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Diffstat (limited to 'src/Alpha_complex/include/gudhi')
-rw-r--r-- | src/Alpha_complex/include/gudhi/Alpha_complex_3d.h | 596 | ||||
-rw-r--r-- | src/Alpha_complex/include/gudhi/Alpha_complex_options.h | 45 |
2 files changed, 641 insertions, 0 deletions
diff --git a/src/Alpha_complex/include/gudhi/Alpha_complex_3d.h b/src/Alpha_complex/include/gudhi/Alpha_complex_3d.h new file mode 100644 index 00000000..00a47d5c --- /dev/null +++ b/src/Alpha_complex/include/gudhi/Alpha_complex_3d.h @@ -0,0 +1,596 @@ +/* This file is part of the Gudhi Library. The Gudhi library + * (Geometric Understanding in Higher Dimensions) is a generic C++ + * library for computational topology. + * + * Author(s): Vincent Rouvreau + * + * Copyright (C) 2018 Inria + * + * This program 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 3 of the License, or + * (at your option) any later version. + * + * This program 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 this program. If not, see <http://www.gnu.org/licenses/>. + */ + +#ifndef ALPHA_COMPLEX_3D_H_ +#define ALPHA_COMPLEX_3D_H_ + +#include <boost/version.hpp> +#include <boost/variant.hpp> + +#if BOOST_VERSION >= 105400 +#include <boost/container/static_vector.hpp> +#endif + +#include <gudhi/Debug_utils.h> +#include <gudhi/Alpha_complex_options.h> + +#include <CGAL/Exact_predicates_inexact_constructions_kernel.h> +#include <CGAL/Exact_predicates_exact_constructions_kernel.h> +#include <CGAL/Delaunay_triangulation_3.h> +#include <CGAL/Periodic_3_Delaunay_triangulation_traits_3.h> +#include <CGAL/Periodic_3_Delaunay_triangulation_3.h> +#include <CGAL/Periodic_3_regular_triangulation_traits_3.h> +#include <CGAL/Periodic_3_regular_triangulation_3.h> +#include <CGAL/Regular_triangulation_3.h> +#include <CGAL/Alpha_shape_3.h> +#include <CGAL/Alpha_shape_cell_base_3.h> +#include <CGAL/Alpha_shape_vertex_base_3.h> + +#include <CGAL/Object.h> +#include <CGAL/tuple.h> +#include <CGAL/iterator.h> +#include <CGAL/version.h> + +#include <iostream> +#include <vector> +#include <unordered_map> +#include <stdexcept> +#include <cstddef> +#include <memory> // for std::unique_ptr +#include <type_traits> // for std::conditional and std::enable_if + +#if CGAL_VERSION_NR < 1041101000 +// Make compilation fail - required for external projects - https://gitlab.inria.fr/GUDHI/gudhi-devel/issues/10 +static_assert(false, "Alpha_complex_3d is only available for CGAL >= 4.11"); +#endif + +namespace Gudhi { + +namespace alpha_complex { + +#ifdef GUDHI_CAN_USE_CXX11_THREAD_LOCAL +thread_local +#endif // GUDHI_CAN_USE_CXX11_THREAD_LOCAL + double RELATIVE_PRECISION_OF_TO_DOUBLE = 0.00001; + +// Value_from_iterator returns the filtration value from an iterator on alpha shapes values +// +// FAST SAFE EXACT +// not weighted and *iterator Specific case due to CGAL CGAL::to_double(iterator->exact()) +// not periodic issue # 3153 +// +// otherwise *iterator CGAL::to_double(*iterator) CGAL::to_double(iterator->exact()) + +template <complexity Complexity, bool Weighted_or_periodic> +struct Value_from_iterator { + template <typename Iterator> + static double perform(Iterator it) { + // Default behaviour is to return the value pointed by the given iterator + return *it; + } +}; + +template <> +struct Value_from_iterator<complexity::SAFE, true> { + template <typename Iterator> + static double perform(Iterator it) { + // In SAFE mode, we are with Epick with