Improved bound on the number of cycle sets
Abstract
The cycle set of a graph G is the set consisting of all sizes of cycles in G. Answering a conjecture of Erdos and Faudree, Verstra\"ete showed that there are at most 2n - n1/10 different cycle sets of graphs with n vertices. We improve this bound to 2n - n1/2 - o(1). Our proof follows the general strategy of Verstra\"ete of reducing the problem to counting cycle sets of Hamiltonian graphs with many chords or a large maximum degree. The key new ingredients are near-optimal container lemmata for cycle sets of such graphs.
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