Planar Tur\'an number of quasi-double stars

Abstract

Given a graph H, we call a graph H-free if it does not contain H as a subgraph. The planar Tur\'an number of a graph H, denoted by exP(n, H), is the maximum number of edges in a planar H-free graph on n vertices. A (h,k)-quasi-double star Wh,k, obtained from a path P3=v1v2v3 by adding h leaves and k leaves to the vertices v1 and v3, respectively, is a subclass of caterpillars. In this paper, we study exP(n,Wh,k) for all 1 h 2 k 5, and obtain some tight bounds exP(n,Wh,k)≤3(h+k)h+k+2n for 3 h+k 5 with equality holds if (h+k+2) n, and exP(n,W1,5) 52n with equality holds if 12 n. Also we show that 94n exP(n,W2,4) 52n and 52n exP(n,W2,5) 176n, respectively.