scientific article; zbMATH DE number 6151046
From MaRDI portal
Publication:4913364
zbMath1274.52026MaRDI QIDQ4913364
Publication date: 5 April 2013
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
geodesicsball packingThurston geometriescompact spaceformnon-Euclidean crystallographyprojective metric 3-sphereThurston conjecturetranslation curves
Related Items (22)
Interior angle sums of geodesic triangles in $S^2 \times R$ and $H^2 \times R$ geometries ⋮ All Dehn Fillings of the Whitehead Link Complement are Tetrahedron Manifolds ⋮ Non-periodic geodesic ball packings generated by infinite regular prism tilings in \(\widetilde{\mathbf{SL}_2\mathbf{R}}\) space ⋮ Hyperbolic Space Forms with Crystallographic Applications and Visualizations ⋮ Infinite series of compact hyperbolic manifolds, as possible crystal structures ⋮ The sum of the interior angles in geodesic and translation triangles of Sl2(R)~ geometry ⋮ Simson-Wallace locus in \(d\)-dimensional projective-metric space ⋮ Geodesic and translation ball packings generated by prismatic tessellations of the universal cover of \(\mathrm{SL}_2(\mathbb R)\) ⋮ New horoball packing density lower bound in hyperbolic 5-space ⋮ New lower bounds for optimal horoball packing density in hyperbolic \(n\)-space for \(6\le n\le 9\) ⋮ Fibre-like cylinders, their packings and coverings in \(\widetilde{\mathbf{SL}_2 \mathbf{R}}\) space ⋮ Translation-like isoptic surfaces and angle sums of translation triangles in \(\mathbf{Nil}\) geometry ⋮ Isoptic surfaces of segments in \(\mathbf{S}^2 \times \mathbf{R}\) and \(\mathbf{H}^2 \times \mathbf{R}\) geometries ⋮ On Menelaus' and Ceva's theorems in \textbf{Nil} geometry ⋮ Nil geodesic triangles and their interior angle sums ⋮ Some tetrahedron manifolds with Sol geometry and related groups ⋮ New lower bound for the optimal ball packing density in hyperbolic 4-space ⋮ Unnamed Item ⋮ Packings by translation balls in \({\widetilde{{\mathrm {SL}}_2(\mathbb{R})}}\) ⋮ Regular prism tilings in \(\widetilde{\mathbf{SL}_2\mathbf R}\) space ⋮ Some characterization of curves in \(\widetilde{\mathbf{SL}_2\mathbb{R}}\) space ⋮ Isoptic curves of generalized conic sections in the hyperbolic plane
This page was built for publication:
