//STARTHEADER // $Id: Dnn2piCylinder.hh 2577 2011-09-13 15:11:38Z salam $ // // Copyright (c) 2005-2011, Matteo Cacciari, Gavin P. Salam and Gregory Soyez // //---------------------------------------------------------------------- // This file is part of FastJet. // // FastJet is free software; you can redistribute it and/or modify // it under the terms of the GNU General Public License as published by // the Free Software Foundation; either version 2 of the License, or // (at your option) any later version. // // The algorithms that underlie FastJet have required considerable // development and are described in hep-ph/0512210. If you use // FastJet as part of work towards a scientific publication, please // include a citation to the FastJet paper. // // FastJet is distributed in the hope that it will be useful, // but WITHOUT ANY WARRANTY; without even the implied warranty of // MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the // GNU General Public License for more details. // // You should have received a copy of the GNU General Public License // along with FastJet. If not, see . //---------------------------------------------------------------------- //ENDHEADER #ifndef DROP_CGAL // in case we do not have the code for CGAL #ifndef __FASTJET_DNN2PICYLINDER_HH__ #define __FASTJET_DNN2PICYLINDER_HH__ #include "fastjet/internal/DynamicNearestNeighbours.hh" #include "fastjet/internal/DnnPlane.hh" #include "fastjet/internal/numconsts.hh" FASTJET_BEGIN_NAMESPACE // defined in fastjet/internal/base.hh /// \if internal_doc /// @ingroup internal /// \class Dnn2piCylinder /// class derived from DynamicNearestNeighbours that provides an /// implementation for the surface of cylinder (using one /// DnnPlane object spanning 0--2pi). /// \endif class Dnn2piCylinder : public DynamicNearestNeighbours { public: /// empty initaliser Dnn2piCylinder() {} /// Initialiser from a set of points on an Eta-Phi plane, where /// eta can have an arbitrary ranges and phi must be in range /// 0 <= phi < 2pi; /// /// NB: this class is more efficient than the plain Dnn4piCylinder /// class, but can give wrong answers when the nearest neighbour is /// further away than 2pi (in this case a point's nearest neighbour /// becomes itself, because it is considered to be a distance 2pi /// away). For the kt-algorithm (e.g.) this is actually not a /// problem (the distance need only be accurate when it is less than /// R, assuming R<2pi [not necessarily always the case as of /// 2010-11-19, when we've removed the requirement R &, const bool & ignore_nearest_is_mirror = false, const bool & verbose = false ); /// Returns the index of the nearest neighbour of point labelled /// by ii (assumes ii is valid) int NearestNeighbourIndex(const int & ii) const ; /// Returns the distance to the nearest neighbour of point labelled /// by index ii (assumes ii is valid) double NearestNeighbourDistance(const int & ii) const ; /// Returns true iff the given index corresponds to a point that /// exists in the DNN structure (meaning that it has been added, and /// not removed in the meantime) bool Valid(const int & index) const; void RemoveAndAddPoints(const std::vector & indices_to_remove, const std::vector & points_to_add, std::vector & indices_added, std::vector & indices_of_updated_neighbours); ~Dnn2piCylinder(); private: // our extras to help us navigate, find distance, etc. const static int INEXISTENT_VERTEX=-3; bool _verbose; bool _ignore_nearest_is_mirror; /// Picture of how things will work... Copy 0--pi part of the 0--2pi /// cylinder into a region 2pi--2pi+ a bit of a Euclidean plane. Below we /// show points labelled by + that have a mirror image in this /// manner, while points labelled by * do not have a mirror image. /// /// | . | /// | . | /// | . | /// | . | /// | 2 . | /// | * . | /// | + . + | /// | 0 . 1 | /// | . | /// 0 2pi 2pi + a bit /// /// Each "true" point has its true "cylinder" index (the index that /// is known externally to this class) as well as euclidean plane /// indices (main_index and mirror index in the MirrorVertexInfo /// structure), which are private concepts of this class. /// /// In above picture our structures would hold the following info /// (the picture shows the euclidean-plane numbering) /// /// _mirror_info[cylinder_index = 0] = (0, 1) /// _mirror_info[cylinder_index = 1] = (2, INEXISTENT_VERTEX) /// /// We also need to be able to go from the euclidean plane indices /// back to the "true" cylinder index, and for this purpose we use /// the std::vector _cylinder_index_of_plane_vertex[...], which in the above example has /// the following contents /// /// _cylinder_index_of_plane_vertex[0] = 