A Census of Vertices by Generations in Regular Tessellations of the Plane

Abstract

We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet at each vertex, and in which p edges and p vertices surround each face. For 1/p + 1/q = 1/2, these are tilings of the Euclidean plane; for 1/p + 1/q < 1/2 , they are tilings of the hyperbolic plane. We choose a vertex as the origin, and classify vertices into generations according to their distance (as measured by the number of edges in a shortest path) from the origin. For all p 3 and q 3 with 1/p + 1/q 1/2 , we determine the rational generating function giving the number of vertices in each generation.