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CGAL 5.2.2 - 2D Alpha Shapes
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CGAL 5.2.2 - 2D Alpha Shapes
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The concept AlphaShapeVertex_2 describes the requirements for the base vertex of an alpha shape.
TriangulationVertexBase_2, if the underlying triangulation of the alpha shape is a Delaunay triangulation.
RegularTriangulationVertexBase_2, if the underlying triangulation of the alpha shape is a regular triangulation.
Periodic_2TriangulationVertexBase_2, if the underlying triangulation of the alpha shape is a periodic triangulation.
CGAL::Alpha_shape_vertex_base_2 (templated with the appropriate triangulation vertex base class). Types | |
| typedef unspecified_type | FT |
| A coordinate type. More... | |
Creation | |
| AlphaShapeVertex_2 () | |
| default constructor. | |
| AlphaShapeVertex_2 (Point p) | |
| constructor setting the point. | |
| AlphaShapeVertex_2 (Point p, const Face_handle &ff) | |
| constructor setting the point associated to and an incident face. | |
Access Functions | |
| std::pair< FT, FT > | get_range () |
| returns two alpha values \( \alpha_1 \leq\alpha_2\), such as for \( \alpha\) between \( \alpha_1\) and \( \alpha_2\), the vertex is attached but singular, and for \( \alpha\) upper \( \alpha_2\), the vertex is regular. | |
Modifiers | |
| void | set_range (std::pair< FT, FT > I) |
| sets the alpha values \( \alpha_1 \leq\alpha_2\), such as for \( \alpha\) between \( \alpha_1\) and \( \alpha_2\), the vertex is attached but singular, and for \( \alpha\) upper \( \alpha_2\), the vertex is regular. | |
A coordinate type.
The type must provide a copy constructor, assignment, comparison operators, negation, multiplication, division and allow the declaration and initialization with a small integer constant (cf. requirements for number types). An obvious choice would be coordinate type of the point class.
1.8.13