/* -*- mode: C++; indent-tabs-mode: nil; -*-
* This file is a part of LEMON, a generic C++ optimization library.
* Copyright (C) 2003-2009
* Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
* (Egervary Research Group on Combinatorial Optimization, EGRES).
* Permission to use, modify and distribute this software is granted
* provided that this copyright notice appears in all copies. For
* precise terms see the accompanying LICENSE file.
* This software is provided "AS IS" with no warranty of any kind,
* express or implied, and with no claim as to its suitability for any
#include <lemon/planarity.h>
#include <lemon/smart_graph.h>
#include <lemon/lgf_reader.h>
#include <lemon/connectivity.h>
using namespace lemon::dim2;
const std::string lgf[lgfn] = {
typedef SmartGraph Graph;
typedef PlanarEmbedding<SmartGraph> PE;
typedef PlanarDrawing<SmartGraph> PD;
typedef PlanarColoring<SmartGraph> PC;
void checkEmbedding(const Graph& graph, PE& pe) {
Graph::ArcMap<int> face(graph, -1);
for (ArcIt a(graph); a != INVALID; ++a) {
b = pe.next(graph.oppositeArc(b));
check(face[b] == face_num, "Wrong face");
check(face_num + countNodes(graph) - countConnectedComponents(graph) ==
countEdges(graph) + 1, "Euler test does not passed");
void checkKuratowski(const Graph& graph, PE& pe) {
for (NodeIt n(graph); n != INVALID; ++n) {
for (IncEdgeIt e(graph, n); e != INVALID; ++e) {
for (std::map<int, int>::iterator it = degs.begin(); it != degs.end(); ++it) {
check(it->first == 0 || it->first == 2 ||
(it->first == 3 && it->second == 6) ||
(it->first == 4 && it->second == 5),
"Wrong degree in Kuratowski graph");
check((degs[3] == 0) != (degs[4] == 0), "Wrong Kuratowski graph");
bool intersect(Point<int> e1, Point<int> e2, Point<int> f1, Point<int> f2) {
if (std::min(e1.x, e2.x) > std::max(f1.x, f2.x)) return false;
if (std::max(e1.x, e2.x) < std::min(f1.x, f2.x)) return false;
if (std::min(e1.y, e2.y) > std::max(f1.y, f2.y)) return false;
if (std::max(e1.y, e2.y) < std::min(f1.y, f2.y)) return false;
l = (e2.x - e1.x) * (f1.y - e1.y) - (e2.y - e1.y) * (f1.x - e1.x);
r = (e2.x - e1.x) * (f2.y - e1.y) - (e2.y - e1.y) * (f2.x - e1.x);
if (!((l >= 0 && r <= 0) || (l <= 0 && r >= 0))) return false;
l = (f2.x - f1.x) * (e1.y - f1.y) - (f2.y - f1.y) * (e1.x - f1.x);
r = (f2.x - f1.x) * (e2.y - f1.y) - (f2.y - f1.y) * (e2.x - f1.x);
if (!((l >= 0 && r <= 0) || (l <= 0 && r >= 0))) return false;
bool collinear(Point<int> p, Point<int> q, Point<int> r) {
v = (q.x - p.x) * (r.y - p.y) - (q.y - p.y) * (r.x - p.x);
if (v != 0) return false;
v = (q.x - p.x) * (r.x - p.x) + (q.y - p.y) * (r.y - p.y);
void checkDrawing(const Graph& graph, PD& pd) {
for (Graph::NodeIt n(graph); n != INVALID; ++n) {
for (++m; m != INVALID; ++m) {
check(pd[m] != pd[n], "Two nodes with identical coordinates");
for (Graph::EdgeIt e(graph); e != INVALID; ++e) {
for (Graph::EdgeIt f(e); f != e; ++f) {
Point<int> e1 = pd[graph.u(e)];
Point<int> e2 = pd[graph.v(e)];
Point<int> f1 = pd[graph.u(f)];
Point<int> f2 = pd[graph.v(f)];
if (graph.u(e) == graph.u(f)) {
check(!collinear(e1, e2, f2), "Wrong drawing");
} else if (graph.u(e) == graph.v(f)) {
check(!collinear(e1, e2, f1), "Wrong drawing");
} else if (graph.v(e) == graph.u(f)) {
check(!collinear(e2, e1, f2), "Wrong drawing");
} else if (graph.v(e) == graph.v(f)) {
check(!collinear(e2, e1, f1), "Wrong drawing");
check(!intersect(e1, e2, f1, f2), "Wrong drawing");
void checkColoring(const Graph& graph, PC& pc, int num) {
for (NodeIt n(graph); n != INVALID; ++n) {
check(pc.colorIndex(n) >= 0 && pc.colorIndex(n) < num,
for (EdgeIt e(graph); e != INVALID; ++e) {
check(pc.colorIndex(graph.u(e)) != pc.colorIndex(graph.v(e)),
for (int i = 0; i < lgfn; ++i) {
std::istringstream lgfs(lgf[i]);
graphReader(graph, lgfs).run();
check(simpleGraph(graph), "Test graphs must be simple");
checkEmbedding(graph, pe);
PlanarDrawing<Graph> pd(graph);
PlanarColoring<Graph> pc(graph);
pc.runFiveColoring(pe.embedding());
checkColoring(graph, pc, 5);
checkKuratowski(graph, pe);