detect cycle in undirected graph
// A C++ Program to detect cycle in an undirected graph
#include<iostream>
#include <list>
#include <limits.h>
using namespace std;
// Class for an undirected graph
class Graph
{
int V; // No. of vertices
list<int> *adj; // Pointer to an array containing adjacency lists
bool isCyclicUtil(int v, bool visited[], int parent);
public:
Graph(int V); // Constructor
void addEdge(int v, int w); // to add an edge to graph
bool isCyclic(); // returns true if there is a cycle
};
Graph::Graph(int V)
{
this->V = V;
adj = new list<int>[V];
}
void Graph::addEdge(int v, int w)
{
adj[v].push_back(w); // Add w to v’s list.
adj[w].push_back(v); // Add v to w’s list.
}
// A recursive function that uses visited[] and parent to detect
// cycle in subgraph reachable from vertex v.
bool Graph::isCyclicUtil(int v, bool visited[], int parent)
{
// Mark the current node as visited
visited[v] = true;
// Recur for all the vertices adjacent to this vertex
list<int>::iterator i;
for (i = adj[v].begin(); i != adj[v].end(); ++i)
{
// If an adjacent is not visited, then recur for that adjacent
if (!visited[*i])
{
if (isCyclicUtil(*i, visited, v))
return true;
}
// If an adjacent is visited and not parent of current vertex,
// then there is a cycle.
else if (*i != parent)
return true;
}
return false;
}
// Returns true if the graph contains a cycle, else false.
bool Graph::isCyclic()
{
// Mark all the vertices as not visited and not part of recursion
// stack
bool *visited = new bool[V];
for (int i = 0; i < V; i++)
visited[i] = false;
// Call the recursive helper function to detect cycle in different
// DFS trees
for (int u = 0; u < V; u++)
if (!visited[u]) // Don't recur for u if it is already visited
if (isCyclicUtil(u, visited, -1))
return true;
return false;
}
// Driver program to test above functions
int main()
{
Graph g1(5);
g1.addEdge(1, 0);
g1.addEdge(0, 2);
g1.addEdge(2, 1);
g1.addEdge(0, 3);
g1.addEdge(3, 4);
g1.isCyclic()? cout << "Graph contains cycle\n":
cout << "Graph doesn't contain cycle\n";
Graph g2(3);
g2.addEdge(0, 1);
g2.addEdge(1, 2);
g2.isCyclic()? cout << "Graph contains cycle\n":
cout << "Graph doesn't contain cycle\n";
return 0;
}
// A C++ Program to detect cycle in a graph
#include<bits/stdc++.h>
using namespace std;
class Graph
{
int V; // No. of vertices
list<int> *adj; // Pointer to an array containing adjacency lists
bool isCyclicUtil(int v, bool visited[], bool *rs); // used by isCyclic()
public:
Graph(int V); // Constructor
void addEdge(int v, int w); // to add an edge to graph
bool isCyclic(); // returns true if there is a cycle in this graph
};
Graph::Graph(int V)
{
this->V = V;
adj = new list<int>[V];
}
void Graph::addEdge(int v, int w)
{
adj[v].push_back(w); // Add w to v’s list.
}
// This function is a variation of DFSUtil() in https://www.geeksforgeeks.org/archives/18212
bool Graph::isCyclicUtil(int v, bool visited[], bool *recStack)
{
if(visited[v] == false)
{
// Mark the current node as visited and part of recursion stack
visited[v] = true;
recStack[v] = true;
// Recur for all the vertices adjacent to this vertex
list<int>::iterator i;
for(i = adj[v].begin(); i != adj[v].end(); ++i)
{
if ( !visited[*i] && isCyclicUtil(*i, visited, recStack) )
return true;
else if (recStack[*i])
return true;
}
}
recStack[v] = false; // remove the vertex from recursion stack
return false;
}
// Returns true if the graph contains a cycle, else false.
// This function is a variation of DFS() in https://www.geeksforgeeks.org/archives/18212
bool Graph::isCyclic()
{
// Mark all the vertices as not visited and not part of recursion
// stack
bool *visited = new bool[V];
bool *recStack = new bool[V];
for(int i = 0; i < V; i++)
{
visited[i] = false;
recStack[i] = false;
}
// Call the recursive helper function to detect cycle in different
// DFS trees
for(int i = 0; i < V; i++)
if (isCyclicUtil(i, visited, recStack))
return true;
return false;
}
int main()
{
// Create a graph given in the above diagram
Graph g(4);
g.addEdge(0, 1);
g.addEdge(0, 2);
g.addEdge(1, 2);
g.addEdge(2, 0);
g.addEdge(2, 3);
g.addEdge(3, 3);
if(g.isCyclic())
cout << "Graph contains cycle";
else
cout << "Graph doesn't contain cycle";
return 0;
}
// A Java Program to detect cycle in an undirected graph
import java.io.*;
import java.util.*;
// This class represents a directed graph using adjacency list
// representation
class Graph
{
private int V; // No. of vertices
private LinkedList<Integer> adj[]; // Adjacency List Represntation
// Constructor
Graph(int v) {
V = v;
adj = new LinkedList[v];
for(int i=0; i<v; ++i)
adj[i] = new LinkedList();
}
// Function to add an edge into the graph
void addEdge(int v,int w) {
adj[v].add(w);
adj[w].add(v);
}
// A recursive function that uses visited[] and parent to detect
// cycle in subgraph reachable from vertex v.
Boolean isCyclicUtil(int v, Boolean visited[], int parent)
{
// Mark the current node as visited
visited[v] = true;
Integer i;
// Recur for all the vertices adjacent to this vertex
Iterator<Integer> it = adj[v].iterator();
while (it.hasNext())
{
i = it.next();
// If an adjacent is not visited, then recur for that
// adjacent
if (!visited[i])
{
if (isCyclicUtil(i, visited, v))
return true;
}
// If an adjacent is visited and not parent of current
// vertex, then there is a cycle.
else if (i != parent)
return true;
}
return false;
}
// Returns true if the graph contains a cycle, else false.
Boolean isCyclic()
{
// Mark all the vertices as not visited and not part of
// recursion stack
Boolean visited[] = new Boolean[V];
for (int i = 0; i < V; i++)
visited[i] = false;
// Call the recursive helper function to detect cycle in
// different DFS trees
for (int u = 0; u < V; u++)
if (!visited[u]) // Don't recur for u if already visited
if (isCyclicUtil(u, visited, -1))
return true;
return false;
}
// Driver method to test above methods
public static void main(String args[])
{
// Create a graph given in the above diagram
Graph g1 = new Graph(5);
g1.addEdge(1, 0);
g1.addEdge(0, 2);
g1.addEdge(2, 1);
g1.addEdge(0, 3);
g1.addEdge(3, 4);
if (g1.isCyclic())
System.out.println("Graph contains cycle");
else
System.out.println("Graph doesn't contains cycle");
Graph g2 = new Graph(3);
g2.addEdge(0, 1);
g2.addEdge(1, 2);
if (g2.isCyclic())
System.out.println("Graph contains cycle");
else
System.out.println("Graph doesn't contains cycle");
}
}
// This code is contributed by prashant jadaun