Edge disjoint Hamiltonian cycles in highly connected tournaments
Abstract
Thomassen conjectured that there is a function f(k) such that every strongly f(k)-connected tournament contains k edge-disjoint Hamiltonian cycles. This conjecture was recently proved by K\"uhn, Lapinskas, Osthus, and Patel who showed that f(k)≤ O(k2( k)2) and conjectured that there is a constant C such that f(k)≤ Ck2. We prove this conjecture.
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