# implementing kruskals algorithm in java

im able to run this code for some input. but in some cases i get the wrong spanning tree. for eg: if i give the input as follows while executing the program :

Enter no.of vertices: 5 Enter no.of edges: 8

``````    Enter the vertices and the weight of edge 1:
1
3
10

Enter the vertices and the weight of edge 2:
1
4
100
Enter the vertices and the weight of edge 3:
3
5
64
Enter the vertices and the weight of edge 4:
1
2
13
Enter the vertices and the weight of edge 5:
3
2
20
Enter the vertices and the weight of edge 6:
2
5
5
Enter the vertices and the weight of edge 7:
4
3
80
Enter the vertices and the weight of edge 8:
4
5
40
MINIMUM SPANNING TREE :
2-5
1-3
4-5
MINIMUM COST = 55

expected o/p :

MINIMUM SPANNING TREE :
2-5
1-3
1-2
4-5
MINIMUM COST = 68
``````

kindly help me out to rectify my mistake... pls tel me wat changes shud i make in the code.. plssss

the code is as follows :

``````import java.io.*;
class Edge
{
int v1,v2,wt;   // wt is the weight of the edge
}
class kruskalsalgo
{
public static void main(String args[])throws IOException
{
int i,j,mincost=0;
System.out.println(" Enter no.of vertices:");
System.out.println(" Enter no.of edges:");
Edge ed[]=new Edge[e+1];
for(i=1;i<=e;i++)
{
ed[i]=new Edge();
System.out.println(" Enter the vertices and the weight of edge "+(i)+ ":");
}
for(i=1;i<=e;i++)      // sorting the edges in ascending order
for(j=1;j<=e-1;j++)
{
if(ed[j].wt>ed[j+1].wt)
{
Edge t=new Edge();
t=ed[j];
ed[j]=ed[j+1];
ed[j+1]=t;
}
}

int visited[]=new int[v+1];       // array to check whether the vertex is visited or not
for(i=1;i<=v;i++)
visited[i]=0;
System.out.println("MINIMUM SPANNING TREE :");

for(i=1;i<=e;i++)
{
if(i>v)
break;
else if( visited[ed[i].v1]==0 || visited[ed[i].v2]==0)
{
System.out.println(ed[i].v1+ "-"+ ed[i].v2);
visited[ed[i].v1]=visited[ed[i].v2]=1;
mincost+=ed[i].wt;
}
}
System.out.println("MINIMUM COST = " +mincost);
}
}
``````
-
can anyone tell me how to write a function to check whether a edges are creating a cycle or not ??? then i can add that part to my code and make some changes... please – user2033058 Feb 2 '13 at 6:44
you can check this > generate minimum spanning tree using Kruskal method in c – ARJUN Sep 17 '14 at 6:07

You should refer to the actual algorithm: http://en.wikipedia.org/wiki/Kruskal%27s_algorithm You are making a few mistakes in your code. For simplicity you might want to define your

``````Edge class something like this:

class Edge implements Comparable<Edge>
{
int v1,v2,wt;

Edge(int v1, int v2, int wt)
{
this.v1=v1;
this.v2=v2;
this.wt=wt;
}

@Override
public int compareTo(Edge o) {
Edge e1 = (Edge)o;
if(e1.wt==this.wt)
return 0;
return e1.wt < this.wt ? 1 : -1;
}

@Override
public String toString()
{
return String.format("Vertex1:%d \t Vertex2:%d \t Cost:%d\n", v1,v2,wt);

}
}
``````

Here extend comparable so you can use java Collections.sort() on your edges and it will sort ascending for you, and override toString() so you can use it for printing and helps in debugging.

In your visited array, you are only checking if you have visited it at one point but that is not the criteria to make a minimum spanning tree. For example, in your input I can pick edges {1,2,5}, {2,5,5}, {4,5,40}, which would visit every vertex once but not give you your minimum spanning tree.

The algorithm first says to make a a forest of trees. This means for every vertex you should create a set with just itself as a member. Something like this:

``````HashMap<Integer,Set<Integer>> forest = new HashMap<Integer,Set<Integer>>();
for(Integer vertex : vertices)
{
//Each set stores the known vertices reachable from this vertex
//initialize with it self.
Set<Integer> vs = new HashSet<Integer>();
forest.put(vertex, vs);
}
``````

Now iterate over your edges. Sorting them is good because you can just use it as stack, so pop until you find your min tree or run out of edges. For each edge you want to merge the sets of reachable vertices for the 2 vertices that is joined by the edge. If the sets of reachable vertices is the same for the 2 vertices that make the edge then don't merge because it will form a loop. If they don't, add the edge to your min tree. Stop once you find a set that contains all your vertices. In code it will look something like this:

``````//sort your edges, you should use existing functionality where possible, saves testing needed
//here edges is your Stack, pop until minimum spanning tree is found.
Collections.sort(edges);
ArrayList<Edge> minSpanTree = new ArrayList<Edge>();
while(true) //while you haven't visited all the vertices at least once
{
Edge check = edges.remove(0);//pop

Set<Integer> visited1 = forest.get(check.v1);
Set<Integer> visited2 = forest.get(check.v2);
if(visited1.equals(visited2))
continue;
for(Integer i : visited1)
{
forest.put(i, visited1);
}
if(visited1.size()==vertices.length)
break;
}
``````

So for the following input:

Input: [Vertex1:2 Vertex2:5 Cost:5 , Vertex1:1 Vertex2:3 Cost:10 , Vertex1:1 Vertex2:2 Cost:13 , Vertex1:3 Vertex2:2 Cost:20 , Vertex1:4 Vertex2:5 Cost:40 , Vertex1:3 Vertex2:5 Cost:64 , Vertex1:4 Vertex2:3 Cost:80 , Vertex1:1 Vertex2:4 Cost:100]

You get the min span tree: Output: [Vertex1:2 Vertex2:5 Cost:5 , Vertex1:1 Vertex2:3 Cost:10 , Vertex1:1 Vertex2:2 Cost:13 , Vertex1:3 Vertex2:2 Cost:20 , Vertex1:4 Vertex2:5 Cost:40]

-Niru

-
i agree with ur views about changing the edge class.but i dont want to create the stack of trees. i want a simple implementation.after sorting the edges, i want to print only those edges wich dont form a cycle as well as complete the visit of all vertices. so pls tel me how i can do this in my program....? – user2033058 Feb 2 '13 at 14:51
@user2033058 He already helped you a lot. Why don't you try doing some new work on it yourself instead of begging for a solution? – AHungerArtist Feb 2 '13 at 16:46
@user2033058 The implementation I gave you is straightforward. If you just plug the code I gave you, your program would work. The stack is only for the edges not the trees. As you process edges you will have disjoint sets of discovered vertices. A loop is formed when you add a edge whose vertices are already in the same discovered set. You should read the wiki I linked. What you are getting at I think is a bit different but you should understand how Kruskal's actually works first; which I'm not sure you do. You also need to add a bit of error checking. – Niru Feb 3 '13 at 7:55