallest enclosing circle from scratch. The clear operation and the check smallest enclosing circle from scratch. The clear operation and the check
for validity each takes linear time. for validity each takes linear time.
### Example ### \cgalHeading{Example}
To illustrate the creation of `Min_circle_2` and to show that To illustrate the creation of `Min_circle_2` and to show that
randomization can be useful in certain cases, we give an example. randomization can be useful in certain cases, we give an example.

4
Bounding_volumes/doc/Bounding_volumes/CGAL/Min_ellipse_2.h
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@ -32,7 +32,7 @@ two-dimensional \cgal kernel.
\sa `CGAL::Min_ellipse_2_traits_2<K>` \sa `CGAL::Min_ellipse_2_traits_2<K>`
\sa `MinEllipse2Traits` \sa `MinEllipse2Traits`
### Implementation ### \cgalHeading{Implementation}
We implement the incremental algorithm of Welzl, with move-to-front We implement the incremental algorithm of Welzl, with move-to-front
heuristic \cite w-sedbe-91a, using the primitives as described heuristic \cite w-sedbe-91a, using the primitives as described
@ -46,7 +46,7 @@ take up to linear time, but substantially less than computing the new
smallest enclosing ellipse from scratch. The clear operation and the check smallest enclosing ellipse from scratch. The clear operation and the check
for validity each takes linear time. for validity each takes linear time.
### Example ### \cgalHeading{Example}
To illustrate the usage of `Min_ellipse_2` and to show that randomization To illustrate the usage of `Min_ellipse_2` and to show that randomization
can be useful in certain cases, we give an example. The example also can be useful in certain cases, we give an example. The example also

4
Bounding_volumes/doc/Bounding_volumes/CGAL/Min_sphere_d.h
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@ -53,7 +53,7 @@ for two-, three-, and \f$ d\f$-dimensional points respectively.
\sa `CGAL::Min_sphere_of_spheres_d<Traits>` \sa `CGAL::Min_sphere_of_spheres_d<Traits>`
\sa `CGAL::Min_annulus_d<Traits>` \sa `CGAL::Min_annulus_d<Traits>`
### Implementation ### \cgalHeading{Implementation}
We implement the algorithm of Welzl with move-to-front We implement the algorithm of Welzl with move-to-front
heuristic \cite w-sedbe-91a for small point sets, combined with a new heuristic \cite w-sedbe-91a for small point sets, combined with a new
@ -66,7 +66,7 @@ but substantially less than computing the new smallest enclosing
sphere from scratch. The clear operation and the check for validity sphere from scratch. The clear operation and the check for validity
each take linear time. each take linear time.
### Example ### \cgalHeading{Example}
\cgalExample{Min_sphere_d/min_sphere_d.cpp} \cgalExample{Min_sphere_d/min_sphere_d.cpp}

4
Bounding_volumes/doc/Bounding_volumes/CGAL/Min_sphere_of_spheres_d.h
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@ -70,7 +70,7 @@ might still be an option in case your input number type cannot
\sa `CGAL::Min_sphere_d<Traits>` \sa `CGAL::Min_sphere_d<Traits>`
\sa `CGAL::Min_circle_2<Traits>` \sa `CGAL::Min_circle_2<Traits>`
### Implementation ### \cgalHeading{Implementation}
We implement two algorithms, the LP-algorithm and a We implement two algorithms, the LP-algorithm and a
heuristic \cite msw-sblp-92. As described in the documentation of heuristic \cite msw-sblp-92. As described in the documentation of
@ -93,7 +93,7 @@ not supported at this time. Also, the current implementation only
handles spheres with Cartesian coordinates; homogenous representation handles spheres with Cartesian coordinates; homogenous representation
is not supported yet. is not supported yet.
### Example ### \cgalHeading{Example}
\cgalExample{Min_sphere_of_spheres_d/min_sphere_of_spheres_d_d.cpp} \cgalExample{Min_sphere_of_spheres_d/min_sphere_of_spheres_d_d.cpp}

12
Bounding_volumes/doc/Bounding_volumes/CGAL/min_quadrilateral_2.h
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@ -42,14 +42,14 @@ type from one the \cgal kernels. In this case, a default traits class
\sa `MinQuadrilateralTraits_2` \sa `MinQuadrilateralTraits_2`
\sa `CGAL::Min_quadrilateral_default_traits_2<K>` \sa `CGAL::Min_quadrilateral_default_traits_2<K>`
### Implementation ### \cgalHeading{Implementation}
We use a rotating caliper We use a rotating caliper
algorithm algorithm
\cite stvwe-mepa-95, \cite v-fmep-90 with worst case running time linear \cite stvwe-mepa-95, \cite v-fmep-90 with worst case running time linear
in the number of input points. in the number of input points.
### Example ### \cgalHeading{Example}
The following code generates a random convex polygon The following code generates a random convex polygon
`P` with 20 vertices and computes the minimum enclosing `P` with 20 vertices and computes the minimum enclosing
@ -112,13 +112,13 @@ is `CGAL::Point_2<K>` for some kernel `K`.
\sa `MinQuadrilateralTraits_2` \sa `MinQuadrilateralTraits_2`
\sa `CGAL::Min_quadrilateral_default_traits_2<K>` \sa `CGAL::Min_quadrilateral_default_traits_2<K>`
### Implementation ### \cgalHeading{Implementation}
We use a rotating caliper We use a rotating caliper
algorithm \cite t-sgprc-83 algorithm \cite t-sgprc-83
with worst case running time linear in the number of input points. with worst case running time linear in the number of input points.
### Example ### \cgalHeading{Example}
The following code generates a random convex polygon The following code generates a random convex polygon
`P` with 20 vertices and computes the minimum enclosing `P` with 20 vertices and computes the minimum enclosing
@ -180,13 +180,13 @@ is `CGAL::Point_2<K>` for some kernel `K`.
\sa `MinQuadrilateralTraits_2` \sa `MinQuadrilateralTraits_2`
\sa `CGAL::Min_quadrilateral_default_traits_2<K>` \sa `CGAL::Min_quadrilateral_default_traits_2<K>`
### Implementation ### \cgalHeading{Implementation}
We use a rotating caliper We use a rotating caliper
algorithm \cite t-sgprc-83 algorithm \cite t-sgprc-83
with worst case running time linear in the number of input points. with worst case running time linear in the number of input points.
### Example ### \cgalHeading{Example}
The following code generates a random convex polygon The following code generates a random convex polygon
`P` with 20 vertices and computes the minimum enclosing `P` with 20 vertices and computes the minimum enclosing

4
Bounding_volumes/doc/Bounding_volumes/CGAL/rectangular_p_center_2.h
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@ -242,7 +242,7 @@ is a model for `RectangularPCenterTraits_2`.
\sa `CGAL::Rectangular_p_center_default_traits_2<K>` \sa `CGAL::Rectangular_p_center_default_traits_2<K>`
\sa `CGAL::sorted_matrix_search` \sa `CGAL::sorted_matrix_search`
### Implementation ### \cgalHeading{Implementation}
The runtime is linear for \f$ p \in \{2,\,3\}\f$ and The runtime is linear for \f$ p \in \{2,\,3\}\f$ and
\f$ \mathcal{O}(n \cdot \log n)\f$ for \f$ p = 4\f$ where \f$ n\f$ is the number of \f$ \mathcal{O}(n \cdot \log n)\f$ for \f$ p = 4\f$ where \f$ n\f$ is the number of
@ -252,7 +252,7 @@ algorithm uses a prune-and-search technique described in
search \cite fj-fkppc-83, \cite fj-gsrsm-84 and fast algorithms for search \cite fj-fkppc-83, \cite fj-gsrsm-84 and fast algorithms for
piercing rectangles \cite sw-rpppp-96. piercing rectangles \cite sw-rpppp-96.
### Example ### \cgalHeading{Example}
The following code generates a random set of ten points The following code generates a random set of ten points
and computes its two-centers. and computes its two-centers.

18
Box_intersection_d/doc/Box_intersection_d/CGAL/box_intersection_d.h
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@ -56,7 +56,7 @@ namespace CGAL {
\sa `BoxIntersectionBox_d` \sa `BoxIntersectionBox_d`
\sa `BoxIntersectionTraits_d` \sa `BoxIntersectionTraits_d`
### Implementation ### \cgalHeading{Implementation}
The algorithm is trivially testing all pairs and runs therefore in time The algorithm is trivially testing all pairs and runs therefore in time
\f$ O(nm)\f$ where \f$ n\f$ is the size of the first sequence and \f$ m\f$ is the \f$ O(nm)\f$ where \f$ n\f$ is the size of the first sequence and \f$ m\f$ is the
@ -130,7 +130,7 @@ namespace CGAL {
values `Box_intersection_d::COMPLETE` and values `Box_intersection_d::COMPLETE` and
`Box_intersection_d::BIPARTITE`. `Box_intersection_d::BIPARTITE`.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>`RandomAccessIterator1`, and \f$ \ldots\f$ `2`, must be <LI>`RandomAccessIterator1`, and \f$ \ldots\f$ `2`, must be
@ -154,7 +154,7 @@ namespace CGAL {
\sa `BoxIntersectionBox_d` \sa `BoxIntersectionBox_d`
\sa `BoxIntersectionTraits_d` \sa `BoxIntersectionTraits_d`
### Implementation ### \cgalHeading{Implementation}
The implemented algorithm is described in \cite cgal:ze-fsbi-02 as The implemented algorithm is described in \cite cgal:ze-fsbi-02 as
version two. Its performance depends on a `cutoff` parameter. version two. Its performance depends on a `cutoff` parameter.
@ -186,7 +186,7 @@ namespace CGAL {
cutoff parameters are recommended. See also cutoff parameters are recommended. See also
Section \ref secboxintersperformance . Section \ref secboxintersperformance .
### Example ### \cgalHeading{Example}
The box implementation provided with The box implementation provided with
`Box_intersection_d::Box_d<double,2>` has a special `Box_intersection_d::Box_d<double,2>` has a special
@ -327,7 +327,7 @@ namespace CGAL {
concept and that the box handle, i.e., the iterators value type, is concept and that the box handle, i.e., the iterators value type, is
identical to the box type or a pointer to the box type. identical to the box type or a pointer to the box type.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>`ForwardIterator` must be a forward iterator. We call its <LI>`ForwardIterator` must be a forward iterator. We call its
@ -351,7 +351,7 @@ namespace CGAL {
\sa `BoxIntersectionBox_d` \sa `BoxIntersectionBox_d`
\sa `BoxIntersectionTraits_d` \sa `BoxIntersectionTraits_d`
### Implementation ### \cgalHeading{Implementation}
The algorithm is trivially testing all pairs and runs therefore in time The algorithm is trivially testing all pairs and runs therefore in time
\f$ O(n^2)\f$ where \f$ n\f$ is the size of the input sequence. This algorithm \f$ O(n^2)\f$ where \f$ n\f$ is the size of the input sequence. This algorithm
@ -447,7 +447,7 @@ namespace CGAL {
concept and that the box handle, i.e., the iterators value type, is concept and that the box handle, i.e., the iterators value type, is
identical to the box type or a pointer to the box type. identical to the box type or a pointer to the box type.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>`RandomAccessIterator` must be a mutable random-access <LI>`RandomAccessIterator` must be a mutable random-access
@ -470,12 +470,12 @@ namespace CGAL {
\sa `BoxIntersectionBox_d` \sa `BoxIntersectionBox_d`
\sa `BoxIntersectionTraits_d` \sa `BoxIntersectionTraits_d`
### Implementation ### \cgalHeading{Implementation}
See the implementation section of the `box_intersection_d()` See the implementation section of the `box_intersection_d()`
function. function.
### Example ### \cgalHeading{Example}
The box implementation provided with The box implementation provided with
`Box_intersection_d::Box_d<double,2>` has a special `Box_intersection_d::Box_d<double,2>` has a special

