# Implementation of Union find Algorithm

I have a series of Key value pairs. Each Key has 2 values. Values of Keys may coincide. Initially, I start with Key1, ValueKey1, ValueKey2 are stored in a set (maybe array).

Now for each consecutive Keyi, I check if Valuei and Valuei+1 are in the set. If any one of them is in the set, then join the set.

Else if both KeyValues are present in a set, discard that key.

How can I implement this thing using C++, I have very little idea, so if possible a code snippet or a hint would be really helpful.

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I don't understand your setup. First you say you have "key-value pairs", and then you say that "each key has two values". What's the basic unit of data that you have? Could you please clarify? –  Kerrek SB Nov 5 '11 at 22:53
i have suppose an int value, for that int i have two associated values int a, int b. Now i have many such pairs and have to use union find algorithm to see if any of the key-value pairs coincide... –  typedefcoder2 Nov 5 '11 at 22:58
Does this have to do with graphs? –  AusCBloke Nov 5 '11 at 23:01
@AusCBloke well the thing is i am generating a maze. To remove walls i have numbered the rooms corresponding to it. And yes later they are implemented as graphs ! –  typedefcoder2 Nov 5 '11 at 23:47

Are you using or in possession of 'Algorithms in C++' (Sedgewick, 3rd ed.) by any chance?

The first problem that is encountered in the book is that of connectivity (page 7) , and in it there are multiple implementations of a union-find (quick-union, quick-find, weighted etc) algorithm that uses paired keys.

Here's the quick-find version: (This is just a re-type from the book - not tested)

``````#include <iostream>
const int N = 10000;
int main() {
int i, p, q, id[N];
for( i = 0; i < N; i++ ) id[i] = i;
while( cin >> p >> q ) {
int t = id[p];
if ( t = id[q] ) continue;
for ( i = 0; i < N; i++ )
if ( id[i] == t) id[i] = id[q];
cout << " " << p << " " << q << endl;
}
}
``````

Just keeps spitting out pairs that aren't connected (which you could probably invert to get what you want)

The book has a pretty detailed description of how it works - and I'm guessing that you have it for now.

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No Sir.. I do not have that book. Let me try your solution. Thanks. –  typedefcoder2 Nov 5 '11 at 23:15