Add to ORKGIn this article we show the non-existence of a class of spherical tilings by congruent quadrangles. We also prove several forbidden substructures for spherical tilings by congruent quadrangles. These are results that will help to complete of the classification of spherical tilings by congruent quadrangles
We introduce the notion of a well centered spherical quadrangle or WCSQ for short, describing a geom...
There is only one type of tilings of the sphere by 12 congruent pentagons. These tilings are isohedr...
A spherical quadrangulation is an embedding of a graph G in the sphere in which each facial boundary...
In this article we show the non-existence of a class of spherical tilings by congruent quadrangles. ...
In this article we show the non-existence of a class of spherical tilings by congruent quadrangles. ...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
We develop a systematic method for computing the angle combinations in spherical tilings by angle co...
The edge-to-edge tilings of the sphere by congruent quadrilaterals of Type $a^2bc$ are classified as...
In previous works we have ilustrate a procedure to obtain spherical tiling with GeoGebra. We have fo...
The tilings of the 2-dimensional sphere by congruent triangles have been extensively studied, and th...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
We classify all spherical tilings consisting of congruent right triangles. There exist five sporadic...
We classify all spherical tilings consisting of congruent right triangles. There exist five sporadic...
We classify all spherical tilings consisting of congruent right triangles. There exist five sporadic...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
We introduce the notion of a well centered spherical quadrangle or WCSQ for short, describing a geom...
There is only one type of tilings of the sphere by 12 congruent pentagons. These tilings are isohedr...
A spherical quadrangulation is an embedding of a graph G in the sphere in which each facial boundary...
In this article we show the non-existence of a class of spherical tilings by congruent quadrangles. ...
In this article we show the non-existence of a class of spherical tilings by congruent quadrangles. ...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
We develop a systematic method for computing the angle combinations in spherical tilings by angle co...
The edge-to-edge tilings of the sphere by congruent quadrilaterals of Type $a^2bc$ are classified as...
In previous works we have ilustrate a procedure to obtain spherical tiling with GeoGebra. We have fo...
The tilings of the 2-dimensional sphere by congruent triangles have been extensively studied, and th...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
We classify all spherical tilings consisting of congruent right triangles. There exist five sporadic...
We classify all spherical tilings consisting of congruent right triangles. There exist five sporadic...
We classify all spherical tilings consisting of congruent right triangles. There exist five sporadic...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
We introduce the notion of a well centered spherical quadrangle or WCSQ for short, describing a geom...
There is only one type of tilings of the sphere by 12 congruent pentagons. These tilings are isohedr...
A spherical quadrangulation is an embedding of a graph G in the sphere in which each facial boundary...