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algorithm - Find cycle of shortest length in a directed graph with positive weights

I was asked this question in an interview, but I couldn't come up with any decent solution. So, I told them the naive approach of finding all the cycles then picking the cycle with the least length.

I'm curious to know what is an efficient solution to this problem.

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You can easily modify Floyd-Warshall algorithm. (If you're not familiar with graph theory at all, I suggest checking it out, e.g. getting a copy of Introduction to Algorithms).

Traditionally, you start path[i][i] = 0 for each i. But you can instead start from path[i][i] = INFINITY. It won't affect algorithm itself, as those zeroes weren't used in computation anyway (since path path[i][j] will never change for k == i or k == j).

In the end, path[i][i] is the length the shortest cycle going through i. Consequently, you need to find min(path[i][i]) for all i. And if you want cycle itself (not only its length), you can do it just like it's usually done with normal paths: by memorizing k during execution of algorithm.

In addition, you can also use Dijkstra's algorithm to find a shortest cycle going through any given node. If you run this modified Dijkstra for each node, you'll get the same result as with Floyd-Warshall. And since each Dijkstra is O(n^2), you'll get the same O(n^3) overall complexity.


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