AbstractFor any given regular {p,q} tessellation in the hyperbolic plane, we compute the number of vertices and tiles to be found as we distance from a given point, enabling a complete characterization of the asymptotic behavior
This Licentiate thesis deals with hyperbolic type geometries in planar subdomains. It is known that...
The aim of this paper is to determine the elements which are in two pairs of sequences linked to th...
We study colorings of the hyperbolic plane, analogously to the Hadwiger-Nelson problem for the Eucli...
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...
For any given regular {p, q} tessellation in the hyperbolic plane, we compute the number of vertices...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
AbstractA tessellation is taken to be an infinite, 1-ended, 3-connected, locally finite, and locally...
AbstractA tessellation is taken to be an infinite, 1-ended, 3-connected, locally finite, and locally...
In this work we consider tessellations (or tilings) of the hyperbolic plane by copies of a semi-regu...
A tessellation is understood to be a 1-ended, locally finite, locally cofinite, 3-connected planar m...
In this paper, we remind previous results about the tilings {p,q} of the hyperbolic plane. As proved...
AbstractWe investigate further the concept of asymptotic connectivity as defined previously by the f...
An isohedral tiling is a tiling of congruent polygons that are also transitive, which is to say the ...
This Licentiate thesis deals with hyperbolic type geometries in planar subdomains. It is known that...
The aim of this paper is to determine the elements which are in two pairs of sequences linked to th...
We study colorings of the hyperbolic plane, analogously to the Hadwiger-Nelson problem for the Eucli...
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...
For any given regular {p, q} tessellation in the hyperbolic plane, we compute the number of vertices...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
We consider regular tessellations of the plane as infinite graphs in which q edges and q faces meet ...
AbstractA tessellation is taken to be an infinite, 1-ended, 3-connected, locally finite, and locally...
AbstractA tessellation is taken to be an infinite, 1-ended, 3-connected, locally finite, and locally...
In this work we consider tessellations (or tilings) of the hyperbolic plane by copies of a semi-regu...
A tessellation is understood to be a 1-ended, locally finite, locally cofinite, 3-connected planar m...
In this paper, we remind previous results about the tilings {p,q} of the hyperbolic plane. As proved...
AbstractWe investigate further the concept of asymptotic connectivity as defined previously by the f...
An isohedral tiling is a tiling of congruent polygons that are also transitive, which is to say the ...
This Licentiate thesis deals with hyperbolic type geometries in planar subdomains. It is known that...
The aim of this paper is to determine the elements which are in two pairs of sequences linked to th...
We study colorings of the hyperbolic plane, analogously to the Hadwiger-Nelson problem for the Eucli...
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