2
Circular_kernel_2/doc/Circular_kernel_2/CGAL/Circular_kernel_2.h
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@ -6,7 +6,7 @@ namespace CGAL {
\cgalModels `CircularKernel` \cgalModels `CircularKernel`
### Parameters ### \cgalHeading{Parameters}
The first parameter of the circular kernel must be instantiated with a The first parameter of the circular kernel must be instantiated with a
model of the `Kernel` concept. The `Circular_kernel_2` class model of the `Kernel` concept. The `Circular_kernel_2` class

2
Circular_kernel_2/doc/Circular_kernel_2/CGAL/Line_arc_2.h
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@ -6,7 +6,7 @@ namespace CGAL {
\cgalModels `CircularKernel::LineArc_2` \cgalModels `CircularKernel::LineArc_2`
### I/O ### \cgalHeading{I/O}
The format for input/output is, for each line arc: a `Line_2` The format for input/output is, for each line arc: a `Line_2`
(the supporting line) and two `Circular_arc_point_2` (the two endpoints), (the supporting line) and two `Circular_arc_point_2` (the two endpoints),

2
Circular_kernel_3/doc/Circular_kernel_3/CGAL/Circular_arc_3.h
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@ -6,7 +6,7 @@ namespace CGAL {
\cgalModels `SphericalKernel::CircularArc_3` \cgalModels `SphericalKernel::CircularArc_3`
### I/O ### \cgalHeading{I/O}
The input/output format of a circular arc consists of the supporting circle The input/output format of a circular arc consists of the supporting circle
represented as a `Circle_3` object followed by the source and target represented as a `Circle_3` object followed by the source and target

2
Circular_kernel_3/doc/Circular_kernel_3/CGAL/Spherical_kernel_3.h
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@ -6,7 +6,7 @@ namespace CGAL {
\cgalModels `SphericalKernel` \cgalModels `SphericalKernel`
### Parameters ### \cgalHeading{Parameters}
The first parameter of the spherical kernel must be instantiated with The first parameter of the spherical kernel must be instantiated with
a model of the `Kernel` concept. The `Spherical_kernel_3` a model of the `Kernel` concept. The `Spherical_kernel_3`

18
Circulator/doc/Circulator/CGAL/circulator.h
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@ -121,11 +121,11 @@ requirements for container (i.e.\ to have a `begin()` and an
`reference`, `const_reference`, `value_type`, `reference`, `const_reference`, `value_type`,
`size_type`, and `difference_type`). `size_type`, and `difference_type`).
### Types ### \cgalHeading{Types}
All types required for circulators are provided. All types required for circulators are provided.
### Operations ### \cgalHeading{Operations}
The adaptor conforms to the requirements of the corresponding The adaptor conforms to the requirements of the corresponding
circulator category. An additional member function circulator category. An additional member function
@ -136,7 +136,7 @@ the same position as the circulator does.
\sa `Circulator_from_iterator` \sa `Circulator_from_iterator`
\sa `Circulator` \sa `Circulator`
### Example ### \cgalHeading{Example}
The following program composes two adaptors - from a container to a The following program composes two adaptors - from a container to a
circulator and back to an iterator. It applies an \stl sort algorithm circulator and back to an iterator. It applies an \stl sort algorithm
@ -192,7 +192,7 @@ category. The circulator will be mutable or non-mutable according to
the iterator. Iterators provide no `size_type`. This adapter the iterator. Iterators provide no `size_type`. This adapter
assumes `std::size_t` instead. assumes `std::size_t` instead.
### Operations ### \cgalHeading{Operations}
The adaptor conforms to the requirements of the respective circulator The adaptor conforms to the requirements of the respective circulator
category. An additional member function `current_iterator()` category. An additional member function `current_iterator()`
@ -203,7 +203,7 @@ circulator does.
\sa `Circulator_from_container` \sa `Circulator_from_container`
\sa `Circulator` \sa `Circulator`
### Example ### \cgalHeading{Example}
The following program composes two adaptors - from an iterator to a The following program composes two adaptors - from an iterator to a
circulator and back to an iterator. It applies an \stl sort algorithm circulator and back to an iterator. It applies an \stl sort algorithm
@ -313,7 +313,7 @@ circulator category for iterators, i.e.\ one of
`Forward_circulator_tag`, `Bidirectional_circulator_tag`, or `Forward_circulator_tag`, `Bidirectional_circulator_tag`, or
`Random_access_circulator_tag`. `Random_access_circulator_tag`.
### Example ### \cgalHeading{Example}
A generic function `bar` that distinguishes between a call with a A generic function `bar` that distinguishes between a call with a
circulator range and a call with an iterator range: circulator range and a call with an iterator range:
@ -386,7 +386,7 @@ otherwise.
\sa `Circulator_from_container` \sa `Circulator_from_container`
\sa `Circulator` \sa `Circulator`
### Example ### \cgalHeading{Example}
The generic <TT>reverse()</TT> algorithm from the \stl can be used with an The generic <TT>reverse()</TT> algorithm from the \stl can be used with an
adaptor if at least a bidirectional circulator <TT>c</TT> is given. adaptor if at least a bidirectional circulator <TT>c</TT> is given.
@ -399,7 +399,7 @@ reverse( container.begin(), container.end());
\endcode \endcode
### Implementation ### \cgalHeading{Implementation}
The iterator adaptor keeps track of the number of rounds a circulator The iterator adaptor keeps track of the number of rounds a circulator
has done around the ring-like data structure (a kind of winding has done around the ring-like data structure (a kind of winding
@ -552,7 +552,7 @@ the range is empty or not.
\pre `IC` is either a circulator or an iterator type. The range `[i, j)` is valid. \pre `IC` is either a circulator or an iterator type. The range `[i, j)` is valid.
### Example ### \cgalHeading{Example}
The following function `process_all` accepts a range `[i, j)` of an iterator or circulator `IC` and processes each The following function `process_all` accepts a range `[i, j)` of an iterator or circulator `IC` and processes each
element in this range: element in this range:

4
Circulator/doc/Circulator/CGAL/circulator_bases.h
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@ -18,7 +18,7 @@ To use the tags or base classes only it is sufficient to include:
\sa `is_empty_range` \sa `is_empty_range`
\sa `Circulator` \sa `Circulator`
### Example ### \cgalHeading{Example}
The above declarations can be used to distinguish between iterators The above declarations can be used to distinguish between iterators
and circulators and between different circulator categories. The and circulators and between different circulator categories. The
@ -34,7 +34,7 @@ example program illustrates both.
/*! /*!
\addtogroup PkgHandlesAndCirculatorsBaseClasses \addtogroup PkgHandlesAndCirculatorsBaseClasses
### Implementation ### \cgalHeading{Implementation}
Since not all current compilers can eliminate the space needed for the Since not all current compilers can eliminate the space needed for the
compile time tags even when deriving from them, we implement a variant compile time tags even when deriving from them, we implement a variant

2
Combinatorial_map/doc/Combinatorial_map/CGAL/Combinatorial_map.h
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@ -22,7 +22,7 @@ There are two default template arguments:
`Combinatorial_map_min_items<d>` for `Items` and `Combinatorial_map_min_items<d>` for `Items` and
`CGAL_ALLOCATOR(int)` from the `<CGAL/memory.h>` header file for `Alloc`. `CGAL_ALLOCATOR(int)` from the `<CGAL/memory.h>` header file for `Alloc`.
##Complexity## \cgalHeading{Complexity}
The complexity of `sew` and `unsew` is in <I>O</I>(\f$ |\f$<I>S</I>\f$ |\f$\f$ \times\f$\f$ |\f$<I>c</I>\f$ |\f$), <I>S</I> The complexity of `sew` and `unsew` is in <I>O</I>(\f$ |\f$<I>S</I>\f$ |\f$\f$ \times\f$\f$ |\f$<I>c</I>\f$ |\f$), <I>S</I>

2
Combinatorial_map/doc/Combinatorial_map/CGAL/Combinatorial_map_min_items.h
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@ -12,7 +12,7 @@ In this class, no attribute is enabled.
\cgalModels `CombinatorialMapItems` \cgalModels `CombinatorialMapItems`
### Example ### \cgalHeading{Example}
The following example shows the implementation of the The following example shows the implementation of the
`Combinatorial_map_min_items` class. `Combinatorial_map_min_items` class.

2
Combinatorial_map/doc/Combinatorial_map/CGAL/Dart.h
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@ -17,7 +17,7 @@ non void <I>i</I>-attribute.
\tparam CMap must be a model of the `CombinatorialMap` concept. \tparam CMap must be a model of the `CombinatorialMap` concept.
###Complexity ### \cgalHeading{Complexity }
Each \f$ \beta_i\f$ link is initialized to `CMap::null_dart_handle`, and each Each \f$ \beta_i\f$ link is initialized to `CMap::null_dart_handle`, and each
attribute handle of non void <I>i</I>-attribute is initialized to `NULL` attribute handle of non void <I>i</I>-attribute is initialized to `NULL`

4
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_akl_toussaint.h
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@ -13,7 +13,7 @@ cyclic sequence of extreme points is cut into a linear sequence.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `ForwardIterator` is defined. value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `ForwardIterator` and <LI>The value type of `ForwardIterator` and
@ -37,7 +37,7 @@ functions that return instances of these types:
\sa `CGAL::ch_melkman` \sa `CGAL::ch_melkman`
\sa `CGAL::convex_hull_2` \sa `CGAL::convex_hull_2`
### Implementation ### \cgalHeading{Implementation}
This function uses the algorithm of Akl and This function uses the algorithm of Akl and
Toussaint \cite at-fcha-78 that requires \f$ O(n \log n)\f$ time for \f$ n\f$ input Toussaint \cite at-fcha-78 that requires \f$ O(n \log n)\f$ time for \f$ n\f$ input

4
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_bykat.h
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@ -14,7 +14,7 @@ cyclic sequence of extreme points is cut into a linear sequence.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `ForwardIterator` is defined. value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and <LI>The value type of `InputIterator` and
@ -38,7 +38,7 @@ functions that return instances of these types:
\sa `CGAL::ch_melkman` \sa `CGAL::ch_melkman`
\sa `CGAL::convex_hull_2` \sa `CGAL::convex_hull_2`
### Implementation ### \cgalHeading{Implementation}
This function implements the non-recursive variation of This function implements the non-recursive variation of
Eddy's algorithm \cite e-nchap-77 described in \cite b-chfsp-78. Eddy's algorithm \cite e-nchap-77 described in \cite b-chfsp-78.

