On 2-factors of Hamiltonian graphs
Abstract
Let k≥ 2. We show that, for a sufficiently small >0, any sufficiently large n-vertex Hamiltonian graph of minimum degree at least n1- contains a 2-factor consisting of exactly k cycles. This is the first minimum-degree condition which is polynomially smaller than linear. Our methods yield an analogous result when the host graph is not required to contain a Hamilton cycle, but only a 2-factor consisting of at most k cycles; this answers a question of Buci\'c, Jahn, Pokrovskiy and Sudakov.
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