Planar Tur\'an Numbers of Cycles: A Counterexample
Abstract
The planar Turan number exP(C,n) is the largest number of edges in an n-vertex planar graph with no -cycle. For ∈ \3,4,5,6\, upper bounds on exP(C,n) are known that hold with equality infinitely often. Ghosh, Gy\"ori, Martin, Paulo, and Xiao [arxiv:2004.14094] conjectured an upper bound on exP(C,n) for every 7 and n sufficiently large. We disprove this conjecture for every 11. We also propose two revised versions of the conjecture.
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