Doubly Semiequivelar Maps on Torus and Klein Bottle

Anand K. Tiwari; Amit Tripathi; Yogendra Singh; Punam Gupta

doi:10.1155/2020/5674172

Journal of Mathematics (Jan 2020)

Doubly Semiequivelar Maps on Torus and Klein Bottle

Anand K. Tiwari,
Amit Tripathi,
Yogendra Singh,
Punam Gupta

Affiliations

Anand K. Tiwari: Department of Applied Science, Indian Institute of Information Technology, Allahabad 211 015, India
Amit Tripathi: Department of Applied Science & Humanities, Rajkiya Engineering College, Banda 210201, India
Yogendra Singh: Department of Applied Science, Indian Institute of Information Technology, Allahabad 211 015, India
Punam Gupta: Department of Mathematics & Statistics, Dr. Hari Singh Gour Vishwavidyalaya, Sagar 470 003, India

DOI: https://doi.org/10.1155/2020/5674172
Journal volume & issue: Vol. 2020

Abstract

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A tiling of the Euclidean plane, by regular polygons, is called 2-uniform tiling if it has two orbits of vertices under the action of its symmetry group. There are 20 distinct 2-uniform tilings of the plane. Plane being the universal cover of torus and Klein bottle, it is natural to ask about the exploration of maps on these two surfaces corresponding to the 2-uniform tilings. We call such maps as doubly semiequivelar maps. In the present study, we compute and classify (up to isomorphism) doubly semiequivelar maps on torus and Klein bottle. This classification of semiequivelar maps is useful in classifying a category of symmetrical maps which have two orbits of vertices, named as 2-uniform maps.

Published in Journal of Mathematics

ISSN: 2314-4629 (Print); 2314-4785 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/1469

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