CGAL 4.8.2 - dD Spatial Searching
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Classes | |
class | CGAL::Euclidean_distance< Traits > |
The class Euclidean_distance provides an implementation of the concept OrthogonalDistance , with the Euclidean distance ( \( l_2\) metric). More... | |
class | CGAL::Euclidean_distance_sphere_point< Traits > |
The class Euclidean_distance_sphere_point provides an implementation of the GeneralDistance concept for the Euclidean distance ( \( l_2\) metric) between a \( d\)-dimensional sphere and a point, and the Euclidean distance between a \( d\)-dimensional sphere and a \( d\)-dimensional iso-rectangle defined as a \(k\)- \(d\) tree rectangle. More... | |
class | CGAL::Manhattan_distance_iso_box_point< Traits > |
The class Manhattan_distance_iso_box_point provides an implementation of the GeneralDistance concept for the Manhattan distance ( \( l_1\) metric) between a d -dimensional iso-box and a d -dimensional point and the Manhattan distance between a d -dimensional iso-box and a d -dimensional iso-box defined as a k-d tree rectangle. More... | |
class | CGAL::Distance_adapter< Key, PointPropertyMap, Base_distance > |
A class that uses a point property map to adapt a distance class to work on a key as point type. More... | |
class | CGAL::Weighted_Minkowski_distance< Traits > |
The class Weighted_Minkowski_distance provides an implementation of the concept OrthogonalDistance , with a weighted Minkowski metric on \( d\)-dimensional points defined by \( l_p(w)(r,q)= ({\Sigma_{i=1}^{i=d} \, w_i(r_i-q_i)^p})^{1/p}\) for \( 0 < p <\infty\) and defined by \( l_{\infty}(w)(r,q)=max \{w_i |r_i-q_i| \mid 1 \leq i \leq d\}\). More... | |