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I am trying to construct the transpose of a directed graph by running DFS on the original graph and then generating a adjancy list of the mirror as new nodes are discovered.

What would the computational time of this be? I know that the DFS takes O(|V| + |E|) but what about constructing the adjancy list? How long does it take to construct the adjancy list of the transpose through DFS?

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is "mirror" a standard term? google is showing this q as the first hit. it does not appear in en.wikipedia.org/wiki/Glossary_of_graph_theory - do you mean en.wikipedia.org/wiki/Transpose_graph –  andrew cooke Jun 18 '12 at 17:08
    
@Yes , a transpose graph would be the correct term. –  fdh Jun 18 '12 at 17:15

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If you have O(1) insertions of items into your graph (supposing you are using a hashtable or hashmap for vertex lookup or an array if your vertices are represented by integers), then the asymptotic runtime should be no different than the DFS.

I don't think you actually need to do a DFS, to be honest. I think you could just iterate over each vertex's adjacency list and then add the edges that way. The runtime will still be O(V+E), so theoretically, it doesn't really matter.

Also, if your graph is represented as an edge list, then I believe making the transpose graph would just be O(E), but I guess that requires the graph to be connected.

Sorry if there was too much extra information in there, and I hope I was able to help!

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Thank You Dylan! –  fdh Jun 18 '12 at 18:59
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I'm glad I could help! –  Dylan M. Jun 18 '12 at 20:30

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