Add to ORKGSommerville [10] and Davies [2] classified the spherical triangles that can tile the sphere in an edge-to-edge fashion. Relaxing this condition yields other triangles, which tile the sphere but have some tiles intersecting in partial edges. This paper determines which right spherical triangles within certain families can tile the sphere
In 1918, K. Reinhardt discovered five different families of convex pentagons that could tile the pla...
Abstract. The question of how many regular unit tetrahedra with a vertex at the origin can be packed...
AbstractIn this paper we prove that one can only tile a triangle with tiles all congruent to each ot...
Sommerville [10] and Davies [2] classified the spherical triangles that can tile the sphere in an 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...
A triangulation of the sphere is combinatorially convex if each vertex is shared by no more than six...
In this paper we present the study of dihedral f-tilings by spherical right triangles on two distinc...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
The tilings of the 2-dimensional sphere by congruent triangles have been extensively studied, and th...
There is only one type of tilings of the sphere by 12 congruent pentagons. These tilings are isohedr...
The edge-to-edge tilings of the sphere by congruent quadrilaterals of Type $a^2bc$ are classified as...
We prove that the plane can be tiled with equilateral triangles and regular hexagons of integer sid...
In 1918, K. Reinhardt discovered five different families of convex pentagons that could tile the pla...
In 1918, K. Reinhardt discovered five different families of convex pentagons that could tile the pla...
Abstract. The question of how many regular unit tetrahedra with a vertex at the origin can be packed...
AbstractIn this paper we prove that one can only tile a triangle with tiles all congruent to each ot...
Sommerville [10] and Davies [2] classified the spherical triangles that can tile the sphere in an 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...
A triangulation of the sphere is combinatorially convex if each vertex is shared by no more than six...
In this paper we present the study of dihedral f-tilings by spherical right triangles on two distinc...
We give examples of monohedral tilings of the 2-dimensional sphere by quadrangles, three of whose ed...
The tilings of the 2-dimensional sphere by congruent triangles have been extensively studied, and th...
There is only one type of tilings of the sphere by 12 congruent pentagons. These tilings are isohedr...
The edge-to-edge tilings of the sphere by congruent quadrilaterals of Type $a^2bc$ are classified as...
We prove that the plane can be tiled with equilateral triangles and regular hexagons of integer sid...
In 1918, K. Reinhardt discovered five different families of convex pentagons that could tile the pla...
In 1918, K. Reinhardt discovered five different families of convex pentagons that could tile the pla...
Abstract. The question of how many regular unit tetrahedra with a vertex at the origin can be packed...
AbstractIn this paper we prove that one can only tile a triangle with tiles all congruent to each ot...