0 /// _cylinder_index_of_plane_vertex[1] = 0 /// _cylinder_index_of_plane_vertex[2] = 1 /// /// struct MirrorVertexInfo { /// index of the given point (appearing in the range 0--2pi) in the /// 0--2pi euclidean plane structure (position will coincide with /// that on the 0--2pi cylinder, but index labelling it will be /// different) int main_index; /// index of the mirror point (appearing in the range 2pi--3pi) in the /// 0--3pi euclidean plane structure int mirror_index; }; // for each "true" vertex we have reference to indices in the euclidean // plane structure std::vector _mirror_info; // for each index in the euclidean 0--2pi plane structure we want to // be able to get back to the "true" vertex index on the overall // 0--2pi cylinder structure std::vector _cylinder_index_of_plane_vertex; // NB: we define POINTERS here because the initialisation gave // us problems (things crashed!), perhaps because in practice // we were making a copy without being careful and defining // a proper copy constructor. DnnPlane * _DNN; /// given a phi value in the 0--pi range return one /// in the 2pi--3pi range; whereas if it is in the pi-2pi range then /// remap it to be inthe range (-pi)--0. inline EtaPhi _remap_phi(const EtaPhi & point) { double phi = point.second; if (phi < pi) { phi += twopi ;} else {phi -= twopi;} return EtaPhi(point.first, phi);} //---------------------------------------------------------------------- /// Actions here are similar to those in the /// Dnn3piCylinder::_RegisterCylinderPoint case, however here we do /// NOT create the mirror point -- instead we initialise the structure /// as if there were no need for the mirror point. /// /// ADDITIONALLY push the cylinder_point onto the vector plane_points. void _RegisterCylinderPoint (const EtaPhi & cylinder_point, std::vector & plane_points); /// For each plane point specified in the vector plane_indices, /// establish whether there is a need to create a mirror point /// according to the following criteria: /// /// . phi < pi /// . mirror does not already exist /// . phi < NearestNeighbourDistance /// (if this is not true then there is no way that its mirror point /// could have a nearer neighbour). /// /// If conditions all hold, then create the mirror point, insert it /// into the _DNN structure, adjusting any nearest neighbours, and /// return the list of plane points whose nearest neighbours have /// changed (this will include the new neighbours that have just been /// added) void _CreateNecessaryMirrorPoints( const std::vector & plane_indices, std::vector & updated_plane_points); }; // here follow some inline implementations of the simpler of the // functions defined above //---------------------------------------------------------------------- /// Note: one of the difficulties of the 0--2pi mapping is that /// a point may have its mirror copy as its own nearest neighbour /// (if no other point is within a distance of 2pi). This does /// not matter for the kt_algorithm with /// reasonable values of radius, but might matter for a general use /// of this algorithm -- depending on whether or not the user has /// initialised the class with instructions to ignore this problem the /// program will detect and ignore it, or crash. inline int Dnn2piCylinder::NearestNeighbourIndex(const int & current) const { int main_index = _mirror_info[current].main_index; int mirror_index = _mirror_info[current].mirror_index; int plane_index; if (mirror_index == INEXISTENT_VERTEX ) { plane_index = _DNN->NearestNeighbourIndex(main_index); } else { plane_index = ( _DNN->NearestNeighbourDistance(main_index) < _DNN->NearestNeighbourDistance(mirror_index)) ? _DNN->NearestNeighbourIndex(main_index) : _DNN->NearestNeighbourIndex(mirror_index) ; } int this_cylinder_index = _cylinder_index_of_plane_vertex[plane_index]; // either the user has acknowledged the fact that they may get the // mirror copy as the closest point, or crash if it should occur // that mirror copy is the closest point. assert(_ignore_nearest_is_mirror || this_cylinder_index != current); //if (this_cylinder_index == current) { // cerr << "WARNING point "<NearestNeighbourDistance(main_index); } else { return ( _DNN->NearestNeighbourDistance(main_index) < _DNN->NearestNeighbourDistance(mirror_index)) ? _DNN->NearestNeighbourDistance(main_index) : _DNN->NearestNeighbourDistance(mirror_index) ; } } inline bool Dnn2piCylinder::Valid(const int & index) const { return (_DNN->Valid(_mirror_info[index].main_index)); } inline Dnn2piCylinder::~Dnn2piCylinder() { delete _DNN; } FASTJET_END_NAMESPACE #endif // __FASTJET_DNN2PICYLINDER_HH__ #endif //DROP_CGAL