A classification of semi-equivelar gems of PL d-manifolds on the surface with Euler characteristic -1

Abstract

A semi-equivelar gem of a PL d-manifold is a regular colored graph that represents the PL d-manifold and regularly embeds on a surface, with the property that the cyclic sequence of degrees of faces in the embedding around each vertex is identical. In bb24, the authors classified semi-equivelar gems of PL d-manifolds embedded on surfaces with Euler characteristics greater than or equal to zero. In this article, we focus on classifying semi-equivelar gems of PL d-manifolds embedded on the surface with Euler characteristic -1. We prove that if a semi-equivelar gem embeds regularly on the surface with Euler characteristic -1, then it belongs to one of the following types: (83), (62,8), (62,12), (102,4), (122,4), (4,6,14), (4,6,16), (4,6,18), (4,6,24), (4,8,10), (4,8,12), or (4,8,16). Furthermore, we provide constructions that demonstrate the existence of such gems for each of the aforementioned types.

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