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I am working with a specific graphical structure representing 2-player normal form games (game theory). I know that I can compute all strongly connected components of the directed graph in O(V+E) via Tarjans, but was wondering what the complexity of computing all of the simple cycles of a strongly connected component is? AND, if there is a known upper bound on the number of such simple cycles given the number of vertices defining the strongly connected component?

I am looking for any literature/algorithms related to both of these problems. THANK YOU!

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1 Answer 1

Is the graph directed or undirected? In either case, the number of cycles can obviously be exponential in the number of nodes/ edges. For example, in a complete graph, every single permutation of every possible size from 2 to n will result in a cycle.

Johnson's algorithm for enumerating cycles (in directed graphs) seems to be one of the more efficient ones. Given that you are interested in the cycles of a strongly connected component, the implementation is even slightly easier than that described in the paper. The pseudocode in the paper is a little hard to read; this Ocaml implementation may be a little easier to process. The algorithm has complexity O(n+e)(c+1), where c is the number of cycles in the graph.

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