Extremal H-free planar graphs

Abstract

Given a graph H, a graph is H-free if it does not contain H as a subgraph. We continue to study the topic of "extremal" planar graphs, that is, how many edges can an H-free planar graph on n vertices have? We define ex_P(n,H) to be the maximum number of edges in an H-free planar graph on n vertices. We first obtain several sufficient conditions on H which yield ex_P(n,H)=3n-6 for all n |V(H)|. We discover that the chromatic number of H does not play a role, as in the celebrated Erdos-Stone Theorem. We then completely determine ex_P(n,H) when H is a wheel or a star. Finally, we examine the case when H is a (t, r)-fan, that is, H is isomorphic to K1+tKr-1, where t2 and r 3 are integers. However, determining ex_P(n,H), when H is a planar subcubic graph, remains wide open.