4
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_eddy.h
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@ -14,7 +14,7 @@ cyclic sequence of extreme points is cut into a linear sequence.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
type value type of `ForwardIterator` is defined. type value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and <LI>The value type of `InputIterator` and
@ -38,7 +38,7 @@ functions that return instances of these types:
\sa `CGAL::ch_melkman` \sa `CGAL::ch_melkman`
\sa `CGAL::convex_hull_2` \sa `CGAL::convex_hull_2`
### Implementation ### \cgalHeading{Implementation}
This function implements Eddy's algorithm This function implements Eddy's algorithm
\cite e-nchap-77, which is the two-dimensional version of the quickhull \cite e-nchap-77, which is the two-dimensional version of the quickhull

10
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_graham_andrew.h
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@ -15,7 +15,7 @@ cyclic sequence of extreme points is cut into a linear sequence.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `InputIteratore` is defined. value type of `InputIteratore` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and <LI>The value type of `InputIterator` and
@ -41,7 +41,7 @@ functions that return instances of these types:
\sa `CGAL::lower_hull_points_2` \sa `CGAL::lower_hull_points_2`
\sa `CGAL::upper_hull_points_2` \sa `CGAL::upper_hull_points_2`
### Implementation ### \cgalHeading{Implementation}
This function implements Andrew's variant of the Graham This function implements Andrew's variant of the Graham
scan algorithm \cite a-aeach-79 and follows the presentation of Mehlhorn scan algorithm \cite a-aeach-79 and follows the presentation of Mehlhorn
@ -71,7 +71,7 @@ by the first and last points in this sequence.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
type `BidirectionalIterator::value_type` is defined. type `BidirectionalIterator::value_type` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`BidirectionalIterator::value_type` and <LI>`BidirectionalIterator::value_type` and
@ -90,13 +90,13 @@ functions that return instances of these types:
\sa `CGAL::lower_hull_points_2` \sa `CGAL::lower_hull_points_2`
\sa `CGAL::upper_hull_points_2` \sa `CGAL::upper_hull_points_2`
### Implementation ### \cgalHeading{Implementation}
The function uses Andrew's The function uses Andrew's
variant of the Graham scan algorithm \cite a-aeach-79. This algorithm variant of the Graham scan algorithm \cite a-aeach-79. This algorithm
requires \f$ O(n \log n)\f$ time in the worst case for \f$ n\f$ input points. requires \f$ O(n \log n)\f$ time in the worst case for \f$ n\f$ input points.
### Example ### \cgalHeading{Example}
In the following example `ch_graham_andrew_scan()` is used to In the following example `ch_graham_andrew_scan()` is used to
realize Anderson's variant \cite a-readc-78 of the Graham Scan realize Anderson's variant \cite a-readc-78 of the Graham Scan

8
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_jarvis.h
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@ -14,7 +14,7 @@ cyclic sequence of extreme points is cut into a linear sequence.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `InputIterator` is defined. value type of `InputIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and <LI>The value type of `InputIterator` and
@ -38,7 +38,7 @@ functions that return instances of these types:
\sa `CGAL::ch_melkman` \sa `CGAL::ch_melkman`
\sa `CGAL::convex_hull_2` \sa `CGAL::convex_hull_2`
### Implementation ### \cgalHeading{Implementation}
This function uses the Jarvis march (gift-wrapping) This function uses the Jarvis march (gift-wrapping)
algorithm \cite j-ichfs-73. This algorithm requires \f$ O(n h)\f$ time algorithm \cite j-ichfs-73. This algorithm requires \f$ O(n h)\f$ time
@ -66,7 +66,7 @@ points from a given set of input points that line between two input points.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
type `ForwardIterator::value_type` is defined. type `ForwardIterator::value_type` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`ForwardIterator::value_type` and <LI>`ForwardIterator::value_type` and
@ -86,7 +86,7 @@ functions that return instances of these types:
\sa `CGAL::lower_hull_points_2` \sa `CGAL::lower_hull_points_2`
\sa `CGAL::upper_hull_points_2` \sa `CGAL::upper_hull_points_2`
### Implementation ### \cgalHeading{Implementation}
The function uses the Jarvis march (gift-wrapping) algorithm \cite j-ichfs-73. The function uses the Jarvis march (gift-wrapping) algorithm \cite j-ichfs-73.
This algorithm requires \f$ O(n h)\f$ time in the worst This algorithm requires \f$ O(n h)\f$ time in the worst

4
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_melkman.h
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@ -13,7 +13,7 @@ the resulting sequence is returned.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `InputIterator` is defined. value type of `InputIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and `OutputIterator` <LI>The value type of `InputIterator` and `OutputIterator`
@ -37,7 +37,7 @@ functions that return instances of these types:
\sa `CGAL::ch_melkman` \sa `CGAL::ch_melkman`
\sa `CGAL::convex_hull_2` \sa `CGAL::convex_hull_2`
### Implementation ### \cgalHeading{Implementation}
It uses an implementation of Melkman's algorithm \cite m-olcch-87. It uses an implementation of Melkman's algorithm \cite m-olcch-87.
Running time of this is linear. Running time of this is linear.

14
Convex_hull_2/doc/Convex_hull_2/CGAL/ch_selected_extreme_points_2.h
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@ -14,7 +14,7 @@ After execution, the value of
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `ForwardIterator` is defined. value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` defines a type `Traits::Less_xy_2` as described in `Traits` defines a type `Traits::Less_xy_2` as described in
the concept `ConvexHullTraits_2` and the corresponding member the concept `ConvexHullTraits_2` and the corresponding member
@ -53,7 +53,7 @@ After execution, the value of
The default traits class `Default_traits` is the kernel in which the type The default traits class `Default_traits` is the kernel in which the type
`ForwardIterator::value_type` is defined. `ForwardIterator::value_type` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` defines the type `Traits::Less_yx_2` as specified in `Traits` defines the type `Traits::Less_yx_2` as specified in
the concept `ConvexHullTraits_2` and the corresponding member the concept `ConvexHullTraits_2` and the corresponding member
@ -94,7 +94,7 @@ holds for all iterators in the range.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `ForwardIterator` is defined. value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` defines the type `Traits::Less_yx_2` as specified in `Traits` defines the type `Traits::Less_yx_2` as specified in
the concept `ConvexHullTraits_2` and the corresponding member the concept `ConvexHullTraits_2` and the corresponding member
@ -137,7 +137,7 @@ After execution, the value of
\f$ \ge_{xy}\f$ `*it` hold for all iterators \f$ \ge_{xy}\f$ `*it` hold for all iterators
`it` in the range. `it` in the range.
### Requirements ### \cgalHeading{Requirements}
`Traits` contains the following subset of types from `Traits` contains the following subset of types from
the concept `ConvexHullTraits_2` and their corresponding member the concept `ConvexHullTraits_2` and their corresponding member
@ -186,7 +186,7 @@ After execution, the value of
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
type `ForwardIterator::value_type` is defined. type `ForwardIterator::value_type` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` defines the type `Traits::Less_yx_2` as specified in `Traits` defines the type `Traits::Less_yx_2` as specified in
the concept `ConvexHullTraits_2` and the corresponding member the concept `ConvexHullTraits_2` and the corresponding member
@ -227,7 +227,7 @@ holds for all iterators in the range.
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
type `ForwardIterator::value_type` is defined. type `ForwardIterator::value_type` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` defines the type `Traits::Less_xy_2` as specified in `Traits` defines the type `Traits::Less_xy_2` as specified in
the concept `ConvexHullTraits_2` and the corresponding member the concept `ConvexHullTraits_2` and the corresponding member
@ -264,7 +264,7 @@ After execution, the value of
`w` is an iterator in the range such that `*w` \f$ \le_{xy}\f$ `w` is an iterator in the range such that `*w` \f$ \le_{xy}\f$
`*it` for all iterators `it` in the range. `*it` for all iterators `it` in the range.
### Requirements ### \cgalHeading{Requirements}
`Traits` defines the type `Traits::Less_xy_2` as specified in `Traits` defines the type `Traits::Less_xy_2` as specified in
the concept `ConvexHullTraits_2` and the corresponding member the concept `ConvexHullTraits_2` and the corresponding member

12
Convex_hull_2/doc/Convex_hull_2/CGAL/convex_hull_2.h
View File

@ -17,7 +17,7 @@ cyclic sequence of extreme points is cut into a linear sequence.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and `OutputIterator` <LI>The value type of `InputIterator` and `OutputIterator`
@ -42,7 +42,7 @@ functions that return instances of these types:
\sa `CGAL::ch_jarvis` \sa `CGAL::ch_jarvis`
\sa `CGAL::ch_melkman` \sa `CGAL::ch_melkman`
### Implementation ### \cgalHeading{Implementation}
One of two algorithms is used, One of two algorithms is used,
depending on the type of iterator used to specify the input points. For depending on the type of iterator used to specify the input points. For
@ -103,7 +103,7 @@ The different treatment by `upper_hull_points_2()` of the case that
all points are equal ensures that concatenation of lower and upper hull all points are equal ensures that concatenation of lower and upper hull
points gives the sequence of extreme points. points gives the sequence of extreme points.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and `OutputIterator` <LI>The value type of `InputIterator` and `OutputIterator`
@ -124,7 +124,7 @@ functions that return instances of these types:
\sa `CGAL::ch_graham_andrew_scan` \sa `CGAL::ch_graham_andrew_scan`
\sa `CGAL::upper_hull_points_2` \sa `CGAL::upper_hull_points_2`
### Implementation ### \cgalHeading{Implementation}
This function uses Andrew's variant of Graham's scan algorithm This function uses Andrew's variant of Graham's scan algorithm
\cite a-aeach-79, \cite m-mdscg-84. The algorithm has worst-case running time \cite a-aeach-79, \cite m-mdscg-84. The algorithm has worst-case running time
@ -167,7 +167,7 @@ The different treatment by `lower_hull_points_2()` of the case that
all points are equal ensures that concatenation of lower and upper hull all points are equal ensures that concatenation of lower and upper hull
points gives the sequence of extreme points. points gives the sequence of extreme points.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `InputIterator` and `OutputIterator` <LI>The value type of `InputIterator` and `OutputIterator`
@ -188,7 +188,7 @@ functions that return instances of these types:
\sa `CGAL::ch_graham_andrew_scan` \sa `CGAL::ch_graham_andrew_scan`
\sa `CGAL::lower_hull_points_2` \sa `CGAL::lower_hull_points_2`
### Implementation ### \cgalHeading{Implementation}
This function uses Andrew's This function uses Andrew's
variant of Graham's scan algorithm \cite a-aeach-79, \cite m-mdscg-84. The algorithm variant of Graham's scan algorithm \cite a-aeach-79, \cite m-mdscg-84. The algorithm

