Volumes and geodesic ball packings to the regular prism tilings in SL2R space

Abstract

After having investigated the regular prisms and prism tilings in the space in the previous work Sz13-1 of the second author, we consider the problem of geodesic ball packings related to those tilings and their symmetry groups pq21. is one of the eight Thurston geometries that can be derived from the 3-dimensional Lie group of all 2× 2 real matrices with determinant one. In this paper we consider geodesic spheres and balls in (even in SL2R), if their radii ∈ [0, π2), and determine their volumes. Moreover, we consider the prisms of the above space and compute their volumes, define the notion of the geodesic ball packing and its density. We develop a procedure to determine the densities of the densest geodesic ball packings for the tilings, or in this paper more precisely, for their generating groups pq21 (for integer rotational parameters p,q; 3 p, 2pp-2 <q). We look for those parameters p and q above, where the packing density large enough as possible. Now our record is 0.567362 for (p, q) = (8, 10). These computations seem to be important, since we do not know optimal ball packing, namely in the hyperbolic space . We know only the density upper bound 0.85326, realized by horoball packing of to its ideal regular simplex tiling. Surprisingly, for the so-called translation ball packings under the same groups pq21 in MSzV13 we have got larger density 0.841700 for (p, q) = (5, 10000 → ∞) close to the above upper bound. We use for the computation and visualization of the space its projective model introduced by the first author in M97.