Hamiltonian Cycle in Semi-Equivelar Maps on the Torus

Abstract

Semi-Equivelar maps are generalizations of Archimedean solids to the surfaces other than 2-sphere. There are eight semi-equivelar maps of types \33,42\, \32,4,3,4\, \6,3,6,3\, \34,6\, \4,82\, \3,122\, \4,6,12\, \6,4,3,4\ exist on the torus. In this article we show the existence of Hamiltonian cycle in each semi-equivelar map on the torus except the map of type \3,122\. This result gives the partial solution to the conjecture which is given by Grunbaum grunbaum and Nash-Williams nash williams that every 4-connected graph on the torus is Hamiltonian.