Enumeration of \(r\)-regular Maps on the Torus. Part II: Enumeration of Unsensed Maps

The second part of the paper is devoted to enumeration of \(r\)-regular toroidal maps up to all homeomorphisms of the torus (unsensed maps). We describe in detail the periodic orientation reversing homeomorphisms of the torus which turn out to be representable as glide reflections. We show that considering quotients of the torus with respect to these homeomorphisms leads to maps on the Klein bottle, annulus and the M\"obius band. Using \(3\)- and \(4\)-regular maps as an example we describe the technique of enumerating quotient maps on surfaces with a boundary. Obtained recurrence relations are used to enumerate unsensed \(r\)-regular maps on the torus for various \(r\).