EXACT value set to CGAL::Tag_true. + return CGAL::to_double(*it); + } +}; + +template <> +struct Value_from_iterator<complexity::SAFE, false> { + template <typename Iterator> + static double perform(Iterator it) { + // In SAFE mode, we are with Epeck with EXACT value set to CGAL::Tag_true. + // Specific case due to CGAL issue https://github.com/CGAL/cgal/issues/3153 + auto approx = it->approx(); + double r; + if (CGAL::fit_in_double(approx, r)) return r; + + // If it's precise enough, then OK. + if (CGAL::has_smaller_relative_precision(approx, RELATIVE_PRECISION_OF_TO_DOUBLE)) return CGAL::to_double(approx); + + it->exact(); + return CGAL::to_double(it->approx()); + } +}; + +template <> +struct Value_from_iterator<complexity::EXACT, true> { + template <typename Iterator> + static double perform(Iterator it) { + // In EXACT mode, we are with Epeck or Epick with EXACT value set to CGAL::Tag_true. + return CGAL::to_double(it->exact()); + } +}; + +template <> +struct Value_from_iterator<complexity::EXACT, false> { + template <typename Iterator> + static double perform(Iterator it) { + // In EXACT mode, we are with Epeck or Epick with EXACT value set to CGAL::Tag_true. + return CGAL::to_double(it->exact()); + } +}; + +/** + * \class Alpha_complex_3d + * \brief Alpha complex data structure for 3d specific case. + * + * \ingroup alpha_complex + * + * \details + * The data structure is constructing a <a href="https://doc.cgal.org/latest/Alpha_shapes_3/index.html">CGAL 3D Alpha + * Shapes</a> from a range of points (can be read from an OFF file, cf. Points_off_reader). + * Duplicate points are inserted once in the Alpha_complex. This is the reason why the vertices may be not contiguous. + * + * \tparam Complexity shall be `Gudhi::alpha_complex::complexity`. Default value is + * `Gudhi::alpha_complex::complexity::FAST`. + * + * \tparam Weighted Boolean used to set/unset the weighted version of Alpha_complex_3d. Default value is false. + * + * \tparam Periodic Boolean used to set/unset the periodic version of Alpha_complex_3d. Default value is false. + * + * For the weighted version, weights values are explained on CGAL + * <a href="https://doc.cgal.org/latest/Alpha_shapes_3/index.html#title0">Alpha shapes 3d</a> and + * <a href="https://doc.cgal.org/latest/Triangulation_3/index.html#Triangulation3secclassRegulartriangulation">Regular + * triangulation</a> documentation. + * + * For the periodic version, refer to the + * <a href="https://doc.cgal.org/latest/Periodic_3_triangulation_3/index.html">CGAL’s 3D Periodic Triangulations User + * Manual </a> for more details. + * The periodicity is defined by an iso-oriented cuboid with diagonal opposite vertices (x_min, y_min, z_min) and + * (x_max, y_max, z_max). + * + * Please refer to \ref alpha_complex for examples. + * + * \remark When Alpha_complex_3d is constructed with an infinite value of alpha (default value), the complex is a + * 3d Delaunay complex. + * + */ +template <complexity Complexity = complexity::FAST, bool Weighted = false, bool Periodic = false> +class Alpha_complex_3d { + // Epick = Exact_predicates_inexact_constructions_kernel + // Epeck = Exact_predicates_exact_constructions_kernel + // ExactAlphaComparisonTag = exact version of CGAL Alpha_shape_3 and of its objects (Alpha_shape_vertex_base_3 and + // Alpha_shape_cell_base_3). Not available if weighted or periodic. + // Can be CGAL::Tag_false or CGAL::Tag_true + // cf. https://doc.cgal.org/latest/Alpha_shapes_3/classCGAL_1_1Alpha__shape__3.html + // + // + // FAST SAFE EXACT + // not weighted and Epick + CGAL::Tag_false Epick + CGAL::Tag_true Epick + CGAL::Tag_true + // not periodic + // + // otherwise Epick + CGAL::Tag_false Epeck Epeck + using Predicates = typename std::conditional<((!Weighted && !Periodic) || (Complexity == complexity::FAST)), + CGAL::Exact_predicates_inexact_constructions_kernel, + CGAL::Exact_predicates_exact_constructions_kernel>::type; + + // The other way to do a conditional type. Here there are 3 possibilities + template <typename Predicates, bool Weighted_version, bool Periodic_version> + struct Kernel_3 {}; + + template <typename Predicates> + struct Kernel_3<Predicates, false, false> { + using Kernel = Predicates; + }; + template <typename Predicates> + struct Kernel_3<Predicates, true, false> { + using Kernel = Predicates; + }; + template <typename Predicates> + struct Kernel_3<Predicates, false, true> { + using Kernel = CGAL::Periodic_3_Delaunay_triangulation_traits_3<Predicates>; + }; + template <typename Predicates> + struct Kernel_3<Predicates, true, true> { + using Kernel = CGAL::Periodic_3_regular_triangulation_traits_3<Predicates>; + }; + + using Kernel = typename Kernel_3<Predicates, Weighted, Periodic>::Kernel; + + using Exact_tag = typename std::conditional<(Complexity == complexity::FAST), CGAL::Tag_false, CGAL::Tag_true>::type; + + using TdsVb = typename std::conditional<Periodic, CGAL::Periodic_3_triangulation_ds_vertex_base_3<>, + CGAL::Triangulation_ds_vertex_base_3<>>::type; + + using Tvb = typename std::conditional<Weighted, CGAL::Regular_triangulation_vertex_base_3<Kernel, TdsVb>, + CGAL::Triangulation_vertex_base_3<Kernel, TdsVb>>::type; + + using Vb = CGAL::Alpha_shape_vertex_base_3<Kernel, Tvb, Exact_tag>; + + using TdsCb = typename std::conditional<Periodic, CGAL::Periodic_3_triangulation_ds_cell_base_3<>, + CGAL::Triangulation_ds_cell_base_3<>>::type; + + using Tcb = typename std::conditional<Weighted, CGAL::Regular_triangulation_cell_base_3<Kernel, TdsCb>, + CGAL::Triangulation_cell_base_3<Kernel, TdsCb>>::type; + + using Cb = CGAL::Alpha_shape_cell_base_3<Kernel, Tcb, Exact_tag>; + using Tds = CGAL::Triangulation_data_structure_3<Vb, Cb>; + + // The other way to do a conditional type. Here there 4 possibilities, cannot use std::conditional + template <typename Kernel, typename Tds, bool Weighted_version, bool Periodic_version> + struct Triangulation {}; + + template <typename Kernel, typename Tds> + struct Triangulation<Kernel, Tds, false, false> { + using Triangulation_3 = CGAL::Delaunay_triangulation_3<Kernel, Tds>; + }; + template <typename Kernel, typename Tds> + struct Triangulation<Kernel, Tds, true, false> { + using Triangulation_3 = CGAL::Regular_triangulation_3<Kernel, Tds>; + }; + template <typename Kernel, typename Tds> + struct Triangulation<Kernel, Tds, false, true> { + using Triangulation_3 = CGAL::Periodic_3_Delaunay_triangulation_3<Kernel, Tds>; + }; + template <typename Kernel, typename Tds> + struct Triangulation<Kernel, Tds, true, true> { + using Triangulation_3 = CGAL::Periodic_3_regular_triangulation_3<Kernel, Tds>; + }; + + public: + using Triangulation_3 = typename Triangulation<Kernel, Tds, Weighted, Periodic>::Triangulation_3; + + using Alpha_shape_3 = CGAL::Alpha_shape_3<Triangulation_3, Exact_tag>; + + using Point_3 = typename Kernel::Point_3; + + private: + using Alpha_value_type = typename Alpha_shape_3::FT; + using