Constructions of Large Graphs on Surfaces

Abstract

We consider the degree/diameter problem for graphs embedded in a surface, namely, given a surface and integers and k, determine the maximum order N(,k,) of a graph embeddable in with maximum degree and diameter k. We introduce a number of constructions which produce many new largest known planar and toroidal graphs. We record all these graphs in the available tables of largest known graphs. Given a surface of Euler genus g and an odd diameter k, the current best asymptotic lower bound for N(,k,) is given by \[38g k/2.\] Our constructions produce new graphs of order \[cases6 k/2& if is the Klein bottle\\ \(72+6g+14\) k/2& otherwise,cases\] thus improving the former value by a factor of 4.