Feedback Vertex Sets in Tournaments
نویسندگان
چکیده
We study combinatorial and algorithmic questions around minimal feedback vertex sets in tournament graphs. On the combinatorial side, we derive strong upper and lower bounds on the maximum number of minimal feedback vertex sets in an n-vertex tournament. We prove that every tournament on n vertices has at most 1.6740 minimal feedback vertex sets and that there is an infinite family of tournaments, all having at least 1.5448 minimal feedback vertex sets. This improves and extends the bounds of Moon (1971). On the algorithmic side, we design the first polynomial space algorithm that enumerates the minimal feedback vertex sets of a tournament with polynomial delay. The combination of our results yields the fastest known algorithm for finding a minimum size feedback vertex set in a tournament.
منابع مشابه
On Feedback Vertex Sets in Tournaments
A tournament T is an orientation of a complete graph, and a feedback vertex set of T is a subset of vertices intersecting every directed cycle of T . We prove that every tournament on n vertices has at most 1.6740 minimal feedback vertex sets and some tournaments have 1.5448 minimal feedback vertex sets. This improves a result by Moon (1971) who showed upper and lower bounds of 1.7170 and 1.475...
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