Dispatch = + CGAL::Dispatch_output_iterator<CGAL::cpp11::tuple<CGAL::Object, Alpha_value_type>, + CGAL::cpp11::tuple<std::back_insert_iterator<std::vector<CGAL::Object>>, + std::back_insert_iterator<std::vector<Alpha_value_type>>>>; + + using Cell_handle = typename Alpha_shape_3::Cell_handle; + using Facet = typename Alpha_shape_3::Facet; + using Edge = typename Alpha_shape_3::Edge; + using Alpha_vertex_handle = typename Alpha_shape_3::Vertex_handle; +#if BOOST_VERSION >= 105400 + using Vertex_list = boost::container::static_vector<Alpha_vertex_handle, 4>; +#else + using Vertex_list = std::vector<Alpha_vertex_handle>; +#endif + + public: + /** \brief Alpha_complex constructor from a list of points. + * + * @param[in] points Range of points to triangulate. Points must be in `Alpha_complex_3d::Point_3` or + * `Alpha_complex_3d::Triangulation_3::Weighted_point`. + * + * @pre Available if Alpha_complex_3d is not Periodic. + * + * The type InputPointRange must be a range for which std::begin and std::end return input iterators on a + * `Alpha_complex_3d::Point_3` or a `Alpha_complex_3d::Triangulation_3::Weighted_point`. + */ + template <typename InputPointRange> + Alpha_complex_3d(const InputPointRange& points) { + static_assert(!Periodic, "This constructor is not available for periodic versions of Alpha_complex_3d"); + + alpha_shape_3_ptr_ = std::unique_ptr<Alpha_shape_3>( + new Alpha_shape_3(std::begin(points), std::end(points), 0, Alpha_shape_3::GENERAL)); + } + + /** \brief Alpha_complex constructor from a list of points and associated weights. + * + * @exception std::invalid_argument In debug mode, if points and weights do not have the same size. + * + * @param[in] points Range of points to triangulate. Points must be in `Alpha_complex_3d::Point_3` + * @param[in] weights Range of weights on points. Weights shall be in `Alpha_complex_3d::Alpha_shape_3::FT` + * + * @pre Available if Alpha_complex_3d is Weighted and not Periodic. + * + * The type InputPointRange must be a range for which std::begin and + * std::end return input iterators on a `Alpha_complex_3d::Point_3`. + * The type WeightRange must be a range for which std::begin and + * std::end return an input iterator on a `Alpha_complex_3d::Alpha_shape_3::FT`. + */ + template <typename InputPointRange, typename WeightRange> + Alpha_complex_3d(const InputPointRange& points, WeightRange weights) { + static_assert(Weighted, "This constructor is not available for non-weighted versions of Alpha_complex_3d"); + static_assert(!Periodic, "This constructor is not available for periodic versions of Alpha_complex_3d"); + GUDHI_CHECK((weights.size() == points.size()), + std::invalid_argument("Points number in range different from weights range number")); + + using Weighted_point_3 = typename Triangulation_3::Weighted_point; + std::vector<Weighted_point_3> weighted_points_3; + + std::size_t index = 0; + weighted_points_3.reserve(points.size()); + while ((index < weights.size()) && (index < points.size())) { + weighted_points_3.push_back(Weighted_point_3(points[index], weights[index])); + index++; + } + + alpha_shape_3_ptr_ = std::unique_ptr<Alpha_shape_3>( + new Alpha_shape_3(std::begin(weighted_points_3), std::end(weighted_points_3), 0, Alpha_shape_3::GENERAL)); + } + + /** \brief Alpha_complex constructor from a list of points and an iso-cuboid coordinates. + * + * @exception std::invalid_argument In debug mode, if the size of the cuboid in every