Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups

Szirmai, Jenő

Mathematical Communications, Vol. 17 No. 1, 2012.

Original scientific paper

Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups

Jenő Szirmai orcid.org/0000-0001-9610-7993 ; Department of Geometry, Budapest University of Technology and Economics Institute of Mathematics, Budapest, Hungary

Full text: english pdf 2.317 Kb

page 151-170

downloads: 581

cite

APA 6th Edition

Szirmai, J. (2012). Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups. Mathematical Communications, 17 (1), 151-170. Retrieved from https://hrcak.srce.hr/index.php/82993

MLA 8th Edition

Szirmai, Jenő. "Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups." Mathematical Communications, vol. 17, no. 1, 2012, pp. 151-170. https://hrcak.srce.hr/index.php/82993. Accessed 22 Nov. 2024.

Chicago 17th Edition

Szirmai, Jenő. "Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups." Mathematical Communications 17, no. 1 (2012): 151-170. https://hrcak.srce.hr/index.php/82993

Harvard

Szirmai, J. (2012). 'Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups', Mathematical Communications, 17(1), pp. 151-170. Available at: https://hrcak.srce.hr/index.php/82993 (Accessed 22 November 2024)

Vancouver

Szirmai J. Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups. Mathematical Communications [Internet]. 2012 [cited 2024 November 22];17(1):151-170. Available from: https://hrcak.srce.hr/index.php/82993

IEEE

J. Szirmai, "Geodesic ball packings in $\mathbf{H}^2\!\times\!\mathbf{R}$ space for generalized Coxeter space groups", Mathematical Communications, vol.17, no. 1, pp. 151-170, 2012. [Online]. Available: https://hrcak.srce.hr/index.php/82993. [Accessed: 22 November 2024]

Abstract

After having investigated the geodesic ball packings in
$\mathbf{S}^2\!\times\!\mathbf{R}$
space we consider the analogous problem in
$\mathbf{H}^2\!\times\!\mathbf{R}$
space from among the eight Thurston geometries.
In this paper, we determine the geodesic balls of
$\mathbf{H}^2\!\times\!\mathbf{R}$
space and compute their volume,define the notion of the geodesic ball packing and its density.
Moreover, we develop a procedure to determine the density of the geodesic ball packing for generalized Coxeter space groups of
$\mathbf{H}^2\!\times\!\mathbf{R}$
and apply this algorithm to them.
E. Molnár showed that the homogeneous 3-spaces
have a unified interpretation in the projective 3-sphere
$\mathcal{PS}^3(\mathbf{V}^4,\boldsymbol{V}_4, \mathbf{R})$.
In our work we will use this projective model of
$\mathbf{H}^2\!\times\!\mathbf{R}$
geometry and in this manner the geodesic lines, geodesic spheres can be visualized on the Euclidean screen of computer.

Keywords

Thurston geometries; geodesic ball packing; tiling; space group

Hrčak ID:

82993

URI

https://hrcak.srce.hr/82993

Publication date:

12.6.2012.

Visits: 1.243 *

Login and registration

Mathematical Communications, Vol. 17 No. 1, 2012.

Abstract

Keywords

Hrčak ID:

URI

Publication date: