# Best algorithm for detecting cycles in a directed graph

What is the most efficient algorithm for detecting all cycles within a directed graph?

I have a directed graph representing a schedule of jobs that need to be executed, a job being a node and a dependency being an edge. I need to detect the error case of a cycle within this graph leading to cyclic dependencies.

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You say you want to detect all cycles, but your use-case suggests that it would be sufficient to detect whether there are any cycles. –  Steve Jessop Nov 4 '08 at 11:37
It would be better to detect all cycles so they could be fixed in one go, rather than check, fix, check, fix etc. –  Peauters Nov 4 '08 at 12:04

Tarjan's strongly connected components algorithm has O(E + V) complexity

For other algorithm see Strongly connected components on Wikipedia

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Thanks Aku, this should work and will also mean i can show the sub graphs causing the issue. –  Peauters Nov 4 '08 at 12:21
How does finding the strongly connected components tell you about the cycles that exist in the graph? –  Peter Mar 29 '10 at 17:21
–  aku Apr 3 '10 at 9:39
May be somebody can confirm but the Tarjan algorithm does not support cycles of nodes pointing directly to themselves, like A->A. –  Cédric Guillemette Sep 14 '10 at 13:05
@Cedrik Right, not directly. This isn't a flaw in Tarjan's algorithm, but the way it is used for this question. Tarjan doesn't directly find cycles, it finds strongly connected components. Of course, any SCC with a size greater than 1 implies a cycle. Non-cyclic components have a singleton SCC by themselves. The problem is that a self-loop will also go into a SCC by itself. So you need a separate check for self-loops, which is pretty trivial. –  mgiuca Feb 9 '11 at 1:13

Given that this is a schedule of jobs, I suspect that at some point you are going to sort them into a proposed order of execution.

If that's the case, then a topological sort implementation may any case detect cycles. UNIX tsort certainly does. I think it is likely that it is therefore more efficient to detect cycles at the same time as tsorting, rather than in a separate step.

So the question might become, "how do I most efficiently tsort", rather than "how do I most efficiently detect loops". To which the answer is probably "use a library", but failing that http://en.wikipedia.org/wiki/Topological_sorting has pseudo-code for one algorithm, and a brief description of another from Tarjan. Both have O(V + E) complexity.

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I believe phys wizard's solution will detect a loop in all cases.

I use Cormen's terminologies.

Start with a DFS. A cycle exists, if and only if, a back-edge is discovered during DFS. This is proved as a result of white-path theorum.

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Yes, i think the same, but this isn't enough, I post my way cs.stackexchange.com/questions/7216/find-the-simple-cycles-in-a-directed-graph –  d555 Dec 6 '12 at 21:58

well the simplest way to do it is to do a depth first traversal of the graph. If the graph has v vertices, this is of O(v). Since you will (possibly) have to do a DFT starting from each possible vertex, the total complexity becomes O(v^2). you have to maintain a stack containing all vertices in the current depth first traversal with its first element being the root node. if you come across an element which is already in the stack during the DFT then you have a cycle!

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This would be true for a "regular" graph, but is false for a directed graph. For example, consider the "diamond dependency diagram" with four nodes: A with edges pointing to B and C, each of which has an edge pointing to D. Your DFT traversal of this diagram from A would incorrectly conclude that the "loop" was actually a cycle - although there is a loop, it is not a cycle because it cannot be traversed by following the arrows. –  Peter Mar 29 '10 at 17:19
@peter can you please explain how DFT from A will incorrectly conclude that there is a cycle? –  Deepak Sep 26 '12 at 12:50
@Deepak - In fact, I misread the answer from "phys wizard": where he wrote "in the stack" I thought "has already been found". It would indeed be sufficient (for detecting a directed loop) to check for dupes "in the stack" during the execution of a DFT. One upvote for each of you. –  Peter Sep 27 '12 at 13:38

If you can't add a "visited" property to the nodes, use a set (or map) and just add all visited nodes to the set unless they are already in the set. Use a unique key or the address of the objects as the "key".

This also gives you the information about the "root" node of the cyclic dependency which will come in handy when a user has to fix the problem.

Another solution is to try to find the next dependency to execute. For this, you must have some stack where you can remember where you are now and what you need to do next. Check if a dependency is already on this stack before you execute it. If it is, you've found a cycle.

While this might seem to have a complexity of O(N*M) you must remember that the stack has a very limited depth (so N is small) and that M becomes smaller with each dependency that you can check off as "executed" plus you can stop the search when you found a leaf (so you never have to check every node -> M will be small, too).

In MetaMake, I created the graph as a list of lists and then deleted every node as I executed them which naturally cut down the search volume. I never actually had to run an independent check, it all happened automatically during normal execution.

If you need a "test only" mode, just add a "dry-run" flag which disables the execution of the actual jobs.

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reason for downvote please? –  Gnark Feb 13 '10 at 16:39

If DFS finds an edge that points to an already-visited vertex, you have a circle there.

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Fails on 1,2,3: 1,2; 1,3; 2,3; –  kittyPL Feb 4 at 9:19
@kittyPL can you explain why that case fails? Either 1) That is a directed graph and so no cycle has been formed or 2) DFS would go 1 -> 2 (using 1,2), 2 -> 3 (using 2,3), 3 -> 1 (using 1,3) –  Jake Greene Feb 5 at 1:24
@JakeGreene Look here: i.imgur.com/tEkM5xy.png Simple enough to understand. Lets say you start from 0. Then you go to the node 1, no more paths from there, reucrsion goes back. Now you visit node 2, which has a edge to the vertex 1, which was visited already. In your opinion you would have a cycle then - and you do not have one really –  kittyPL Feb 10 at 1:25
@kittyPL That graph does not contain a cycle. From Wikipedia: "A directed cycle in a directed graph is a sequence of vertices starting and ending at the same vertex such that, for each two consecutive vertices of the cycle, there exists an edge directed from the earlier vertex to the later one" You have to be able to follow a path from V that leads back to V for a directed cycle. mafonya's solution works for the given problem –  Jake Greene Feb 10 at 6:00
@JakeGreene Of course it does not. Using your algorithm and starting from 1 you would detect a cycle anyway... This algorithm is just bad... Usually it would be sufficient to walk backwards whenever you encounter a visited vertex. –  kittyPL Feb 10 at 14:10

The way I do it is to do a Topological Sort, counting the number of vertices visited. If that number is less than the total number of vertices in the DAG, you have a cycle.

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That does not make sense. If the graph has cycles, there is no topological sorting, which means any correct algorithm for topological sorting will abort. –  sleske Sep 30 '09 at 15:47
from wikipedia: Many topological sorting algorithms will detect cycles too, since those are obstacles for topological order to exist. –  Oleg Mikheev Jan 20 '13 at 1:59

I had implemented this problem in sml ( imperative programming) . Here is the outline . Find all the nodes that either have an indegree or outdegree of 0 . Such nodes cannot be part of a cycle ( so remove them ) . Next remove all the incoming or outgoing edges from such nodes. Recursively apply this process to the resulting graph. If at the end you are not left with any node or edge , the graph does not have any cycles , else it has.

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http://mathoverflow.net/questions/16393/finding-a-cycle-of-fixed-length I like this solution the best specially for 4 length:)

Also phys wizard says u have to do O(V^2). I believe that we need only O(V)/O(V+E). If the graph is connected then DFS will visit all nodes. If the graph has connected sub graphs then each time we run a DFS on a vertex of this sub graph we will find the connected vertices and wont have to consider these for the next run of the DFS. Therefore the possibility of running for each vertex is incorrect.

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