Quotient maps of 2,3-uniform tilings of the plane on the torus

Abstract

A 2-uniform tiling is an edge-to-edge tiling by regular polygons having 2 distinct transitivity classes of vertices. There are 20 distinct 2-uniform tilings (these are of 14 different types) on the plane, and since the plane is the universal cover of the torus, it is natural to explore maps on the torus that correspond to the 2-uniform tilings. In this article, we discuss that if a map is the quotient of a plane's 2-uniform lattice then what would be the bounds of the number of vertex orbits. A 3-uniform tiling is an edge-to-edge tiling by regular polygons having 3 distinct transitivity classes of vertices. There are 61 distinct 3-uniform tilings on the plane. In this article, we discuss that if a map is the quotient of a plane's 3-uniform lattice then what would be the bounds of the number of vertex orbits.

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