8
Convex_hull_2/doc/Convex_hull_2/CGAL/convexity_check_2.h
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@ -16,7 +16,7 @@ if it consists of only extreme points
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `ForwardIterator` is defined. value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` contains the following subset of types from `Traits` contains the following subset of types from
the concept `ConvexHullTraits_2` and their corresponding member the concept `ConvexHullTraits_2` and their corresponding member
@ -30,7 +30,7 @@ functions that return instances of these types:
\sa `CGAL::is_cw_strongly_convex_2` \sa `CGAL::is_cw_strongly_convex_2`
\sa `CGAL::is_strongly_convex_3` \sa `CGAL::is_strongly_convex_3`
### Implementation ### \cgalHeading{Implementation}
The algorithm requires \f$ O(n)\f$ time for a set of \f$ n\f$ input points. The algorithm requires \f$ O(n)\f$ time for a set of \f$ n\f$ input points.
@ -65,7 +65,7 @@ if it consists of only extreme points
The default traits class `Default_traits` is the kernel in which the The default traits class `Default_traits` is the kernel in which the
value type of `ForwardIterator` is defined. value type of `ForwardIterator` is defined.
### Requirements ### \cgalHeading{Requirements}
`Traits` contains the following subset of types from `Traits` contains the following subset of types from
the concept `ConvexHullTraits_2` and their corresponding member the concept `ConvexHullTraits_2` and their corresponding member
@ -79,7 +79,7 @@ functions that return instances of these types:
\sa `CGAL::is_ccw_strongly_convex_2` \sa `CGAL::is_ccw_strongly_convex_2`
\sa `CGAL::is_strongly_convex_3` \sa `CGAL::is_strongly_convex_3`
### Implementation ### \cgalHeading{Implementation}
The algorithm requires \f$ O(n)\f$ time for a set of \f$ n\f$ input points. The algorithm requires \f$ O(n)\f$ time for a set of \f$ n\f$ input points.

2
Convex_hull_3/doc/Convex_hull_3/CGAL/convex_hull_3.h
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@ -28,7 +28,7 @@ then the default traits class of `::convex_hull_3()` is `Convex_hull_traits_3<R>
\sa `convex_hull_incremental_3()` \sa `convex_hull_incremental_3()`
### Implementation ### \cgalHeading{Implementation}
The algorithm implemented by these functions is the quickhull algorithm of The algorithm implemented by these functions is the quickhull algorithm of
Barnard <I>et al.</I> \cite bdh-qach-96. Barnard <I>et al.</I> \cite bdh-qach-96.

2
Convex_hull_3/doc/Convex_hull_3/CGAL/convex_hull_incremental_3.h
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@ -29,7 +29,7 @@ the representation class `R` required by
\sa `convex_hull_3()` \sa `convex_hull_3()`
\sa `Convex_hull_d` \sa `Convex_hull_d`
### Implementation ### \cgalHeading{Implementation}
This function uses the `d`-dimensional convex hull incremental construction This function uses the `d`-dimensional convex hull incremental construction
algorithm \cite cms-frric-93 algorithm \cite cms-frric-93

4
Convex_hull_3/doc/Convex_hull_3/CGAL/convexity_check_3.h
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@ -11,7 +11,7 @@ vertices of the convex hull).
The default traits class is the kernel in which the type The default traits class is the kernel in which the type
`Polyhedron::Point_3` is defined. `Polyhedron::Point_3` is defined.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`Polyhedron::Point_3` is equivalent to `Traits::Point_3`. <LI>`Polyhedron::Point_3` is equivalent to `Traits::Point_3`.
@ -34,7 +34,7 @@ the facet type must be `ConvexHullPolyhedronFacet_3`.
</OL> </OL>
### Implementation ### \cgalHeading{Implementation}
This function implements the tests described in \cite mnssssu-cgpvg-96 to This function implements the tests described in \cite mnssssu-cgpvg-96 to
determine convexity and requires \f$ O(e + f)\f$ time for a polyhedron with determine convexity and requires \f$ O(e + f)\f$ time for a polyhedron with

4
Convex_hull_d/doc/Convex_hull_d/CGAL/Convex_hull_d.h
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@ -44,7 +44,7 @@ C.index_of_vertex_in_opposite_facet(f,i)`. Then
\tparam R must be a model of the concept `ConvexHullTraits_d`. \tparam R must be a model of the concept `ConvexHullTraits_d`.
### Iteration Statements ### \cgalHeading{Iteration Statements}
<B>forall_ch_vertices</B>(\f$ v,C\f$) \f$ \{\f$ the vertices of \f$ C\f$ are <B>forall_ch_vertices</B>(\f$ v,C\f$) \f$ \{\f$ the vertices of \f$ C\f$ are
successively assigned to \f$ v\f$ \f$ \}\f$ successively assigned to \f$ v\f$ \f$ \}\f$
@ -55,7 +55,7 @@ successively assigned to \f$ s\f$ \f$ \}\f$
<B>forall_ch_facets</B>(\f$ f,C\f$) \f$ \{\f$ the facets of \f$ C\f$ are <B>forall_ch_facets</B>(\f$ f,C\f$) \f$ \{\f$ the facets of \f$ C\f$ are
successively assigned to \f$ f\f$ \f$ \}\f$ successively assigned to \f$ f\f$ \f$ \}\f$
### Implementation ### \cgalHeading{Implementation}
The implementation of type `Convex_hull_d` is based on The implementation of type `Convex_hull_d` is based on
\cite cms-frric-93 and \cite bms-dgc-94. The details \cite cms-frric-93 and \cite bms-dgc-94. The details

6
Convex_hull_d/doc/Convex_hull_d/CGAL/Delaunay_d.h
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@ -57,7 +57,7 @@ belongs to the furthest site triangulation.
\tparam R must be a model of the concept `DelaunayTraits_d`. \tparam R must be a model of the concept `DelaunayTraits_d`.
\tparam Lifted_R must be a model of the concept `DelaunayLiftedTraits_d`. \tparam Lifted_R must be a model of the concept `DelaunayLiftedTraits_d`.
### Implementation ### \cgalHeading{Implementation}
The data type is derived from `Convex_hull_d` via The data type is derived from `Convex_hull_d` via
the lifting map. For a point `x` in `d`-dimensional space let the lifting map. For a point `x` in `d`-dimensional space let
@ -73,7 +73,7 @@ The space requirement is the same as for convex hulls. The time
requirement for an insert is the time to insert the lifted point requirement for an insert is the time to insert the lifted point
into the convex hull of the lifted points. into the convex hull of the lifted points.
### Example ### \cgalHeading{Example}
The abstract data type `Delaunay_d` has a default instantiation by The abstract data type `Delaunay_d` has a default instantiation by
means of the `d`-dimensional geometric kernel. means of the `d`-dimensional geometric kernel.
@ -98,7 +98,7 @@ Vertex_handle v1 = T.insert(Point_d(2,11));
} }
\endcode \endcode
### Traits Requirements ### \cgalHeading{Traits Requirements}
`Delaunay_d< R, Lifted_R >` requires the following types from the kernel traits `Lifted_R`: `Delaunay_d< R, Lifted_R >` requires the following types from the kernel traits `Lifted_R`:

2
Generator/doc/Generator/CGAL/Random.h
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@ -17,7 +17,7 @@ It can be very useful, e.g. for debugging, to reproduce a sequence of
random numbers. This can be done by either initialising with a fixed random numbers. This can be done by either initialising with a fixed
seed, or by using the state functions as described below. seed, or by using the state functions as described below.
### Implementation ### \cgalHeading{Implementation}
We use the boost random library function `boost::rand48` to generate the random We use the boost random library function `boost::rand48` to generate the random
numbers. numbers.

6
Generator/doc/Generator/CGAL/point_generators_2.h
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@ -11,7 +11,7 @@ replacing each point with a random point from the `xeps` \f$ \times\f$
`yeps` rectangle centered at the original point. Two random numbers `yeps` rectangle centered at the original point. Two random numbers
are needed from `rnd` for each point. are needed from `rnd` for each point.
### Requires ### \cgalHeading{Requires}
- `Creator` must be a function object accepting two - `Creator` must be a function object accepting two
`double` values \f$ x\f$ and \f$ y\f$ and returning an initialized point `double` values \f$ x\f$ and \f$ y\f$ and returning an initialized point
@ -72,7 +72,7 @@ The function creates the first \f$ n\f$ points on the regular \f$ \lceil\sqrt{n}
the \f$ n\f$ points. the \f$ n\f$ points.
### Requires ### \cgalHeading{Requires}
- `Creator` must be a function object accepting two - `Creator` must be a function object accepting two
`double` values \f$ x\f$ and \f$ y\f$ and returning an initialized point `double` values \f$ x\f$ and \f$ y\f$ and returning an initialized point
@ -108,7 +108,7 @@ in the range `[first,last)`.
Three random numbers are needed from `rnd` for each point. Three random numbers are needed from `rnd` for each point.
Returns the value of `first2` after inserting the \f$ n\f$ points. Returns the value of `first2` after inserting the \f$ n\f$ points.
### Requires ### \cgalHeading{Requires}
- `Creator` must be a function object accepting two - `Creator` must be a function object accepting two
`double` values \f$ x\f$ and \f$ y\f$ and returning an initialized point `double` values \f$ x\f$ and \f$ y\f$ and returning an initialized point

2
Generator/doc/Generator/CGAL/point_generators_3.h
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@ -11,7 +11,7 @@ grid within the cube
inserting the \f$ n\f$ points. inserting the \f$ n\f$ points.
###Requires### \cgalHeading{Requires}
- `Creator` must be a function object accepting three - `Creator` must be a function object accepting three
`double` values \f$ x\f$, \f$ y\f$, and \f$ z\f$ and returning an initialized `double` values \f$ x\f$, \f$ y\f$, and \f$ z\f$ and returning an initialized
point `(x,y,z)` of type `P`. Predefined implementations for point `(x,y,z)` of type `P`. Predefined implementations for

