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In an undirected, unweighted graph, and I'm trying to print (store in file) all possible connecting paths between given 2 vertices on the graph, not including cycles.

when you consider a complete graph this problem is a NP-complete. because there are "(V-2)!" different paths between 2 vertices.

However,seems it is possible to do it with one of graph traversal (DFS-BFS) algorithm with time complexity of O(|V|+|E|) which is pretty polynomial.

I got confuse about solving a NP-Complete problem in polynomial time? any idea about what is missing here ?

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Your O(|V|+|E|) claim is wrong (I'm guessing you misinterpreted something): make an n+1 by n+1 grid graph and ask for the number of paths from the top-left vertex to the bottom-right one. Clearly you can get there by moving down n rows and right n columns, and you can intermingle these moves in any order, so there are (2n choose n) different paths between them that don't even involve any doubling back. –  j_random_hacker Oct 29 '13 at 1:45
    
@ j_ random_hacker I think I can print all possible paths by visiting all nodes and all edges once while recording current path –  zaratushtra Oct 29 '13 at 1:51
    
But how many paths will there be? E.g. on my example graph? –  j_random_hacker Oct 29 '13 at 1:54
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so O(|V|+|E|) is valid for only one path ? complexity has to be multiply by number of paths ? if it is a complete graph , is it going to be v!*O(|V|+|E|) ? –  zaratushtra Oct 29 '13 at 2:02
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I don't know where you got "O(|V|+|E|)" from, but obviously printing a single path is O(|V|+|E|). And if the problem is "Print all possible paths on a graph" then of course you need to have a factor in there for the number of paths! –  j_random_hacker Oct 29 '13 at 2:05

1 Answer 1

If you want all possible paths, and the graph has V vertices, and E edges, then the number of paths will be dependent upon the number of connects. Consider a fully connected graph, where every point connects to every other point. Then there are (v-2)! possible paths, right? Well (v-2)! > V+E (much greater).

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I have misses that O(|V|+|E|) is complexity of checking existence of a single path. –  zaratushtra Oct 29 '13 at 2:13

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