directions is not the same. + * + * @param[in] points Range of points to triangulate. Points must be in `Alpha_complex_3d::Point_3` or + * `Alpha_complex_3d::Triangulation_3::Weighted_point`. + * @param[in] x_min Iso-oriented cuboid x_min. + * @param[in] y_min Iso-oriented cuboid y_min. + * @param[in] z_min Iso-oriented cuboid z_min. + * @param[in] x_max Iso-oriented cuboid x_max. + * @param[in] y_max Iso-oriented cuboid y_max. + * @param[in] z_max Iso-oriented cuboid z_max. + * + * @pre Available if Alpha_complex_3d is Periodic. + * + * The type InputPointRange must be a range for which std::begin and std::end return input iterators on a + * `Alpha_complex_3d::Point_3` or a `Alpha_complex_3d::Triangulation_3::Weighted_point`. + * + * @note In weighted version, please check weights are greater than zero, and lower than 1/64*cuboid length + * squared. + */ + template <typename InputPointRange> + Alpha_complex_3d(const InputPointRange& points, Alpha_value_type x_min, Alpha_value_type y_min, + Alpha_value_type z_min, Alpha_value_type x_max, Alpha_value_type y_max, Alpha_value_type z_max) { + static_assert(Periodic, "This constructor is not available for non-periodic versions of Alpha_complex_3d"); + // Checking if the cuboid is the same in x,y and z direction. If not, CGAL will not process it. + GUDHI_CHECK( + (x_max - x_min == y_max - y_min) && (x_max - x_min == z_max - z_min) && (z_max - z_min == y_max - y_min), + std::invalid_argument("The size of the cuboid in every directions is not the same.")); + + // Define the periodic cube + Triangulation_3 pdt(typename Kernel::Iso_cuboid_3(x_min, y_min, z_min, x_max, y_max, z_max)); + // Heuristic for inserting large point sets (if pts is reasonably large) + pdt.insert(std::begin(points), std::end(points), true); + // As pdt won't be modified anymore switch to 1-sheeted cover if possible + if (!pdt.is_triangulation_in_1_sheet()) { + throw std::invalid_argument("Unable to construct a triangulation within a single periodic domain."); + } + pdt.convert_to_1_sheeted_covering(); + + // alpha shape construction from points. CGAL has a strange behavior in REGULARIZED mode. This is the default mode + // Maybe need to set it to GENERAL mode + alpha_shape_3_ptr_ = std::unique_ptr<Alpha_shape_3>(new Alpha_shape_3(pdt, 0, Alpha_shape_3::GENERAL)); + } + + /** \brief Alpha_complex constructor from a list of points, associated weights and an iso-cuboid coordinates. + * + * @exception std::invalid_argument In debug mode, if points and weights do not have the same size. + * @exception std::invalid_argument In debug mode, if the size of the cuboid in every directions is not the same. + * @exception std::invalid_argument In debug mode, if a weight is negative, zero, or greater than 1/64*cuboid length + * squared. + * + * @param[in] points Range of points to triangulate. Points must be in `Alpha_complex_3d::Point_3` + * @param[in] weights Range of weights on points. Weights shall be in `Alpha_complex_3d::Alpha_shape_3::FT` + * @param[in] x_min Iso-oriented cuboid x_min. + * @param[in] y_min Iso-oriented cuboid y_min. + * @param[in] z_min Iso-oriented cuboid z_min. + * @param[in] x_max Iso-oriented cuboid x_max. + * @param[in] y_max Iso-oriented cuboid y_max. + * @param[in] z_max Iso-oriented cuboid z_max. + * + * @pre Available if Alpha_complex_3d is Weighted and Periodic. + * + * The type InputPointRange must be a range for which std::begin and + * std::end return input iterators