2
Generator/doc/Generator/CGAL/point_generators_d.h
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@ -13,7 +13,7 @@ within the hypercube \f$ [-a,a]^{dim}\f$.
\returns the value of \f$ o\f$ after inserting the \f$ n\f$ points. \returns the value of \f$ o\f$ after inserting the \f$ n\f$ points.
### Requirements ### \cgalHeading{Requirements}
<UL> <UL>
<LI>`Creator` must be a functor accepting an integer (the dimension) <LI>`Creator` must be a functor accepting an integer (the dimension)

6
Generator/doc/Generator/CGAL/random_convex_set_2.h
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@ -14,7 +14,7 @@ we cannot easily describe the resulting distribution.
### Requirements ### \cgalHeading{Requirements}
- `PointGenerator` is a model of the concept PointGenerator - `PointGenerator` is a model of the concept PointGenerator
- `Traits` is a model of the concept RandomConvexSetTraits_2 - `Traits` is a model of the concept RandomConvexSetTraits_2
@ -28,14 +28,14 @@ R >` for some representation class `R`,
\sa `CGAL::Random_points_in_square_2<Point_2, Creator>` \sa `CGAL::Random_points_in_square_2<Point_2, Creator>`
\sa `CGAL::Random_points_in_disc_2<Point_2, Creator>` \sa `CGAL::Random_points_in_disc_2<Point_2, Creator>`
### Implementation ### \cgalHeading{Implementation}
The implementation uses the centroid method The implementation uses the centroid method
described in \cite cgal:s-zkm-96 and has a worst case running time of \f$ O(r described in \cite cgal:s-zkm-96 and has a worst case running time of \f$ O(r
\cdot n + n \cdot \log n)\f$, where \f$ r\f$ is the time needed by `pg` \cdot n + n \cdot \log n)\f$, where \f$ r\f$ is the time needed by `pg`
to generate a random point. to generate a random point.
### Example ### \cgalHeading{Example}
The following program displays a random convex 500-gon where the The following program displays a random convex 500-gon where the
points are drawn uniformly from the unit square centered at the points are drawn uniformly from the unit square centered at the

6
Generator/doc/Generator/CGAL/random_polygon_2.h
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@ -15,7 +15,7 @@ points has a non-zero probability of being constructed, some polygons may
have higher probabilities than others. The overall distribution of the have higher probabilities than others. The overall distribution of the
generated polygons is not known since it depends on the generated points. generated polygons is not known since it depends on the generated points.
### Requirements ### \cgalHeading{Requirements}
- `Traits` is a model of the concept RandomPolygonTraits_2 - `Traits` is a model of the concept RandomPolygonTraits_2
- `PointGenerator::value_type` is equivalent to - `PointGenerator::value_type` is equivalent to
@ -28,7 +28,7 @@ The default traits class `Default_traits` is the kernel in which
\sa `CGAL::Random_points_in_disc_2<Point_2, Creator>` \sa `CGAL::Random_points_in_disc_2<Point_2, Creator>`
\sa `CGAL::Random_points_in_square_2<Point_2, Creator>` \sa `CGAL::Random_points_in_square_2<Point_2, Creator>`
### Implementation ### \cgalHeading{Implementation}
The implementation is based on the method of eliminating self-intersections in The implementation is based on the method of eliminating self-intersections in
a polygon by using so-called "2-opt" moves. Such a move eliminates an a polygon by using so-called "2-opt" moves. Such a move eliminates an
@ -39,7 +39,7 @@ Intersecting edges are detected using a simple sweep through the vertices
and then one intersection is chosen at random to eliminate after each sweep. and then one intersection is chosen at random to eliminate after each sweep.
The worse-case running time is therefore \f$ O(n^4 \log n)\f$. The worse-case running time is therefore \f$ O(n^4 \log n)\f$.
### Example ### \cgalHeading{Example}
The following program displays a random simple polygon with up to 100 The following program displays a random simple polygon with up to 100
vertices, where the vertex coordinates are drawn uniformly from the vertices, where the vertex coordinates are drawn uniformly from the

2
Geomview/doc/Geomview/CGAL/IO/Geomview_stream.h
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@ -8,7 +8,7 @@ namespace CGAL {
from. The constructor starts Geomview either on the local either on from. The constructor starts Geomview either on the local either on
a remote machine. a remote machine.
### Implementation ### \cgalHeading{Implementation}
The constructor forks a process and establishes two pipes between the The constructor forks a process and establishes two pipes between the
processes. The forked process is then overlaid with Geomview. The processes. The forked process is then overlaid with Geomview. The

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_const_decorator.h
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@ -24,7 +24,7 @@ all halfedge data structures and will not appear here again.
\tparam HDS must be a model of `HalfedgeDS` \tparam HDS must be a model of `HalfedgeDS`
### Example ### \cgalHeading{Example}
The following program fragment illustrates the implementation of a The following program fragment illustrates the implementation of a
`is_valid()` member function for a simplified polyhedron class. `is_valid()` member function for a simplified polyhedron class.

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_decorator.h
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@ -23,7 +23,7 @@ all halfedge data structures and will not appear here again.
\sa `CGAL::HalfedgeDS_items_decorator<HDS>` \sa `CGAL::HalfedgeDS_items_decorator<HDS>`
\sa `CGAL::HalfedgeDS_const_decorator<HDS>` \sa `CGAL::HalfedgeDS_const_decorator<HDS>`
### Example ### \cgalHeading{Example}
The following program fragment illustrates the implementation of the The following program fragment illustrates the implementation of the
Euler operator `split_vertex()` for a simplified polyhedron class. Euler operator `split_vertex()` for a simplified polyhedron class.

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_default.h
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@ -21,7 +21,7 @@ removal.
\sa `CGAL::HalfedgeDS_decorator<HDS>` \sa `CGAL::HalfedgeDS_decorator<HDS>`
\sa `CGAL::HalfedgeDS_const_decorator<HDS>` \sa `CGAL::HalfedgeDS_const_decorator<HDS>`
### Implementation ### \cgalHeading{Implementation}
Currently, `HalfedgeDS_default` is derived from `CGAL::HalfedgeDS_list<Traits>`. Currently, `HalfedgeDS_default` is derived from `CGAL::HalfedgeDS_list<Traits>`.
The copy constructor and the assignment operator need \f$ O(n)\f$ time with The copy constructor and the assignment operator need \f$ O(n)\f$ time with

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_items_2.h
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@ -19,7 +19,7 @@ is the template argument of the corresponding `HalfedgeDS`.
\sa `CGAL::HalfedgeDS_halfedge_base<Refs>` \sa `CGAL::HalfedgeDS_halfedge_base<Refs>`
\sa `CGAL::HalfedgeDS_face_base<Refs>` \sa `CGAL::HalfedgeDS_face_base<Refs>`
### Example ### \cgalHeading{Example}
The following example shows the canonical implementation of the The following example shows the canonical implementation of the
`HalfedgeDS_items_2` class. It uses the base classes for the item types that `HalfedgeDS_items_2` class. It uses the base classes for the item types that

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_items_decorator.h
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@ -23,7 +23,7 @@ all halfedge data structures and will not appear here again.
\sa `CGAL::HalfedgeDS_decorator<HDS>` \sa `CGAL::HalfedgeDS_decorator<HDS>`
\sa `CGAL::HalfedgeDS_const_decorator<HDS>` \sa `CGAL::HalfedgeDS_const_decorator<HDS>`
### Example ### \cgalHeading{Example}
The following program fragment illustrates how a refined halfedge The following program fragment illustrates how a refined halfedge
class for a polyhedron can make use of the `find_prev()` member class for a polyhedron can make use of the `find_prev()` member

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_list.h
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@ -17,7 +17,7 @@ iterators that supports removal.
\sa `CGAL::HalfedgeDS_decorator<HDS>` \sa `CGAL::HalfedgeDS_decorator<HDS>`
\sa `CGAL::HalfedgeDS_const_decorator<HDS>` \sa `CGAL::HalfedgeDS_const_decorator<HDS>`
### Implementation ### \cgalHeading{Implementation}
`HalfedgeDS_list` uses internally the `CGAL::In_place_list` container class. `HalfedgeDS_list` uses internally the `CGAL::In_place_list` container class.
The copy constructor and the assignment operator need \f$ O(n)\f$ time with The copy constructor and the assignment operator need \f$ O(n)\f$ time with

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_min_items.h
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@ -19,7 +19,7 @@ halfedges.
\sa `CGAL::HalfedgeDS_halfedge_min_base<Refs>` \sa `CGAL::HalfedgeDS_halfedge_min_base<Refs>`
\sa `CGAL::HalfedgeDS_face_min_base<Refs>` \sa `CGAL::HalfedgeDS_face_min_base<Refs>`
### Example ### \cgalHeading{Example}
The following example shows the canonical implementation of the The following example shows the canonical implementation of the
`CGAL::HalfedgeDS_min_items` class. It uses the base classes for the `CGAL::HalfedgeDS_min_items` class. It uses the base classes for the

2
HalfedgeDS/doc/HalfedgeDS/CGAL/HalfedgeDS_vector.h
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@ -17,7 +17,7 @@ access iterators that does not support removal.
\sa `CGAL::HalfedgeDS_decorator<HDS>` \sa `CGAL::HalfedgeDS_decorator<HDS>`
\sa `CGAL::HalfedgeDS_const_decorator<HDS>` \sa `CGAL::HalfedgeDS_const_decorator<HDS>`
### Implementation ### \cgalHeading{Implementation}
`HalfedgeDS_vector` uses internally the \stl `std::vector` container `HalfedgeDS_vector` uses internally the \stl `std::vector` container
class. We require that we can create a `std::vector::iterator` class. We require that we can create a `std::vector::iterator`

2
Inscribed_areas/doc/Inscribed_areas/CGAL/Largest_empty_iso_rectangle_2.h
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@ -11,7 +11,7 @@ that do not contain any point of the point set.
\tparam T must be a model of the concept `LargestEmptyIsoRectangleTraits_2`. \tparam T must be a model of the concept `LargestEmptyIsoRectangleTraits_2`.
### Implementation ### \cgalHeading{Implementation}
The algorithm is an implementation of \cite o-naler-90. The runtime of an The algorithm is an implementation of \cite o-naler-90. The runtime of an
insertion or a removal is \f$ O(\log n)\f$. A query takes \f$ O(n^2)\f$ worst insertion or a removal is \f$ O(\log n)\f$. A query takes \f$ O(n^2)\f$ worst

