On enumeration of a class of toroidal graphs

Abstract

We present enumerations of a class of toroidal graphs which give rise to semi-equivelar maps. There are eleven different types of semi-equivelar maps on the torus. These are of the types \36\, \44\, \63\, \33, 42\, \32, 4, 3, 4\, \3, 6, 3, 6\, \34, 6\, \4, 82\, \3, 122\, \4, 6, 12\, \3, 4, 6, 4\. We know the classification of the maps of types \36\, \44\, \63\ on the torus. In this article, we attempt to classify maps of types \33, 42\, \32, 4, 3, 4\, \3, 6, 3, 6\, \34, 6\, \4, 82\, \3, 122\, \4, 6, 12\, \3, 4, 6, 4\ on the torus.