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Given an undirected graph G=(V,E) with n vertices ( |V| = n ), how do you find if it contains a cycle in O(n) ?

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9 Answers

up vote 28 down vote accepted

I think that depth first search solves it. If an unexplored edge leads to a node visited before, then the graph contains a cycle. This condition also makes it O(n), since you can explore maximum n edges without setting it to true or being left with no unexplored edges.

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right! I remembered it was something simple... Thanks a lot :) –  Eran Kampf Feb 8 '09 at 21:02
1  
and if you go the breadth first search route, then an unexplored edge leading to a node "discovered" before, then the graph contains a cycle. BTW, IIRC the runtime of graph algorithms is usually described in terms of V and E. –  paxos1977 Feb 10 '09 at 1:04
    
Hmmm...this could devolve into an O(n^2) algorithm if you aren't careful, no? If you check for a node visited before by keeping all of the nodes in a linked list (new nodes to the end) then you'll have to scan your node list (the scan is O(n) in itself) on each check. Ergo - O(n^2). –  Mark Brittingham Feb 10 '09 at 1:14
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If you mark each node, though, it is definitely O(n). –  Mark Brittingham Feb 10 '09 at 2:25
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This condition is also known as a back edge. After running DFS, if the resulting DFS tree contains any back edges (an edge pointing to an ancestor in the tree), you know there's a cycle. This also works for a directed graph. –  rahulmehta95 Nov 10 '12 at 18:46
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Actually, depth first (or indeed breadth first) search isn't quite enough. You need a sightly more complex algorithm.

For instance, suppose there is graph with nodes {a,b,c,d} and edges {(a,b),(b,c),(b,d),(d,c)} where an edge (x,y) is an edge from x to y. (looks something like this, with all edges directed downwards.)

    (a)
     |
     |
    (b)
    / \ 
  (d)  |
   |   |
    \ /
    (c)

Then doing depth first search may visit node a, then b then c then backtrack to c then visit d and finally visit c again and conclude there is a cycle when there isn't. A similar thing happens with breadth first.

What you need to do is keep track of which nodes your in the middle of visiting. In the example above, when the algorithm reaches (d) it has finished visiting (c) but not (a) or (b). So revisiting a finished node is fine, but visiting an unfinished node means you have a cycle. The usual way to do this is colour each node white(not yet visited), grey(visiting descendants) or black(finished visiting).

here is some pseudo code!

define visit(node n):
  if n.colour == grey: //if we're still visiting this node or its descendants
    throw exception("Cycle found")

  n.colour = grey //to indicate this node is being visited
  for node child in n.children():
    if child.colour == white: //if the child is unexplored
      visit(child)

  n.colour = black //to show we're done visiting this node
  return

then running visit(root_node) will throw an exception if and only if there is a cycle (initially all nodes should be white).

Sorry if you knew all this already, it may well be what you meant by depth first search anyway, but I hope it helps.

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The question was for an undirected graph, your example is a cycle in a undirected graph. –  David Waters Feb 10 '09 at 16:13
    
Hah, so it is...Guess I should read things more carefully! –  Anonymous Feb 10 '09 at 16:22
    
but still well answered and explained!! –  dimazaid Mar 2 '12 at 11:58
    
The if statement at line 2 is always false( check the if statement at line 7 ) –  Rontogiannis Aristofanis Oct 8 '12 at 17:14
    
for a directed graph, run topological search. if it succeeded: no cycles. otherwise: cycles exist. –  Alaa M. May 15 '13 at 13:42
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The answer is, really, breadth first search (or depth first search, it doesn't really matter). The details lie in the analysis.

Now, how fast is the algorithm?

First, imagine the graph has no cycles. The number of edges is then O(V), the graph is a forest, goal reached.

Now, imagine the graph has cycles, and your searching algorithm will finish and report success in the first of them. The graph is undirected, and therefore, the when the algorithm inspects an edge, there are only two possibilities: Either it has visited the other end of the edge, or it has and then, this edge closes a circle. And once it sees the other vertex of the edge, that vertex is "inspected", so there are only O(V) of these operations. The second case will be reached only once throughout the run of the algorithm.

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By the way, if you happen to know that it is connected, then simply it is a tree (thus no cycles) if and only if |E|=|V|-1. Of course that's not a small amount of information :)

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I believe that the assumption that the graph is connected can be handful. thus, you can use the proof shown above, that the running time is O(|V|). if not, then |E|>|V|. reminder: the running time of DFS is O(|V|+|E|).

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As others have mentioned... A depth first search will solve it. In general depth first search takes O(V + E) but in this case you know the graph has at most O(V) edges. So you can simply run a DFS and once you see a new edge increase a counter. When the counter has reached V you don't have to continue because the graph has certainly a cycle. Obviously this takes O(v).

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I believe using DFS correctly also depends on how are you going to represent your graph in the code. For example suppose you are using adjacent lists to keep track of neighbor nodes and your graph has 2 vertices and only one edge: V={1,2} and E={(1,2)}. In this case starting from vertex 1, DFS will mark it as VISITED and will put 2 in the queue. After that it will pop vertex 2 and since 1 is adjacent to 2, and 1 is VISITED, DFS will conclude that there is a cycle (which is wrong). In other words in Undirected graphs (1,2) and (2,1) are the same edge and you should code in a way for DFS not to consider them different edges. Keeping parent node for each visited node will help to handle this situation.

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You can solve it using DFS. Time complexity: O(n)

The essence of the algorithm is that if a connected component/graph does NOT contain a CYCLE, it will always be a TREE.See here for proof

Let us assume the graph has no cycle, i.e. it is a tree. And if we look at a tree, each edge from a node:

1.either reaches to its one and only parent, which is one level above it.

2.or reaches to its children, which are one level below it.

So if a node has any other edge which is not among the two described above, it will obviously connect the node to one of its ancestors other than its parent. This will form a CYCLE.

Now that the facts are clear, all you have to do is run a DFS for the graph (considering your graph is connected, otherwise do it for all unvisited vertices), and IF you find a neighbor of the node which is VISITED and NOT its parent, then my friend there is a CYCLE in the graph, and you're DONE.

You can keep track of parent by simply passing the parent as parameter when you do DFS for its neighbors. And Since you only need to examine n edges at the most, the time complexity will be O(n).

Hope the answer helped.

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An undirected graph without cycle has |E| < |V|-1.

public boolean hasCycle(Graph g) {

   int totalEdges = 0;
   for(Vertex v : g.getVertices()) {
     totalEdges += v.getNeighbors().size();
   }
   return totalEdges/2 > g.getVertices().size - 1;

}
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This doesn't seem right. First, did you mean <=? (A connected straight line 1-2-3-4-...-10 will always have |E|=|V|-1. And then, unless you restrict to fully connected, you can add any number of subgraphs to grow |E| slower than |V| and trick this test into missing a cycle. (I.e., If I add an edge A-B, I add 1 to |E| and 2 to |V|.) –  Joshua Goldberg Feb 12 '13 at 21:15
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Forgive me for noting that your name is amusingly eponymous for this question! –  Joshua Goldberg Feb 12 '13 at 21:18
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In the the graph: A-B, B-C, A-C, D, E we have |V| = 5 and |E| = 3, so your condition holds 3 < 5 - 1, even tough it has the cycle A-B-C-A –  pisaruk Feb 15 '13 at 3:38
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