An improved lower bound for the planar Tur\'an number of cycles

Abstract

The planar Tur\'an number of a graph H, denoted by ex_P(n,H), is the largest number of edges in a planar graph on n vertices without containing H as a subgraph. In this paper, we continue to study the topic of "extremal" planar graphs initiated by Dowden [J. Graph Theory 83 (2016) 213--230]. We first obtain an improved lower bound for ex_P(n,Ck) for all k 13 and n 5(k-6+(k-1)/2)(k-1)/2; the construction for each k and n provides a simpler counterexample to a conjecture of Ghosh, Gyori, Martin, Paulos and Xiao [arxiv:2004.14094v1], which has recently been disproved by Cranston, Lidick\'y, Liu and Shantanam [Electron. J. Combin. 29(3) (2022) \#P3.31] for every k 11 and n sufficiently large (as a function of k). We then prove that ex_P(n,H+)=ex_P(n,H) for all k 5 and n |H|+1, where H∈\Ck, 2Ck\ and H+ is obtained from H by adding a pendant edge to a vertex of degree two.