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I am facing a problem in big data analysis, where I am finding out paths using Dijkstras algorithm for a graph with more than 175K nodes. But the problem is that I do not know for a particular source and destination if a path exists or not. I have to do this for about 1000 sources and destinations. But I cannot pick them randomly, as I am not sure if a path exists between them or not. I am not sure how to handle this. One execution of algorithm in MapReduce enviorment take about 15 mins time locally. So, trial and error is not an option. Only we I can find about at least 1000 sources and destinations is to find cycles(?) or strongly connected components? Is this correct ? I hope my problem is clear to understand.

I am basically looking for finding say 1000 pairs of sources and destinations for which a path exists in a graph of that size

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So are you looking for a method to find if node dest is reachable from node src? –  Sam Mussmann Dec 4 '12 at 3:06
    
I am basically looking for finding say 1000 pairs of sources and destinations for which a path exists in a graph of that size –  user1655719 Dec 4 '12 at 3:07
    
Any constraints on these pairs? Or can they be completely arbitrary? –  Sam Mussmann Dec 4 '12 at 3:07
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can you show us what you did with mapreduce? –  Yuck Dec 4 '12 at 3:07
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I think 175k vertices can be handled easily by igraph (igraph.sf.net), so you might just switch to that. It depends on the density of the graph as well, of course. Disclaimer: I am one of the authors of igraph. –  Gabor Csardi Dec 4 '12 at 14:13
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3 Answers 3

up vote 4 down vote accepted

I would suggest randomly picking 1000 source nodes, and then for each node run Breadth-First-Search until you've visited k nodes. Then, pick the next node that you would visit and set that as the destination for that source.

With this method, you're guaranteed that each destination is reachable from that source.

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Good idea.. let me try that.. I will accept the answer mostly... –  user1655719 Dec 4 '12 at 3:15
    
Why bother with the BFS? Just choose a random node as a source, and one of its neighbors as a destination, no need to search. –  jwpat7 Dec 4 '12 at 4:29
    
@jwpat7 That's the k = 0 case, right? BFS gives you a more 'interesting' problem, I think. –  Sam Mussmann Dec 4 '12 at 4:34
    
But the problem statement doesn't mention any path lengths, merely requires a path exists. Having k=0 keeps it simple; given the problem statement, k>0 is a needless complication. –  jwpat7 Dec 4 '12 at 4:36
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I think the discussion here is about bias. Even with k > 0 there is a bias in the selection of pairs, which may be an issue seeing as the application seems to be data analytics. OP needs to clarify their requirements in terms of the characteristics of the sampling process. –  Yaniv Dec 4 '12 at 4:54
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We can use a data-structure like disjoint-union-set(DUS). We do a initialization to get the connectivity of whole graph. If a can reach b, they will located in same set in the DUS. The complexity of the initialization is all depend on the number of edges in the graph. And the query is about O(1).

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That works in an undirected graph, but in a directed graph, a can be reachable from b while b is not reachable from a, which I don't think DUS can indicate. –  Sam Mussmann Dec 4 '12 at 4:45
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@SamMussmann Yes, you are right, this algorithm can just work on undirected graph. –  Jun HU Dec 4 '12 at 4:47
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Here's an algorithm that I suggest:

findPairsPath ()
{
    define 2D Array SD //holds source-destination nodes
    SD = {}
    pick any node u randomly
    k=0

    while (k<1000)
    {
       DFS (u, k)
       pick any node u randomly not stored in SD 
    }
}

DFS (u, k)
{

    for all nodes v adjacent to u and not stored in SD
     {
       store (u,v) in SD //storing a source and a destination
       k++
       DFS (v,k)

     }

}
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