make_maximal_planar.cpp
来自「Boost provides free peer-reviewed portab」· C++ 代码 · 共 144 行
CPP
144 行
//=======================================================================// Copyright 2007 Aaron Windsor//// Distributed under the Boost Software License, Version 1.0. (See// accompanying file LICENSE_1_0.txt or copy at// http://www.boost.org/LICENSE_1_0.txt)//=======================================================================#include <iostream>#include <boost/graph/adjacency_list.hpp>#include <boost/graph/properties.hpp>#include <boost/graph/graph_traits.hpp>#include <boost/property_map.hpp>#include <boost/ref.hpp>#include <vector>#include <boost/graph/make_biconnected_planar.hpp>#include <boost/graph/make_maximal_planar.hpp>#include <boost/graph/planar_face_traversal.hpp>#include <boost/graph/boyer_myrvold_planar_test.hpp>// This example shows how to start with a connected planar graph // and add edges to make the graph maximal planar (triangulated.)// Any maximal planar simple graph on n vertices has 3n - 6 edges and // 2n - 4 faces, a consequence of Euler's formula.using namespace boost;// This visitor is passed to planar_face_traversal to count the // number of faces.struct face_counter : public planar_face_traversal_visitor{ face_counter() : count(0) {} void begin_face() { ++count; } int count;};int main(int argc, char** argv){ typedef adjacency_list < vecS, vecS, undirectedS, property<vertex_index_t, int>, property<edge_index_t, int> > graph; // Create the graph - a straight line graph g(10); add_edge(0,1,g); add_edge(1,2,g); add_edge(2,3,g); add_edge(3,4,g); add_edge(4,5,g); add_edge(5,6,g); add_edge(6,7,g); add_edge(7,8,g); add_edge(8,9,g); std::cout << "Since the input graph is planar with " << num_vertices(g) << " vertices," << std::endl << "The output graph should be planar with " << 3*num_vertices(g) - 6 << " edges and " << 2*num_vertices(g) - 4 << " faces." << std::endl; //Initialize the interior edge index property_map<graph, edge_index_t>::type e_index = get(edge_index, g); graph_traits<graph>::edges_size_type edge_count = 0; graph_traits<graph>::edge_iterator ei, ei_end; for(tie(ei, ei_end) = edges(g); ei != ei_end; ++ei) put(e_index, *ei, edge_count++); //Test for planarity; compute the planar embedding as a side-effect typedef std::vector< graph_traits<graph>::edge_descriptor > vec_t; std::vector<vec_t> embedding(num_vertices(g)); if (boyer_myrvold_planarity_test(boyer_myrvold_params::graph = g, boyer_myrvold_params::embedding = &embedding[0] ) ) std::cout << "Input graph is planar" << std::endl; else std::cout << "Input graph is not planar" << std::endl; make_biconnected_planar(g, &embedding[0]); // Re-initialize the edge index, since we just added a few edges edge_count = 0; for(tie(ei, ei_end) = edges(g); ei != ei_end; ++ei) put(e_index, *ei, edge_count++); //Test for planarity again; compute the planar embedding as a side-effect if (boyer_myrvold_planarity_test(boyer_myrvold_params::graph = g, boyer_myrvold_params::embedding = &embedding[0] ) ) std::cout << "After calling make_biconnected, the graph is still planar" << std::endl; else std::cout << "After calling make_biconnected, the graph is not planar" << std::endl; make_maximal_planar(g, &embedding[0]); // Re-initialize the edge index, since we just added a few edges edge_count = 0; for(tie(ei, ei_end) = edges(g); ei != ei_end; ++ei) put(e_index, *ei, edge_count++); // Test for planarity one final time; compute the planar embedding as a // side-effect std::cout << "After calling make_maximal_planar, the final graph "; if (boyer_myrvold_planarity_test(boyer_myrvold_params::graph = g, boyer_myrvold_params::embedding = &embedding[0] ) ) std::cout << "is planar." << std::endl; else std::cout << "is not planar." << std::endl; std::cout << "The final graph has " << num_edges(g) << " edges." << std::endl; face_counter count_visitor; planar_face_traversal(g, &embedding[0], count_visitor); std::cout << "The final graph has " << count_visitor.count << " faces." << std::endl; return 0;}⌨️ 快捷键说明
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