Cyclic subsets of tournaments
Abstract
Let G be a Dirac graph, and let S be a vertex subset of G, chosen uniformly at random. How likely is the induced subgraph G[S] to be Hamiltonian? This question, proposed by Erdos and Faudree in 1996, was recently resolved by Dragani\'c, Keevash and M\"uyesser, in the setting of graphs. In this paper, we study a similar question for tournaments -- if T is a tournament of high minimum degree, how likely is it for a random induced subtournament of T to be Hamiltonian? We prove an optimal bound on this probability, and extend the results to the regime where the subset is not sampled uniformly at random, but according to a p-biased measure.
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