10
Inscribed_areas/doc/Inscribed_areas/CGAL/extremal_polygon_2.h
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@ -29,7 +29,7 @@ convex polygon (oriented clock- or counterclockwise).
\sa `CGAL::maximum_perimeter_inscribed_k_gon_2()` \sa `CGAL::maximum_perimeter_inscribed_k_gon_2()`
\sa `ExtremalPolygonTraits_2` \sa `ExtremalPolygonTraits_2`
### Implementation ### \cgalHeading{Implementation}
The implementation uses monotone matrix search The implementation uses monotone matrix search
\cite akmsw-gamsa-87 and has a worst case running time of \f$ O(k \cite akmsw-gamsa-87 and has a worst case running time of \f$ O(k
@ -86,14 +86,14 @@ where `K` is a model of `Kernel`.
\sa `CGAL::Extremal_polygon_perimeter_traits_2<K>` \sa `CGAL::Extremal_polygon_perimeter_traits_2<K>`
\sa `CGAL::extremal_polygon_2()` \sa `CGAL::extremal_polygon_2()`
### Implementation ### \cgalHeading{Implementation}
The implementation uses monotone matrix search The implementation uses monotone matrix search
\cite akmsw-gamsa-87 and has a worst case running time of \f$ O(k \cite akmsw-gamsa-87 and has a worst case running time of \f$ O(k
\cdot n + n \cdot \log n)\f$, where \f$ n\f$ is the number of vertices in \cdot n + n \cdot \log n)\f$, where \f$ n\f$ is the number of vertices in
\f$ P\f$. \f$ P\f$.
### Example ### \cgalHeading{Example}
The following code generates a random convex polygon The following code generates a random convex polygon
`p` with ten vertices and computes the maximum area inscribed `p` with ten vertices and computes the maximum area inscribed
@ -155,14 +155,14 @@ defined that computes the squareroot of a number.
\sa `CGAL::Extremal_polygon_perimeter_traits_2<K>` \sa `CGAL::Extremal_polygon_perimeter_traits_2<K>`
\sa `CGAL::extremal_polygon_2()` \sa `CGAL::extremal_polygon_2()`
### Implementation ### \cgalHeading{Implementation}
The implementation uses monotone matrix search The implementation uses monotone matrix search
\cite akmsw-gamsa-87 and has a worst case running time of \f$ O(k \cite akmsw-gamsa-87 and has a worst case running time of \f$ O(k
\cdot n + n \cdot \log n)\f$, where \f$ n\f$ is the number of vertices in \cdot n + n \cdot \log n)\f$, where \f$ n\f$ is the number of vertices in
\f$ P\f$. \f$ P\f$.
### Example ### \cgalHeading{Example}
The following code generates a random convex polygon The following code generates a random convex polygon
`p` with ten vertices and computes the maximum perimeter inscribed `p` with ten vertices and computes the maximum perimeter inscribed

16
Interpolation/doc/Interpolation/CGAL/interpolation_functions.h
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@ -13,7 +13,7 @@ whether the retrieval was successful.
This class can be used to provide the values and gradients of the This class can be used to provide the values and gradients of the
interpolation functions. interpolation functions.
### Parameters ### \cgalHeading{Parameters}
The class The class
`Data_access` has the container type `Map` as template parameter. `Data_access` has the container type `Map` as template parameter.
@ -68,13 +68,13 @@ generates the interpolated function value computed by Farin's interpolant.
The function `farin_c1_interpolation()` interpolates the function values and the The function `farin_c1_interpolation()` interpolates the function values and the
gradients that are provided by functors using the method described in \cite f-sodt-90. gradients that are provided by functors using the method described in \cite f-sodt-90.
### Parameters ### \cgalHeading{Parameters}
The value type of `RandomAccessIterator` is a pair The value type of `RandomAccessIterator` is a pair
associating a point to a (non-normalized) barycentric coordinate. See associating a point to a (non-normalized) barycentric coordinate. See
`sibson_c1_interpolation()` for the other parameters. `sibson_c1_interpolation()` for the other parameters.
### Requirements ### \cgalHeading{Requirements}
Same requirements as for `sibson_c1_interpolation()` only the Same requirements as for `sibson_c1_interpolation()` only the
iterator must provide random access and `Traits::FT` does not need iterator must provide random access and `Traits::FT` does not need
@ -118,7 +118,7 @@ corresponding to each point of the point/coordinate pairs in the
range \f$ \left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$. range \f$ \left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$.
\pre `norm` \f$ \neq0\f$. `function_value(p).second == true` for all points `p` of the point/coordinate pairs in the range \f$ \left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$. \pre `norm` \f$ \neq0\f$. `function_value(p).second == true` for all points `p` of the point/coordinate pairs in the range \f$ \left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `ForwardIterator` is a pair of <LI>The value type of `ForwardIterator` is a pair of
@ -166,11 +166,11 @@ pairs in the range \f$ \left[\right.\f$ `first`,
`beyond`\f$ \left.\right)\f$. See also `beyond`\f$ \left.\right)\f$. See also
`sibson_c1_interpolation`. \pre `norm` \f$ \neq0\f$ `function_value(p).second == true` for all points `p` of the point/coordinate pairs in the range \f$ \left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$. `sibson_c1_interpolation`. \pre `norm` \f$ \neq0\f$ `function_value(p).second == true` for all points `p` of the point/coordinate pairs in the range \f$ \left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$.
### Parameters ### \cgalHeading{Parameters}
See `sibson_c1_interpolation`. See `sibson_c1_interpolation`.
### Requirements ### \cgalHeading{Requirements}
Same requirements as for Same requirements as for
`sibson_c1_interpolation()` only that `Traits::FT` does not need `sibson_c1_interpolation()` only that `Traits::FT` does not need
@ -215,7 +215,7 @@ interpolated function value as first and `true` as second value. \pre
`p` of the point/coordinate pairs in the range \f$\left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$. `p` of the point/coordinate pairs in the range \f$\left[\right.\f$`first`, `beyond`\f$ \left.\right)\f$.
### Parameters ### \cgalHeading{Parameters}
The template parameter `Traits` is to be The template parameter `Traits` is to be
instantiated with a model of `InterpolationTraits`. instantiated with a model of `InterpolationTraits`.
@ -228,7 +228,7 @@ coordinates for the query point `p`. The functor
function given a point. `function_gradient` allows to access the function given a point. `function_gradient` allows to access the
function gradient given a point. function gradient given a point.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`Traits` is a model of the concept <LI>`Traits` is a model of the concept

4
Interpolation/doc/Interpolation/CGAL/natural_neighbor_coordinates_2.h
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@ -9,7 +9,7 @@ called Sibson's coordinates, for `2D` points provided a two-dimensional
triangulation and a query point in the convex hull of the vertices triangulation and a query point in the convex hull of the vertices
of the triangulation. of the triangulation.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`Dt` are equivalent to the class <LI>`Dt` are equivalent to the class
@ -30,7 +30,7 @@ the traits class of the `polygon_area_2` function.
associating a point and its natural neighbor coordinate. associating a point and its natural neighbor coordinate.
</OL> </OL>
### Implementation ### \cgalHeading{Implementation}
This function computes the area of the sub-cells This function computes the area of the sub-cells
stolen from the Voronoi cells of the points in `dt` when inserting stolen from the Voronoi cells of the points in `dt` when inserting

4
Interpolation/doc/Interpolation/CGAL/regular_neighbor_coordinates_2.h
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@ -10,7 +10,7 @@ two-dimensional regular triangulation and a (weighted) query point
inside the convex hull of the vertices of the triangulation. We call these inside the convex hull of the vertices of the triangulation. We call these
coordinates regular neighbor coordinates. coordinates regular neighbor coordinates.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`Rt` are equivalent to the class <LI>`Rt` are equivalent to the class
@ -26,7 +26,7 @@ meet the requirements for the traits class of the
associating a point and its regular neighbor coordinate. associating a point and its regular neighbor coordinate.
</OL> </OL>
### Implementation ### \cgalHeading{Implementation}
This function computes the areas stolen from the This function computes the areas stolen from the
Voronoi cells of points in `rt` by the insertion of `p`. The Voronoi cells of points in `rt` by the insertion of `p`. The

4
Interpolation/doc/Interpolation/CGAL/sibson_gradient_fitting.h
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@ -12,7 +12,7 @@ gradient for all data points that lie inside the convex hull of the
data points. One function exists for each type of natural neighbor data points. One function exists for each type of natural neighbor
coordinates. coordinates.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>The value type of `ForwardIterator` is a pair of point/coordinate <LI>The value type of `ForwardIterator` is a pair of point/coordinate
@ -38,7 +38,7 @@ provide a multiplication and addition operation with the type
\sa `CGAL::regular_neighbor_coordinates_2()` \sa `CGAL::regular_neighbor_coordinates_2()`
\sa `CGAL::surface_neighbor_coordinates_3()` \sa `CGAL::surface_neighbor_coordinates_3()`
### Implementation ### \cgalHeading{Implementation}
This function implements Sibson's gradient This function implements Sibson's gradient
estimation method based on natural neighbor coordinates estimation method based on natural neighbor coordinates

4
Interpolation/doc/Interpolation/CGAL/surface_neighbor_coordinates_3.h
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@ -23,7 +23,7 @@ the range `[first, beyond)`. If the sample points are collected by a
`k`-nearest neighbor or a range search query, this permits to check `k`-nearest neighbor or a range search query, this permits to check
whether the neighborhood which has been considered is large enough. whether the neighborhood which has been considered is large enough.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`Dt` is equivalent to the class <LI>`Dt` is equivalent to the class
@ -40,7 +40,7 @@ associating a point and its natural neighbor coordinate.
\sa `CGAL::Voronoi_intersection_2_traits_3<K>` \sa `CGAL::Voronoi_intersection_2_traits_3<K>`
\sa `CGAL::surface_neighbors_3()` \sa `CGAL::surface_neighbors_3()`
### Implementation ### \cgalHeading{Implementation}
This functions construct the regular triangulation of the input points This functions construct the regular triangulation of the input points
instantiated with `Voronoi_intersection_2_traits_3<Kernel>` or `ITraits` if provided. instantiated with `Voronoi_intersection_2_traits_3<Kernel>` or `ITraits` if provided.

