Extremal Theta-free planar graphs

Abstract

Given a family F, a graph is F-free if it does not contain any graph in F as a subgraph. We study the topic of "extremal" planar graphs initiated by Dowden [J. Graph Theory 83 (2016) 213--230], that is, how many edges can an F-free planar graph on n vertices have? We define ex_P(n,F) to be the maximum number of edges in an F-free planar graph on n vertices. Dowden obtained the tight bounds ex_P(n,C4)≤15(n-2)/7 for all n≥4 and ex_P(n,C5)≤(12n-33)/5 for all n≥11. In this paper, we continue to promote the idea of determining ex_P(n,F) for certain classes F. Let k denote the family of Theta graphs on k4 vertices, that is, graphs obtained from a cycle Ck by adding an additional edge joining two non-consecutive vertices. The study of ex_P(n,4) was suggested by Dowden. We show that ex_P(n,4)≤12(n-2)/5 for all n≥ 4, ex_P(n,5)≤5(n-2)/2 for all n5, and then demonstrate that these bounds are tight, in the sense that there are infinitely many values of n for which they are attained exactly. We also prove that ex_P(n,C6) ex_P(n,6) 18(n-2)/7 for all n6.