On the maximum number of edges in plane graph with fixed exterior face degree

Abstract

A well known Euler's formula consequence's corollary in graph theory states that: For a connected simple planar graph with n vertices and m edges, and girth g, we have m ≤ gg-2(n-2). We show that a connected simple plane graph with n vertices and girth g, and exterior face of degree h has at most gg-2(n-2)- 1g-2(h-g) edges. A convex hull g-angulation is a connected plane graph in which the exterior face is a simple h-cycle and all inner faces are g-cycles. For a given set S of n point in the plane having h points in the boundary of its convex hull, we present the necessary and sufficient condition to obtain a convex hull g-angulation on S. We also determine the number of edges and inner faces in the convex hull g-angulation.