on a `Alpha_complex_3d::Point_3`. + * The type WeightRange must be a range for which std::begin and + * std::end return an input iterator on a `Alpha_complex_3d::Alpha_shape_3::FT`. + * The type of x_min, y_min, z_min, x_max, y_max and z_max is `Alpha_complex_3d::Alpha_shape_3::FT`. + */ + template <typename InputPointRange, typename WeightRange> + Alpha_complex_3d(const InputPointRange& points, WeightRange weights, Alpha_value_type x_min, Alpha_value_type y_min, + Alpha_value_type z_min, Alpha_value_type x_max, Alpha_value_type y_max, Alpha_value_type z_max) { + static_assert(Weighted, "This constructor is not available for non-weighted versions of Alpha_complex_3d"); + static_assert(Periodic, "This constructor is not available for non-periodic versions of Alpha_complex_3d"); + GUDHI_CHECK((weights.size() == points.size()), + std::invalid_argument("Points number in range different from weights range number")); + // Checking if the cuboid is the same in x,y and z direction. If not, CGAL will not process it. + GUDHI_CHECK( + (x_max - x_min == y_max - y_min) && (x_max - x_min == z_max - z_min) && (z_max - z_min == y_max - y_min), + std::invalid_argument("The size of the cuboid in every directions is not the same.")); + + using Weighted_point_3 = typename Triangulation_3::Weighted_point; + std::vector<Weighted_point_3> weighted_points_3; + + std::size_t index = 0; + weighted_points_3.reserve(points.size()); + +#ifdef GUDHI_DEBUG + // Defined in GUDHI_DEBUG to avoid unused variable warning for GUDHI_CHECK + Alpha_value_type maximal_possible_weight = 0.015625 * (x_max - x_min) * (x_max - x_min); +#endif + + while ((index < weights.size()) && (index < points.size())) { + GUDHI_CHECK((weights[index] < maximal_possible_weight) && (weights[index] >= 0), + std::invalid_argument("Invalid weight at index " + std::to_string(index + 1) + + ". Must be positive and less than maximal possible weight = 1/64*cuboid length " + "squared, which is not an acceptable input.")); + weighted_points_3.push_back(Weighted_point_3(points[index], weights[index])); + index++; + } + + // Define the periodic cube + Triangulation_3 pdt(typename Kernel::Iso_cuboid_3(x_min, y_min, z_min, x_max, y_max, z_max)); + // Heuristic for inserting large point sets (if pts is reasonably large) + pdt.insert(std::begin(weighted_points_3), std::end(weighted_points_3), true); + // As pdt won't be modified anymore switch to 1-sheeted cover if possible + if (!pdt.is_triangulation_in_1_sheet()) { + throw std::invalid_argument("Unable to construct a triangulation within a single periodic domain."); + } + pdt.convert_to_1_sheeted_covering(); + + // alpha shape construction from points. CGAL has a strange behavior in REGULARIZED mode. This is the default mode + // Maybe need to set it to GENERAL mode + alpha_shape_3_ptr_ = std::unique_ptr<Alpha_shape_3>(new Alpha_shape_3(pdt, 0, Alpha_shape_3::GENERAL)); + } + + /** \brief Inserts all Delaunay triangulation into the simplicial complex. + * It also computes the filtration values accordingly to the \ref createcomplexalgorithm + * + * \tparam SimplicialComplexForAlpha3d must meet `SimplicialComplexForAlpha3d` concept. + * + * @param[in] complex SimplicialComplexForAlpha3d to be created. + * @param[in] max_alpha_square maximum for alpha square value. Default value is +\f$\infty\f$. + * + * @return true if creation succeeds, false otherwise. + * + * @pre The simplicial complex must be empty (no