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218 lines
7.0 KiB
Java
218 lines
7.0 KiB
Java
/*This is a java program to find the edges other than feedback arc set so that all the edges contribute to directed acyclic graph.*/
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import java.util.HashMap;
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import java.util.Iterator;
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import java.util.LinkedList;
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import java.util.List;
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import java.util.Map;
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import java.util.Scanner;
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class Graph
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{
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private Map<Integer, List<Integer>> adjacencyList;
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public Graph(int v)
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{
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adjacencyList = new HashMap<Integer, List<Integer>>();
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for (int i = 1; i <= v; i++)
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adjacencyList.put(i, new LinkedList<Integer>());
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}
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public void setEdge(int from, int to)
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{
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if (to > adjacencyList.size() || from > adjacencyList.size())
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System.out.println("The vertices does not exists");
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/*
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* List<Integer> sls = adjacencyList.get(to);
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* sls.add(from);
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*/
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List<Integer> dls = adjacencyList.get(from);
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dls.add(to);
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}
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public List<Integer> getEdge(int to)
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{
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/*
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* if (to > adjacencyList.size())
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* {
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* System.out.println("The vertices does not exists");
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* return null;
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* }
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*/
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return adjacencyList.get(to);
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}
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public Graph checkDAG()
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{
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Integer count = 0;
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Iterator<Integer> iteratorI = this.adjacencyList.keySet().iterator();
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Integer size = this.adjacencyList.size() - 1;
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System.out.println("Minimal set of edges: ");
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while (iteratorI.hasNext())
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{
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Integer i = iteratorI.next();
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List<Integer> adjList = this.adjacencyList.get(i);
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if (count == size)
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{
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return this;
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}
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if (adjList.size() == 0)
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{
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count++;
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Iterator<Integer> iteratorJ = this.adjacencyList.keySet()
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.iterator();
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while (iteratorJ.hasNext())
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{
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Integer j = iteratorJ.next();
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List<Integer> li = this.adjacencyList.get(j);
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if (li.contains(i))
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{
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li.remove(i);
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System.out.println(i + " -> " + j);
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}
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}
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this.adjacencyList.remove(i);
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iteratorI = this.adjacencyList.keySet().iterator();
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}
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}
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return this;
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}
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public Map<Integer, List<Integer>> getFeedbackArcSet(int v)
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{
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int[] visited = new int[v + 1];
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Iterator<Integer> iterator = this.adjacencyList.keySet().iterator();
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Map<Integer, List<Integer>> l = new HashMap<Integer, List<Integer>>();
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while (iterator.hasNext())
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{
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Integer i = iterator.next();
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List<Integer> list = this.adjacencyList.get(i);
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visited[i] = 1;
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if (list.size() != 0)
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{
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for (int j = 0; j < list.size(); j++)
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{
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if (visited[list.get(j)] == 1)
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{
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l.put(i, new LinkedList<Integer>());
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l.get(i).add(j);
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}
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else
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{
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visited[list.get(j)] = 1;
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}
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}
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}
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}
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return l;
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}
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public void printAllEdges(Graph copyG, int v)
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{
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Map<Integer, List<Integer>> edges = this.getFeedbackArcSet(v);
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Iterator<Integer> iterator = copyG.adjacencyList.keySet().iterator();
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while (iterator.hasNext())
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{
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Integer i = iterator.next();
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List<Integer> edgeList = this.getEdge(i);
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if (edgeList.size() != 0)
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{
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for (int j = 0; j < edgeList.size(); j++)
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{
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if (edges.containsKey(i) && edges.get(i).contains(j))
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continue;
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else
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{
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System.out.print(i + " -> " + edgeList.get(j));
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}
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}
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System.out.println();
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}
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}
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}
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public void printGraph()
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{
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System.out.println("The Graph is: ");
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Iterator<Integer> iterator = this.adjacencyList.keySet().iterator();
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while (iterator.hasNext())
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{
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Integer i = iterator.next();
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List<Integer> edgeList = this.getEdge(i);
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if (edgeList.size() != 0)
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{
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System.out.print(i);
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for (int j = 0; j < edgeList.size(); j++)
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{
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System.out.print(" -> " + edgeList.get(j));
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}
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System.out.println();
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}
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}
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}
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}
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public class MinimalSetofEdgesforDAG
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{
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public static void main(String args[])
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{
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int v, e, count = 1, to, from;
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Scanner sc = new Scanner(System.in);
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Graph glist;
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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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v = sc.nextInt();
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System.out.println("Enter the number of edges: ");
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e = sc.nextInt();
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glist = new Graph(v);
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System.out.println("Enter the edges in the graph : <from> <to>");
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while (count <= e)
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{
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to = sc.nextInt();
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from = sc.nextInt();
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glist.setEdge(to, from);
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count++;
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}
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Graph copyofGlist = new Graph(v);
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copyofGlist = glist;
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glist.printGraph();
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Graph modified = glist.checkDAG();
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modified.printAllEdges(copyofGlist, v);
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}
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catch (Exception E)
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{
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System.out
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.println("You are trying to access empty adjacency list of a node.");
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}
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sc.close();
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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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6
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Enter the number of edges:
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7
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Enter the edges in the graph : <from> <to>
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1 2
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2 3
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2 4
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4 5
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5 6
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6 3
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6 4
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The Graph is:
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1 -> 2
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2 -> 3 -> 4
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4 -> 5
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5 -> 6
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6 -> 3 -> 4
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Minimal set of edges:
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3 -> 2
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3 -> 6
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1 -> 2
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2 -> 4
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4 -> 5
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5 -> 6 |