In this work we consider tessellations (or tilings) of the hyperbolic plane by copies of a semi-regular polygon with alternating angles and we study the behavior of the growth of the polygons, edges, and vertices when the distance increase from a fixed initial polygon
A coloring of a semi-regular tiling is perfect if every symmetry of the tiling permutes the colors o...
AbstractLet I be a homogeneous tiling of H2 whose growth from an initial configuration by the accret...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
A tessellation is understood to be a 1-ended, locally finite, locally cofinite, 3-connected planar m...
For any given regular {p, q} tessellation in the hyperbolic plane, we compute the number of vertices...
AbstractFor any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of v...
AbstractA tessellation is taken to be an infinite, 1-ended, 3-connected, locally finite, and locally...
In 3- and 4-dimensional hyperbolic spaces there are four, respectively five, regular mosaics with bo...
For any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of vertices ...
AbstractFor any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of v...
AbstractWe investigate further the concept of asymptotic connectivity as defined previously by the f...
In this note we show how the semi-regular tessellations can be enumerated. We describe only the appr...
If \Gamma is a planar, locally finite, vertex transitive, 1-ended graph, then there is a particular ...
Paul Gunther (1966), proved the following result: Given a continuous function f on a compact surface...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
A coloring of a semi-regular tiling is perfect if every symmetry of the tiling permutes the colors o...
AbstractLet I be a homogeneous tiling of H2 whose growth from an initial configuration by the accret...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
A tessellation is understood to be a 1-ended, locally finite, locally cofinite, 3-connected planar m...
For any given regular {p, q} tessellation in the hyperbolic plane, we compute the number of vertices...
AbstractFor any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of v...
AbstractA tessellation is taken to be an infinite, 1-ended, 3-connected, locally finite, and locally...
In 3- and 4-dimensional hyperbolic spaces there are four, respectively five, regular mosaics with bo...
For any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of vertices ...
AbstractFor any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of v...
AbstractWe investigate further the concept of asymptotic connectivity as defined previously by the f...
In this note we show how the semi-regular tessellations can be enumerated. We describe only the appr...
If \Gamma is a planar, locally finite, vertex transitive, 1-ended graph, then there is a particular ...
Paul Gunther (1966), proved the following result: Given a continuous function f on a compact surface...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
A coloring of a semi-regular tiling is perfect if every symmetry of the tiling permutes the colors o...
AbstractLet I be a homogeneous tiling of H2 whose growth from an initial configuration by the accret...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
DOI
Add to ORKG