vertices) + * + * Initialization can be launched once. + * + */ + template <typename SimplicialComplexForAlpha3d, + typename Filtration_value = typename SimplicialComplexForAlpha3d::Filtration_value> + bool create_complex(SimplicialComplexForAlpha3d& complex, + Filtration_value max_alpha_square = std::numeric_limits<Filtration_value>::infinity()) { + if (complex.num_vertices() > 0) { + std::cerr << "Alpha_complex_3d create_complex - complex is not empty\n"; + return false; // ----- >> + } + + // using Filtration_value = typename SimplicialComplexForAlpha3d::Filtration_value; + using Complex_vertex_handle = typename SimplicialComplexForAlpha3d::Vertex_handle; + using Alpha_shape_simplex_tree_map = std::unordered_map<Alpha_vertex_handle, Complex_vertex_handle>; + using Simplex_tree_vector_vertex = std::vector<Complex_vertex_handle>; + +#ifdef DEBUG_TRACES + std::size_t count_vertices = 0; + std::size_t count_edges = 0; + std::size_t count_facets = 0; + std::size_t count_cells = 0; +#endif // DEBUG_TRACES + std::vector<CGAL::Object> objects; + std::vector<Alpha_value_type> alpha_values; + + Dispatch dispatcher = CGAL::dispatch_output<CGAL::Object, Alpha_value_type>(std::back_inserter(objects), + std::back_inserter(alpha_values)); + + alpha_shape_3_ptr_->filtration_with_alpha_values(dispatcher); +#ifdef DEBUG_TRACES + std::cout << "filtration_with_alpha_values returns : " << objects.size() << " objects" << std::endl; +#endif // DEBUG_TRACES + + Alpha_shape_simplex_tree_map map_cgal_simplex_tree; + using Alpha_value_iterator = typename std::vector<Alpha_value_type>::const_iterator; + Alpha_value_iterator alpha_value_iterator = alpha_values.begin(); + for (auto object_iterator : objects) { + Vertex_list vertex_list; + + // Retrieve Alpha shape vertex list from object + if (const Cell_handle* cell = CGAL::object_cast<Cell_handle>(&object_iterator)) { + for (auto i = 0; i < 4; i++) { +#ifdef DEBUG_TRACES + std::cout << "from cell[" << i << "]=" << (*cell)->vertex(i)->point() << std::endl; +#endif // DEBUG_TRACES + vertex_list.push_back((*cell)->vertex(i)); + } +#ifdef DEBUG_TRACES + count_cells++; +#endif // DEBUG_TRACES + } else if (const Facet* facet = CGAL::object_cast<Facet>(&object_iterator)) { + for (auto i = 0; i < 4; i++) { + if ((*facet).second != i) { +#ifdef DEBUG_TRACES + std::cout << "from facet=[" << i << "]" << (*facet).first->vertex(i)->point() << std::endl; +#endif // DEBUG_TRACES + vertex_list.push_back((*facet).first->vertex(i)); + } + } +#ifdef DEBUG_TRACES + count_facets++; +#endif // DEBUG_TRACES + } else if (const Edge* edge = CGAL::object_cast<Edge>(&object_iterator)) { + for (auto i : {(*edge).second, (*edge).third}) { +#ifdef DEBUG_TRACES + std::cout << "from edge[" << i << "]=" << (*edge).first->vertex(i)->point() << std::endl; +#endif // DEBUG_TRACES + vertex_list.push_back((*edge).first->vertex(i)); + } +#ifdef DEBUG_TRACES + count_edges++; +#endif // DEBUG_TRACES + } else if (const Alpha_vertex_handle* vertex = CGAL::object_cast<Alpha_vertex_handle>(&object_iterator)) { +#ifdef DEBUG_TRACES + count_vertices++; + std::cout << "from vertex=" << (*vertex)->point() << std::endl; +#endif // DEBUG_TRACES + vertex_list.push_back((*vertex)); + } + // Construction of the vector of simplex_tree vertex from list of alpha_shapes vertex + Simplex_tree_vector_vertex the_simplex; + for (auto the_alpha_shape_vertex : vertex_list) { + auto the_map_iterator = map_cgal_simplex_tree.find(the_alpha_shape_vertex); + if (the_map_iterator == map_cgal_simplex_tree.end()) { + // alpha shape not found + Complex_vertex_handle vertex = map_cgal_simplex_tree.size(); +#ifdef DEBUG_TRACES + std::cout << "vertex [" << the_alpha_shape_vertex->point() << "] not found - insert " << vertex << std::endl; +#endif // DEBUG_TRACES + the_simplex.push_back(vertex); + map_cgal_simplex_tree.emplace(the_alpha_shape_vertex, vertex); + } else { + // alpha shape found + Complex_vertex_handle vertex = the_map_iterator->second; +#ifdef DEBUG_TRACES + std::cout << "vertex [" << the_alpha_shape_vertex->point() << "] found in " << vertex << std::endl; +#endif // DEBUG_TRACES + the_simplex.push_back(vertex); + } + } + // Construction of the simplex_tree + Filtration_value filtr = Value_from_iterator<Complexity, (Weighted || Periodic)>::perform(alpha_value_iterator); + +#ifdef DEBUG_TRACES + std::cout << "filtration = " << filtr << std::endl; +#endif // DEBUG_TRACES + complex.insert_simplex(the_simplex, static_cast<Filtration_value>(filtr)); + GUDHI_CHECK(alpha_value_iterator != alpha_values.end(), "CGAL provided more simplices than values"); + ++alpha_value_iterator; + } + +#ifdef DEBUG_TRACES + std::cout << "vertices \t" << count_vertices << std::endl; + std::cout << "edges \t\t" << count_edges << std::endl; + std::cout << "facets \t\t" << count_facets << std::endl; + std::cout << "cells \t\t" << count_cells << std::endl; +#endif // DEBUG_TRACES + // -------------------------------------------------------------------------------------------- + // As Alpha value is an approximation, we have to make filtration non decreasing while increasing the dimension + complex.make_filtration_non_decreasing(); + // Remove all simplices that have a filtration value greater than max_alpha_square + complex.prune_above_filtration(max_alpha_square); + // -------------------------------------------------------------------------------------------- + return true; + } + + private: + // use of a unique_ptr on cgal Alpha_shape_3, as copy and default constructor is not available - no need to be freed + std::unique_ptr<Alpha_shape_3> alpha_shape_3_ptr_; +}; + +} // namespace alpha_complex + +} // namespace Gudhi + +#endif // ALPHA_COMPLEX_3D_H_ diff --git a/src/Alpha_complex/include/gudhi/Alpha_complex_options.h b/src/Alpha_complex/include/gudhi/Alpha_complex_options.h new file mode 100644 index 00000000..7a555fa1 --- /dev/null +++ b/src/Alpha_complex/include/gudhi/Alpha_complex_options.h @@ -0,0 +1,45 @@ +/* This file is part of the Gudhi Library. The Gudhi library + * (Geometric Understanding in Higher Dimensions) is a generic C++ + * library for computational topology. + * + * Author(s): Vincent Rouvreau + * + * Copyright (C) 2018 Inria + * + * This program 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 3 of the License, or + * (at your option) any later version. + * + * This program 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 this program. If not, see <http://www.gnu.org/licenses/>. + */ + +#ifndef ALPHA_COMPLEX_OPTIONS_H_ +#define ALPHA_COMPLEX_OPTIONS_H_ + +namespace Gudhi { + +namespace alpha_complex { + +/** + * \brief Alpha complex complexity template parameter possible values. + * + * \ingroup alpha_complex + */ +enum class complexity : char { + FAST = 'f', ///< Fast version. + SAFE = 's', ///< Safe version. + EXACT = 'e', ///< Exact version. +}; + +} // namespace alpha_complex + +} // namespace Gudhi + +#endif // ALPHA_COMPLEX_OPTIONS_H_ |