A classification of semi-equivelar gems on the double torus
Abstract
A semi-equivelar gem of a PL d-manifold is a regular colored graph that represents the manifold and admits a regular embedding on a surface, such that the cyclic sequence of face degrees around each vertex is identical. In [1,4], semi-equivelar gems of PL d-manifolds embedded on surfaces with Euler characteristic ≥ -1 were classified. In this paper, we extend this classification to semi-equivelar gems embedded on the double torus. We show that any such gem must belong to one of the following 31 types: (45), (64), (43,6), (43,8), (43,12), (42,62), (4,6,4,6), (42,82), (4,8,4,8), (83), (103), (62,8), (62,10), (62,12), (62,18), (102,4), (122,4), (162,4), (82,6), (122,6), (4,6,14), (4,6,16), (4,6,18), (4,6,20), (4,6,24), (4,6,36), (4,8,10), (4,8,12), (4,8,16), (4,8,24), and (4,10,20). Furthermore, we provide explicit constructions of semi-equivelar gems realizing each of these types.
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