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I am new to graph theory, and so far I have learned only BFS and Disjoint sets in graph theory. If there is a cycle in a given, undirected, connected graph, can I find it using BFS ? My intention is to print all the vertices in the cycle. Thanks in advance.

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Yes stackoverflow.com/questions/4464336/… , and it's not circles, it's called cycles in graph :P – Mr.Anubis Jul 2 '12 at 18:13
    
sorry, i meant cycle. I have corrected it. – eddard.stark Jul 2 '12 at 18:21
    
Do you mean an directed graph? If the graph is undirected then any link connecting two nodes forms a cycle. E.g. if you have A - B, then A - B - A is a cycle. – Alex Wilson Jul 2 '12 at 18:21
    
@AlexWilson no, i meant undirected graph. Can you please clarify. I am having the same problem as this guy named PROGRAMMER. Consider 2----1. If I start BFS from 1 I will begin by marking it as visited and add it to the queue. Then, in the while loop, I will retrieve it from the queue and mark any adjacent unvisited vertices as visited and add them to the queue. in other words, I will add 2 to the queue. Now, when I retrieve 2 from the queue, I will again consider all its adjacent vertices. In doing so, I will also consider 1 which is already visited. However, this does not indicate a cycle. – eddard.stark Jul 2 '12 at 18:38

In graph theory it's called Cycles and not Circles.It marks the nodes as visited and if the visited nodes are again visited it reports that it is a cycle.BTW finding cycles using D.F.S is better. You can find the codes here http://codes-at-igit.weebly.com/uploads/1/2/2/7/12272842/ideone_0sbcx.cpp

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