4
Interpolation/doc/Interpolation/CGAL/surface_neighbors_3.h
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@ -25,7 +25,7 @@ points are collected by a \f$ k\f$-nearest neighbor or a range search
query, this permits to verify that a large enough neighborhood has query, this permits to verify that a large enough neighborhood has
been considered. been considered.
### Requirements ### \cgalHeading{Requirements}
<OL> <OL>
<LI>`Dt` is equivalent to the class <LI>`Dt` is equivalent to the class
@ -38,7 +38,7 @@ been considered.
\sa CGAL::Voronoi_intersection_2_traits_3<K> \sa CGAL::Voronoi_intersection_2_traits_3<K>
\sa CGAL::surface_neighbor_coordinates_3 \sa CGAL::surface_neighbor_coordinates_3
### Implementation ### \cgalHeading{Implementation}
These functions compute the regular triangulation of These functions compute the regular triangulation of
the sample points and the point `p` using a traits class the sample points and the point `p` using a traits class

2
Interval_skip_list/doc/Interval_skip_list/CGAL/Interval_skip_list.h
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@ -6,7 +6,7 @@ namespace CGAL {
The class `Interval_skip_list` is a dynamic data structure that The class `Interval_skip_list` is a dynamic data structure that
allows to find all members of a set of intervals that overlap a point. allows to find all members of a set of intervals that overlap a point.
### Implementation ### \cgalHeading{Implementation}
The insertion and deletion of a segment in the interval skip list The insertion and deletion of a segment in the interval skip list
takes expected time \f$ O(\log^2 n)\f$, if the segment endpoints are takes expected time \f$ O(\log^2 n)\f$, if the segment endpoints are

2
Interval_skip_list/doc/Interval_skip_list/CGAL/Interval_skip_list_interval.h
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@ -7,7 +7,7 @@ The class `Interval_skip_list_interval` represents intervals with lower and uppe
bound of type `Value`. These intervals bound of type `Value`. These intervals
can be open or closed at each endpoint. can be open or closed at each endpoint.
### I/O ### \cgalHeading{I/O}
The output operator is defined for `std::ostream`. The output operator is defined for `std::ostream`.

2
Kernel_23/doc/Kernel_23/CGAL/Aff_transformation_2.h
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@ -40,7 +40,7 @@ therefore do not appear in the constructors.
\sa `Translation` \sa `Translation`
\sa `rational_rotation_approximation` \sa `rational_rotation_approximation`
### Example ### \cgalHeading{Example}
\code \code
typedef Cartesian<double> K; typedef Cartesian<double> K;

2
Kernel_23/doc/Kernel_23/CGAL/Cartesian.h
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@ -16,7 +16,7 @@ the kernel is only an approximation of Euclidean geometry.
\cgalModels `Kernel` \cgalModels `Kernel`
### Implementation ### \cgalHeading{Implementation}
All geometric objects in `Cartesian` are reference counted. All geometric objects in `Cartesian` are reference counted.

2
Kernel_23/doc/Kernel_23/CGAL/Cartesian_converter.h
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@ -17,7 +17,7 @@ provide `K2::FT operator()(K1::FT n)` that converts `n` to an
The default value of this parameter is `CGAL::NT_converter<K1::FT, K2::FT>`. The default value of this parameter is `CGAL::NT_converter<K1::FT, K2::FT>`.
### Example ### \cgalHeading{Example}
In the following example, we compute exactly In the following example, we compute exactly
the intersection point between a line and a triangle, the intersection point between a line and a triangle,

12
Kernel_23/doc/Kernel_23/CGAL/Dimension.h
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@ -9,11 +9,11 @@ namespace CGAL {
The class `Ambient_dimension` allows to retrieve the dimension of the ambient space of The class `Ambient_dimension` allows to retrieve the dimension of the ambient space of
a type `T` in a kernel `K`. a type `T` in a kernel `K`.
### Parameters ### \cgalHeading{Parameters}
The parameter `K` has the default value `Kernel_traits<T>::Kernel>`. The parameter `K` has the default value `Kernel_traits<T>::Kernel>`.
### Example ### \cgalHeading{Example}
The following retrieves the dimension of a point type. The following retrieves the dimension of a point type.
@ -66,7 +66,7 @@ for dispatching functions based on the dimension of an object, as provided
by the `dim` parameter. It is useful in cases where it is not more by the `dim` parameter. It is useful in cases where it is not more
practical to pass the dimension as a template parameter directly. practical to pass the dimension as a template parameter directly.
### Example ### \cgalHeading{Example}
The following code declares two functions constructing two points at the origin, The following code declares two functions constructing two points at the origin,
either in 2D or in 3D. either in 2D or in 3D.
@ -107,7 +107,7 @@ for dispatching functions based on the dimension of an object.
`Dynamic_dimension_tag` indicates that the dimension is not known at compile-time. `Dynamic_dimension_tag` indicates that the dimension is not known at compile-time.
`Dimension_tag` is the tag class dealing with compile-time dimensions. `Dimension_tag` is the tag class dealing with compile-time dimensions.
### Example ### \cgalHeading{Example}
The following code declares two functions constructing two points at the origin, The following code declares two functions constructing two points at the origin,
either in 2D or in 3D. either in 2D or in 3D.
@ -138,11 +138,11 @@ public:
The class `Feature_dimension` allows to retrieve the geometric dimension of a type `T` The class `Feature_dimension` allows to retrieve the geometric dimension of a type `T`
in a kernel `K`. in a kernel `K`.
### Parameters ### \cgalHeading{Parameters}
The parameter `K` has the default value `Kernel_traits<T>::Kernel`. The parameter `K` has the default value `Kernel_traits<T>::Kernel`.
### Example ### \cgalHeading{Example}
The following retrieves the dimension of a point type. The following retrieves the dimension of a point type.

8
Kernel_23/doc/Kernel_23/CGAL/Filtered_kernel.h
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@ -15,7 +15,7 @@ the global functions are those of `CK`.
\cgalModels `Kernel` \cgalModels `Kernel`
### Example ### \cgalHeading{Example}
The following example shows how to produce a kernel whose geometric The following example shows how to produce a kernel whose geometric
objects and constructions are those of `Simple_cartesian<double>` objects and constructions are those of `Simple_cartesian<double>`
@ -61,7 +61,7 @@ techniques from \cite cgal:mp-fcafg-05.
The geometric constructions are exactly those The geometric constructions are exactly those
of the kernel `CK`, which means that they are not necessarily exact. of the kernel `CK`, which means that they are not necessarily exact.
### Parameters ### \cgalHeading{Parameters}
The first parameter, `CK`, is the "Construction Kernel", namely the kernel The first parameter, `CK`, is the "Construction Kernel", namely the kernel
from which are taken the types of the geometric objects as well as the from which are taken the types of the geometric objects as well as the
@ -75,7 +75,7 @@ production use for deactivating static filters.
\cgalModels `Kernel` \cgalModels `Kernel`
### Example ### \cgalHeading{Example}
The following example shows how to produce a kernel whose geometric The following example shows how to produce a kernel whose geometric
objects and constructions are those of `Simple_cartesian<double>` objects and constructions are those of `Simple_cartesian<double>`
@ -89,7 +89,7 @@ typedef CGAL::Simple_cartesian<double> CK;
typedef CGAL::Filtered_kernel<CK> K; typedef CGAL::Filtered_kernel<CK> K;
\endcode \endcode
### Implementation ### \cgalHeading{Implementation}
The implementation uses `CGAL::Filtered_predicate<EP, FP, C2E, C2F>` over The implementation uses `CGAL::Filtered_predicate<EP, FP, C2E, C2F>` over
each predicate of the kernel traits interface. Additionally, faster static each predicate of the kernel traits interface. Additionally, faster static

2
Kernel_23/doc/Kernel_23/CGAL/Filtered_predicate.h
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@ -18,7 +18,7 @@ To convert the geometric objects that are the arguments of the predicate,
we use the function objects `C2E` and `C2F`, which must be of the form we use the function objects `C2E` and `C2F`, which must be of the form
`Cartesian_converter` or `Homogeneous_converter`. `Cartesian_converter` or `Homogeneous_converter`.
### Example ### \cgalHeading{Example}
The following example defines an efficient and exact version of the The following example defines an efficient and exact version of the
orientation predicate over three points using the Cartesian representation orientation predicate over three points using the Cartesian representation

2
Kernel_23/doc/Kernel_23/CGAL/Homogeneous.h
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@ -16,7 +16,7 @@ the kernel is only an approximation of Euclidean geometry.
\cgalModels `Kernel` \cgalModels `Kernel`
### Implementation ### \cgalHeading{Implementation}
This model of a kernel uses reference counting. This model of a kernel uses reference counting.

2
Kernel_23/doc/Kernel_23/CGAL/Line_2.h
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@ -17,7 +17,7 @@ on the negative side of `l`, iff
\f$ a\, px + b\, py +c < 0\f$. \f$ a\, px + b\, py +c < 0\f$.
The positive side is to the left of `l`. The positive side is to the left of `l`.
### Example ### \cgalHeading{Example}
Let us first define two %Cartesian two-dimensional points in the Euclidean Let us first define two %Cartesian two-dimensional points in the Euclidean
plane \f$ \E^2\f$. Their plane \f$ \E^2\f$. Their

2
Kernel_23/doc/Kernel_23/CGAL/Origin.h
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@ -47,7 +47,7 @@ public:
A symbolic constant which denotes the point at the origin. This A symbolic constant which denotes the point at the origin. This
constant is used in the conversion between points and vectors. constant is used in the conversion between points and vectors.
### Example ### \cgalHeading{Example}
\code \code
Point_2< Cartesian<Exact_NT> > p(1.0, 1.0), q; Point_2< Cartesian<Exact_NT> > p(1.0, 1.0), q;

4
Kernel_23/doc/Kernel_23/CGAL/Point_2.h
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@ -13,11 +13,11 @@ kernel model `Homogeneous<T>`, `Kernel::RT` is equal
to `T`, and `Kernel::FT` is equal to to `T`, and `Kernel::FT` is equal to
`Quotient<T>`. `Quotient<T>`.
### Operators ### \cgalHeading{Operators}
The following operations can be applied on points: The following operations can be applied on points:
### Example ### \cgalHeading{Example}
The following declaration creates two points with The following declaration creates two points with
%Cartesian double coordinates. %Cartesian double coordinates.

2
Kernel_23/doc/Kernel_23/CGAL/Point_3.h
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@ -13,7 +13,7 @@ kernel model `Homogeneous<T>`, `Kernel::RT` is equal
to `T`, and `Kernel::FT` is equal to to `T`, and `Kernel::FT` is equal to
`Quotient<T>`. `Quotient<T>`.
### Operators ### \cgalHeading{Operators}
The following operations can be applied on points: The following operations can be applied on points:

2
Kernel_23/doc/Kernel_23/CGAL/Projection_traits_xy_3.h
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@ -13,7 +13,7 @@ deal with projections on the
`zx`- and the `zy`-plane, `zx`- and the `zy`-plane,
respectively. respectively.
### Parameters ### \cgalHeading{Parameters}
The template parameter `K` has to The template parameter `K` has to
be instantiated by a model of the `Kernel` concept. be instantiated by a model of the `Kernel` concept.

