CGAL 4.4 - Combinatorial Maps
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#include <CGAL/Combinatorial_map.h>
The class Combinatorial_map
represents a dD combinatorial map.
Darts and non void attributes are stored in memory using Compact_container
, using Alloc
as allocator.
d | is an integer for the dimension of the map. |
Items | must be a model of the CombinatorialMapItems concept. |
Alloc | has to match the standard allocator requirements. The rebind mechanism Alloc will be used to create appropriate allocators internally with value type Dart . |
There are two default template arguments: Combinatorial_map_min_items<d>
for Items
and CGAL_ALLOCATOR(int)
from the <CGAL/memory.h>
header file for Alloc
.
Complexity
The complexity of sew
and unsew
is in O( \( |\)S \( |\) \( \times\) \( |\)c \( |\)), S being the set of darts of the orbit \( \langle{}\) \( \beta_1\), \( \ldots\), \( \beta_{i-2}\), \( \beta_{i+2}\), \( \ldots\), \( \beta_d\) \( \rangle{}\) for the considered dart, and c the biggest j-cell merged or split during the sew such that j-attributes are non void. The complexity of is_sewable
is in O( \( |\)S \( |\)).
The complexity of set_attribute
is in O( \( |\)c \( |\)), c being the i-cell containing the considered dart.
The complexity of is_without_boundary(unsigned int i)
is in O( \( |\)D \( |\)), D being the set of darts of the combinatorial map, and the complexity of is_without_boundary()
is in O( \( |\)D \( |\) \( \times\)d).
The complexity of unmark_all
and free_mark
is in O(1) if all the darts of the combinatorial map have the same mark, and in O( \( |\)D \( |\)) otherwise.
The complexity of is_valid
is in O( \( |\)D \( |\) \( \times\)d \( ^2\)).
The complexity of clear
is in O( \( |\)D \( |\) \( \times\)d).
Other methods have all a constant time complexity.
CombinatorialMapItems
Dart
Types | |
typedef Combinatorial_map< d, Items, Alloc > | Self |
typedef Items::Dart_wrapper < Self >::Dart | Dart |