/*This Java program is to check whether graph is bipartite using bfs. In the mathematical field of graph theory, a bipartite graph (or bigraph) is a graph whose vertices can be divided into two disjoint sets and such that every edge connects a vertex in to one in that is, and are each independent sets. Equivalently, a bipartite graph is a graph that does not contain any odd-length cycles.*/ import java.util.InputMismatchException; import java.util.LinkedList; import java.util.Queue; import java.util.Scanner; public class BipartiteBfs { private int numberOfVertices; private Queue queue; public static final int NO_COLOR = 0; public static final int RED = 1; public static final int BLUE = 2; public BipartiteBfs(int numberOfVertices) { this.numberOfVertices = numberOfVertices; queue = new LinkedList(); } public boolean isBipartite(int adjacencyMatrix[][], int source) { int[] colored = new int[numberOfVertices + 1]; for (int vertex = 1; vertex <= numberOfVertices; vertex++) { colored[vertex] = NO_COLOR; } colored[source] = RED; queue.add(source); int element, neighbour; while (!queue.isEmpty()) { element = queue.remove(); neighbour = 1; while (neighbour <= numberOfVertices) { if (adjacencyMatrix[element][neighbour] == 1 && colored[element]== colored[neighbour]) { return false; } if (adjacencyMatrix[element][neighbour] == 1 && colored[neighbour]== NO_COLOR) { colored[neighbour] = (colored[element] == RED ) ? BLUE :RED; queue.add(neighbour); } neighbour++; } } return true; } public static void main(String... arg) { int number_of_nodes, source; Scanner scanner = null; try { System.out.println("Enter the number of nodes in the graph"); scanner = new Scanner(System.in); number_of_nodes = scanner.nextInt(); int adjacency_matrix[][] = new int[number_of_nodes + 1][number_of_nodes + 1]; System.out.println("Enter the adjacency matrix"); for (int i = 1; i <= number_of_nodes; i++) { for (int j = 1; j <= number_of_nodes; j++) { adjacency_matrix[i][j] = scanner.nextInt(); } } for (int i = 1; i <= number_of_nodes; i++) { for (int j = 1; j <= number_of_nodes; j++) { if(adjacency_matrix[i][j] == 1 && adjacency_matrix[j][i] == 0) { adjacency_matrix[j][i] = 1; } } } System.out.println("Enter the source for the graph"); source = scanner.nextInt(); BipartiteBfs bipartiteBfs = new BipartiteBfs(number_of_nodes); if (bipartiteBfs.isBipartite(adjacency_matrix, source)) { System.out.println("The given graph is bipartite"); } else { System.out.println("The given graph is not bipartite"); } } catch (InputMismatchException inputMismatch) { System.out.println("Wrong Input format"); } scanner.close(); } } /* Enter the number of nodes in the graph 4 Enter the adjacency matrix 0 1 0 1 1 0 1 0 0 1 0 1 1 0 1 0 Enter the source for the graph 1 The given graph is bipartite