# Find all paths with cycles in directed graph, given the source vertex

I'm having trouble solving this problem. I have to find all simple paths starting from a source vertex s containing a simple cycle in a directed graph. i.e. No repeats allowed, except of course for the single repeated vertex where the cycle joins back on the path.

I know how to use a DFS visit to find if the graph has cycles, but I can't find a way to use it to find all such paths starting from s.

For example, in this graph

``````        +->B-+
|    v
s-->T-->A<---C
|    ^
+->D-+
``````

Starting from `s`, the path S-T-A-B-C-A will correctly be found. But the path S-T-A-D-C-A will not be found, because the vertex C is marked as Visited by DFS.

Can someone hint me how to solve this problem? Thanks

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There may be infinitely many paths containing cycles... can you be more specific about what precisely you're looking for? –  templatetypedef Jan 16 '12 at 20:08
You probably mean paths that do not visit the same vertex again. Is this right? Even then, there will still probably be a stupendous number of them. So you probably want only the smallest cycles? Define a minimal cycle to be such that there is no shorter cycle among any subset of its members. Maybe you want all the minimal cycles? –  Aaron McDaid Jan 16 '12 at 20:19
Sorry, I meant paths, not cycles. What I'm searching for is a list of all paths in the graph starting from a vertex S and containing a simple cycle. –  JustB Jan 16 '12 at 20:42
You mean all simple paths containing a simple cycle, where the path starts at s? One more question: do you require that s be in the cycle or not? Your question is a bit ambiguous on this last point, at one point you say "find all the cycles starting from s". –  Aaron McDaid Jan 16 '12 at 21:10
There will still probably be a lot of cycles. In all the networks I deal with, if you start at a node and go on a long random walk, there will almost always be a route back to the start node, where no nodes have ever been revisited. There will be more such paths than you can store on your hard disk! –  Aaron McDaid Jan 16 '12 at 21:15

This is actually quite an easy algorithm, simpler than DFS. You simply enumerate all paths in a naive recursive search, remembering not to recurse any further any time the path loops back on itself:

(This is just a Python-inspired pseudocode. I hope it's clear enough.)

`````` def find_paths_with_cycles(path_so_far):
if neigh in path_so_far:
# this is a cycle, just print it
print path_so_far + [neigh]
else:
find_paths_with_cycles(path_so_far + [neigh])

initial_path = list()
initial_path.append(s)
find_paths_with_cycles(initial_path)
``````
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This is a common problem for garbage collection algorithms.

At a .net training, I learned that the .net garbage collector detects cycles by starting with two pointers in the graph, one of which advances at twice the speed as the other. If the fast advancing one runs into the slow one from behind, you found a cycle. It will be more involved for complex graphs, but it will work without labeling the nodes.

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