Can someone check with me if I'm using the rule right in the last step (7)?

UPDATE:

Numbers inside the parentheses are the number of elements (weight(?)) of each set that takes part in the Union. Uppercase letters are names of sets.

As I understand this: we are using as our rank the number of elements? This is getting confusing, each one is using different terms for the same stuff.

We have Unions:

  1. U(1,2,A)
  2. U(3,4,B)
  3. U(A,B,C)
  4. U(5,6,D)
  5. U(7,8,E)
  6. U(D,C,F)
  7. U(E,F,G)

enter image description here

Step 7 (and the others) looks correct, but step 6 doesn't.

In step 6, 4 should be the root, as that's the bigger tree.

  • 1+2+3+4=10 and 5+6=11 , shouldn't 6 be the root in step 6? (cause of the weight) – user2692669 Feb 15 '14 at 19:25
  • 1
    I've never seen a union-find algorithm that uses the nodes' values as the weight - this won't make a whole lot of sense either, as the nodes' values don't really correspond to the running time of operations. It usually uses the height / depth of the tree. – Dukeling Feb 15 '14 at 19:38
  • I updated my problem as you instructed, I think it's correct now(?). – user2692669 Feb 15 '14 at 19:47
  • 1
    Yes, that looks correct. – Dukeling Feb 15 '14 at 19:48
  • Sorry, there is a catch in the problem I did an edit. These things are very tricky! – user2692669 Feb 15 '14 at 22:26
void combine(int x,int y)
{
    int xroot=find(x),yroot=find(y);
    if(rank[xroot]<rank[yroot]) 
        parent[xroot]=yroot;
    else if(rank[xroot]>rank[yroot]) 
    parent[yroot]=xroot;
    else 
    {///rank of both is equal..
        parent[yroot]=xroot;
        rank[xroot]++;
    }
}

Using rank, you see the size of set, not sum of vertices, so step 6 is wrong.

But why the size?
Because if we make root of bigger set the root of smaller set , we need to update parents of smaller number of nodes.

For the best explanation, I would recommend CLRS (Introduction to Algorithms).

Hope it helps you!

Your Answer

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

Not the answer you're looking for? Browse other questions tagged or ask your own question.