2
Kernel_23/doc/Kernel_23/CGAL/Simple_cartesian.h
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@ -16,7 +16,7 @@ the kernel is only an approximation of Euclidean geometry.
\cgalModels `Kernel` \cgalModels `Kernel`
### Implementation ### \cgalHeading{Implementation}
In contrast to `Cartesian`, no reference counting In contrast to `Cartesian`, no reference counting
is used internally. This eases debugging, but may slow down algorithms is used internally. This eases debugging, but may slow down algorithms

2
Kernel_23/doc/Kernel_23/CGAL/Simple_homogeneous.h
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@ -16,7 +16,7 @@ the kernel is only an approximation of Euclidean geometry.
\cgalModels `Kernel` \cgalModels `Kernel`
### Implementation ### \cgalHeading{Implementation}
In contrast to `Homogeneous`, no reference counting In contrast to `Homogeneous`, no reference counting
is used internally. This eases debugging, but may slow down algorithms is used internally. This eases debugging, but may slow down algorithms

2
Kernel_23/doc/Kernel_23/CGAL/enum.h
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@ -139,7 +139,7 @@ const CGAL::Null_vector NULL_VECTOR;
A symbolic constant which denotes the point at the origin. A symbolic constant which denotes the point at the origin.
This constant is used in the conversion between points and vectors. This constant is used in the conversion between points and vectors.
### Example ### \cgalHeading{Example}
\code \code
Point_2< Cartesian<Exact_NT> > p(1.0, 1.0), q; Point_2< Cartesian<Exact_NT> > p(1.0, 1.0), q;

2
Kernel_23/doc/Kernel_23/CGAL/intersections.h
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@ -385,7 +385,7 @@ p <TD>Point_3, or Segment_3</TD>
</TABLE> </TABLE>
</DIV> </DIV>
### Example ### \cgalHeading{Example}
The following example demonstrates the most common use of The following example demonstrates the most common use of
`intersection` routines with the 2D and 3D Linear %Kernel. `intersection` routines with the 2D and 3D Linear %Kernel.

2
Kernel_23/doc/Kernel_23/CGAL/rational_rotation.h
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@ -14,7 +14,7 @@ that `sin_num`/`denom` approximates the sine of direction
the approximating rational is bounded by `eps_num`/`eps_den`. the approximating rational is bounded by `eps_num`/`eps_den`.
\pre `eps_num` \f$ \neq0\f$. \pre `eps_num` \f$ \neq0\f$.
### Implementation ### \cgalHeading{Implementation}
The approximation is based on Farey sequences as described in The approximation is based on Farey sequences as described in
the rational rotation method presented by Canny and Ressler at the the rational rotation method presented by Canny and Ressler at the

2
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Aff_transformation_d.h
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@ -12,7 +12,7 @@ must be non-zero. A point \f$ p\f$ with homogeneous coordinates \f$ (p[0],
= \f$ Mp\f$, where `A` is an affine transformation created from `M` = \f$ Mp\f$, where `A` is an affine transformation created from `M`
by the constructors below. by the constructors below.
### Implementation ### \cgalHeading{Implementation}
Affine Transformations are implemented by matrices of number type Affine Transformations are implemented by matrices of number type
`RT` as a handle type. All operations like creation, `RT` as a handle type. All operations like creation,

4
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Direction_d.h
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@ -13,12 +13,12 @@ which are of type `FT`. Two directions are equal if their
%Cartesian coordinates are positive multiples of each other. Directions %Cartesian coordinates are positive multiples of each other. Directions
are in one-to-one correspondence to points on the unit sphere. are in one-to-one correspondence to points on the unit sphere.
### Downward compatibility ### \cgalHeading{Downward compatibility}
We provide the operations of the lower dimensional interface `dx()`, We provide the operations of the lower dimensional interface `dx()`,
`dy()`, `dz()`. `dy()`, `dz()`.
### Implementation ### \cgalHeading{Implementation}
Directions are implemented by arrays of integers as an item type. All Directions are implemented by arrays of integers as an item type. All
operations like creation, initialization, tests, inversion, input and operations like creation, initialization, tests, inversion, input and

2
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Hyperplane_d.h
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@ -22,7 +22,7 @@ coefficient vectors are positive multiples of each other and they are
(weakly) equal if their coefficient vectors are multiples of each (weakly) equal if their coefficient vectors are multiples of each
other. other.
### Implementation ### \cgalHeading{Implementation}
Hyperplanes are implemented by arrays of integers as an item type. Hyperplanes are implemented by arrays of integers as an item type.
All operations like creation, initialization, tests, vector All operations like creation, initialization, tests, vector

2
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Line_d.h
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@ -6,7 +6,7 @@ namespace CGAL {
An instance of data type `Line_d` is an oriented line in An instance of data type `Line_d` is an oriented line in
\f$ d\f$-dimensional Euclidean space. \f$ d\f$-dimensional Euclidean space.
### Implementation ### \cgalHeading{Implementation}
Lines are implemented by a pair of points as an item type. All Lines are implemented by a pair of points as an item type. All
operations like creation, initialization, tests, direction operations like creation, initialization, tests, direction

4
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Point_d.h
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@ -14,13 +14,13 @@ We call \f$ p_i\f$, \f$ 0 \leq i < d\f$ the \f$ i\f$-th %Cartesian coordinate an
\f$ h_i\f$, \f$ 0 \le i \le d\f$, the \f$ i\f$-th homogeneous coordinate. We call \f$ d\f$ \f$ h_i\f$, \f$ 0 \le i \le d\f$, the \f$ i\f$-th homogeneous coordinate. We call \f$ d\f$
the dimension of the point. the dimension of the point.
### Downward compatibility ### \cgalHeading{Downward compatibility}
We provide operations of the lower We provide operations of the lower
dimensional interface `x()`, `y()`, `z()`, `hx()`, dimensional interface `x()`, `y()`, `z()`, `hx()`,
`hy()`, `hz()`, `hw()`. `hy()`, `hz()`, `hw()`.
### Implementation ### \cgalHeading{Implementation}
Points are implemented by arrays of `RT` items. All operations Points are implemented by arrays of `RT` items. All operations
like creation, initialization, tests, point - vector arithmetic, input like creation, initialization, tests, point - vector arithmetic, input

2
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Ray_d.h
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@ -7,7 +7,7 @@ An instance of data type `Ray_d` is a ray in \f$ d\f$-dimensional
Euclidean space. It starts in a point called the source of `r` and Euclidean space. It starts in a point called the source of `r` and
it goes to infinity. it goes to infinity.
### Implementation ### \cgalHeading{Implementation}
Rays are implemented by a pair of points as an item type. All Rays are implemented by a pair of points as an item type. All
operations like creation, initialization, tests, direction operations like creation, initialization, tests, direction

2
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Segment_d.h
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@ -9,7 +9,7 @@ two points \f$ p\f$ and \f$ q\f$. \f$ p\f$ is called the source point and \f$ q\
called the target point of \f$ s\f$, both points are called endpoints of called the target point of \f$ s\f$, both points are called endpoints of
\f$ s\f$. A segment whose endpoints are equal is called <I>degenerate</I>. \f$ s\f$. A segment whose endpoints are equal is called <I>degenerate</I>.
### Implementation ### \cgalHeading{Implementation}
Segments are implemented by a pair of points as an item type. All Segments are implemented by a pair of points as an item type. All
operations like creation, initialization, tests, the calculation of operations like creation, initialization, tests, the calculation of

2
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Sphere_d.h
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@ -13,7 +13,7 @@ sense and hence many operations on spheres require the set of defining
points to be legal. The orientation of \f$ S\f$ is equal to the points to be legal. The orientation of \f$ S\f$ is equal to the
orientation of the defining points, i.e., `orientation(A)`. orientation of the defining points, i.e., `orientation(A)`.
### Implementation ### \cgalHeading{Implementation}
Spheres are implemented by a vector of points as a handle type. All Spheres are implemented by a vector of points as a handle type. All
operations like creation, initialization, tests, input and output of a operations like creation, initialization, tests, input and output of a

4
Kernel_d/doc/Kernel_d/CGAL/Kernel_d/Vector_d.h
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@ -16,13 +16,13 @@ main difference between position vectors and free vectors is their
behavior under affine transformations, e.g., free vectors are behavior under affine transformations, e.g., free vectors are
invariant under translations. invariant under translations.
### Downward compatibility ### \cgalHeading{Downward compatibility}
We provide all operations of the We provide all operations of the
lower dimensional interface `x()`, `y()`, `z()`, lower dimensional interface `x()`, `y()`, `z()`,
`hx()`, `hy()`, `hz()`, `hw()`. `hx()`, `hy()`, `hz()`, `hw()`.
### Implementation ### \cgalHeading{Implementation}
Vectors are implemented by arrays of variables of type `RT`. All Vectors are implemented by arrays of variables of type `RT`. All
operations like creation, initialization, tests, vector arithmetic, operations like creation, initialization, tests, vector arithmetic,

2
Kernel_d/doc/Kernel_d/CGAL/Linear_algebraCd.h
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@ -12,7 +12,7 @@ algebra for field number types `FT`.
\tparam FT must be a field number type. \tparam FT must be a field number type.
### Operations ### \cgalHeading{Operations}
Fits all operation requirements of the concept. Fits all operation requirements of the concept.

2
Kernel_d/doc/Kernel_d/CGAL/Linear_algebraHd.h
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@ -13,7 +13,7 @@ algebra for Euclidean ring number types `RT`.
\cgalRequires To make a ring number type `RT` work with this class it has to \cgalRequires To make a ring number type `RT` work with this class it has to
provide a division `operator/` with remainder. provide a division `operator/` with remainder.
### Operations ### \cgalHeading{Operations}
Fits all operation requirements of the concept. Fits all operation requirements of the concept.

2
Kernel_d/doc/Kernel_d/CGAL/intersections_d.h
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@ -118,7 +118,7 @@ the possible return values wrapped in `Object` are the following:
</TABLE> </TABLE>
</DIV> </DIV>
### Example ### \cgalHeading{Example}
The following example demonstrates the most common use of The following example demonstrates the most common use of
`intersection` routines. `intersection` routines.

2
Kinetic_data_structures/doc/Kinetic_data_structures/CGAL/Kinetic/Erase_event.h
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@ -13,7 +13,7 @@ is processed.
\sa `Kinetic::ActiveObjectsTable` \sa `Kinetic::ActiveObjectsTable`
\sa `Kinetic::Active_objects_vector<MovingObject>` \sa `Kinetic::Active_objects_vector<MovingObject>`
### Example ### \cgalHeading{Example}
\code{.cpp} \code{.cpp}

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