Counting k-cycles in 5-connected planar triangulations
Abstract
We show that every n-vertex 5-connected planar triangulation has at most 9n-50 many cycles of length 5 for all n 20 and this upper bound is tight. We also show that for every k≥ 6, there exists some constant C(k) such that for sufficiently large n, every n-vertex 5-connected planar graph has at most C(k) · nk/3 many cycles of length k. This upper bound is asymptotically tight for all k≥ 6.
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