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How can I find a least common ancestors of multiple nodes in a directed acyclic graph?

I've found quite a few papers on the topic but they all seem to find LCAs in DAG for two nodes.

Are there good algorithms for multiple nodes?

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Is there any reason why you can't just use the algorithm for two nodes recursively? –  Dennis Meng Jul 16 '12 at 22:11
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To clarify what @DennisMeng means: lca(A, B, C) == lca(A, lca(B, C)). Also note that lca(A, B, C, D) == lca(lca(A, B), lca(C, D)), so take your list of n nodes, build a binary tree on top of it that is as balanced as possible, and you only have to apply the binary lca Θ(log n) times. –  Rhymoid Jan 3 '13 at 23:44
    
dup? LCA in DAG –  vzn Mar 7 at 23:03
    
@vzn At a glance, it looks like the question you linked asks about LCA for two nodes, but OP here is explicitly looking for the case where there's 3 or more. –  Dennis Meng Jun 28 at 8:06
    
as the answer below & rhymoids comments indicate, apparently finding LCAs of multiple nodes is usually done recursively & iterating over pairwise LCAs. –  vzn Jun 28 at 15:31
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1 Answer

Maybe you can modify the algorithm which is used for trees in a way that adopts to DAGs as well.

As you may know,there is an algorithm for finding LCA in trees with pre-process of O(nlgn) and process of O(1) for each query,so finding LCA of k nodes needs O(k) . More details about this algorithm can be found here.

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