# Weighted union rule

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)

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
• 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
• 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!