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/*This Java program,to Implement Dijkstra’s algorithm using Priority Queue.Dijkstra’s algorithm is a graph search algorithm that solves the single-source shortest path problem for a graph with non-negative edge path costs, producing a shortest path tree.*/
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import java.util.HashSet;
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import java.util.InputMismatchException;
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import java.util.PriorityQueue;
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import java.util.Scanner;
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import java.util.Set;
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public class DijkstraPriorityQueue
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{
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private int distances[];
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private Set<Integer> settled;
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private PriorityQueue<Node> priorityQueue;
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private int number_of_nodes;
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private int adjacencyMatrix[][];
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public DijkstraPriorityQueue(int number_of_nodes)
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{
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this.number_of_nodes = number_of_nodes;
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distances = new int[number_of_nodes + 1];
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settled = new HashSet<Integer>();
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priorityQueue = new PriorityQueue<Node>(number_of_nodes,new Node());
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adjacencyMatrix = new int[number_of_nodes + 1][number_of_nodes + 1];
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}
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public void dijkstra_algorithm(int adjacency_matrix[][], int source)
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{
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int evaluationNode;
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for (int i = 1; i <= number_of_nodes; i++)
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for (int j = 1; j <= number_of_nodes; j++)
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adjacencyMatrix[i][j] = adjacency_matrix[i][j];
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for (int i = 1; i <= number_of_nodes; i++)
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{
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distances[i] = Integer.MAX_VALUE;
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}
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priorityQueue.add(new Node(source, 0));
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distances[source] = 0;
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while (!priorityQueue.isEmpty())
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{
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evaluationNode = getNodeWithMinimumDistanceFromPriorityQueue();
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settled.add(evaluationNode);
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evaluateNeighbours(evaluationNode);
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}
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}
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private int getNodeWithMinimumDistanceFromPriorityQueue()
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{
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int node = priorityQueue.remove();
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return node;
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}
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private void evaluateNeighbours(int evaluationNode)
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{
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int edgeDistance = -1;
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int newDistance = -1;
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for (int destinationNode = 1; destinationNode <= number_of_nodes; destinationNode++)
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{
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if (!settled.contains(destinationNode))
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{
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if (adjacencyMatrix[evaluationNode][destinationNode] != Integer.MAX_VALUE)
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{
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edgeDistance = adjacencyMatrix[evaluationNode][destinationNode];
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newDistance = distances[evaluationNode] + edgeDistance;
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if (newDistance < distances[destinationNode])
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{
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distances[destinationNode] = newDistance;
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}
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priorityQueue.add(new Node(destinationNode,distances[destinationNode]));
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}
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}
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}
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}
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public static void main(String... arg)
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{
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int adjacency_matrix[][];
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int number_of_vertices;
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int source = 0;
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Scanner scan = new Scanner(System.in);
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try
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{
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System.out.println("Enter the number of vertices");
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number_of_vertices = scan.nextInt();
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adjacency_matrix = new int[number_of_vertices + 1][number_of_vertices + 1];
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System.out.println("Enter the Weighted Matrix for the graph");
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for (int i = 1; i <= number_of_vertices; i++)
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{
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for (int j = 1; j <= number_of_vertices; j++)
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{
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adjacency_matrix[i][j] = scan.nextInt();
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if (i == j)
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{
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adjacency_matrix[i][j] = 0;
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continue;
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}
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if (adjacency_matrix[i][j] == 0)
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{
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adjacency_matrix[i][j] = Integer.MAX_VALUE;
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}
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}
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}
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System.out.println("Enter the source ");
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source = scan.nextInt();
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DijkstraPriorityQueue dijkstrasPriorityQueue = new DijkstraPriorityQueue(number_of_vertices);
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dijkstrasPriorityQueue.dijkstra_algorithm(adjacency_matrix, source);
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System.out.println("The Shorted Path to all nodes are ");
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for (int i = 1; i <= dijkstrasPriorityQueue.distances.length - 1; i++)
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{
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System.out.println(source + " to " + i + " is " + dijkstrasPriorityQueue.distances[i]);
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}
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}
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catch (InputMismatchException inputMismatch)
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{
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System.out.println("Wrong Input Format");
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}
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scan.close();
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}
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}
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class Node implements Comparator<Node>
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{
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public int node;
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public int cost;
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public Node()
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{
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}
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public Node(int node, int cost)
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{
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this.node = node;
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this.cost = cost;
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}
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@Override
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public int compare(Node node1, Node node2)
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{
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if (node1.cost < node2.cost)
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return -1;
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if (node1.cost > node2.cost)
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return 1;
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return 0;
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}
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}
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/*
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Enter the number of vertices
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5
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Enter the Weighted Matrix for the graph
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0 9 6 5 3
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0 0 0 0 0
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0 2 0 4 0
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0 0 0 0 0
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0 0 0 0 0
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Enter the source
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1
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The Shorted Path to all nodes are
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1 to 1 is 0
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1 to 2 is 8
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1 to 3 is 6
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1 to 4 is 5
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1 to 5 is 3 |