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I am trying to identify a transitive relationship between two elements .I am coding in c.

for eg: a->b is represented by a "1" in adjacency matrix in 1st row 2nd column.

so if a->b and b-> c and c->d

i want to identify if a->d. no need to update the adjacency matrix.

approach i have adopted: check all the 1's in the row corresponding to a. lets say there is a 1 in second column ie for b. [(a->b)] , now check if b->d if not proceed to check all the 1's in B's row and continue till 26th row.

I am not really concerned with the complexity. i am just hoping to implement this.

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Are you wanting to check whether the entire graph is transitive? Or do you only care about 3 particular given elements in the graph? When you say you "want to identify a->d", do you mean you want to see whether a->d exists in the graph? –  j_random_hacker Dec 5 '12 at 19:05
i want transitive check for only the elements.. so if a->b b-> i am interested in knowing that a->c. –  technocrattobe Dec 6 '12 at 4:08
You wrote "b->" but I presume you meant "b->c", is that right? Also are you saying that if the graph contains some other element d, and a->b and b->d, you don't care whether a->d? –  j_random_hacker Dec 6 '12 at 4:10
In other words: I see two possible questions that you might be asking, and I'm not sure which one it is. Possibility #1: The input to the problem is a graph, and the output should be a boolean value indicating whether the graph is transitive. Possibility #2: The input is a graph graph plus a list of 3 particular vertices in that graph (which we will call a, b and c), and the output should be a boolean value indicating whether those 3 vertices are transitive. Which is it? Or is it something else? –  j_random_hacker Dec 6 '12 at 4:16
HI @j_random_hacker , My question is very simple. In an adjacency matrix if i have a 1 in row 0 column 1 it means A -> B. similarly if b->c; But i want to detect that a->c. –  technocrattobe Dec 6 '12 at 5:51

1 Answer 1

up vote 2 down vote accepted

You need to implement a breadth-first search or a depth-first search. Start at a, and stop when you reach d, or when you exhaust all options.

In your case, the depth-first search is somewhat easier to implement, because "plain" C lacks built-in dynamic queues needed for the breadth-first search.

If you do not care about the efficiency and you do not mind updating the matrix, implement the Floyd-Warshall algorithm: it is formulated specifically for adjacency matrices, and takes only five lines to implement:

for (int k = 0 ; k != N ; k++)
    for (int i = 0 ; i != N ; i++)
        for (int j = 0 ; j != N ; j++)
            if (matrix[i][k] && matrix[k][j])
                matrix[i][j] = 1;

After running this algorithm, the resultant matrix contains the transitive closure of the original one.

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TO implement a DFS i have to create a node and traverse . I was hoping to find some kind of a standard approach to do a transitivity check in adjacency matrix alone. –  technocrattobe Dec 5 '12 at 5:09
@KiranBangalore You absolutely, positively, do not need to create nodes. The beauty of the BFS and DFS is that they are abstract, to the point where the representation of your graph does not matter at all. Given a row, a DFS would go through each column in search of 1, then go down recursively. Of course you could use Floyd-Warshall if performance does not matter to you. –  dasblinkenlight Dec 5 '12 at 5:22
Hi, ya i see what you meant now. DFS appears to be the right way to go ahead. Else i can use Floyd-Warshall algorithm and calll it each time i need to check something. –  technocrattobe Dec 5 '12 at 5:38
@KiranBangalore You are right on the first part, but not the second: if you use Floyd Warshall, you need to call it only once, because it does the whole graph in one go. After running it once, you get the matrix for the transitive closure of the entire graph, so all you need to do after that is look up matrix[i][j]. –  dasblinkenlight Dec 5 '12 at 11:28
I think the OP wants to test for transitivity, so it would be better to replace the bottom line of your code with if (!matrix[i][j]) return false; return true;. –  j_random_hacker Dec 5 '12 at 16:24

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