New lower bound for the optimal congruent geodesic ball packing density of screw motion groups in H2\!×\!R space
Abstract
In this paper, we present a new record for the densest geodesic congruent ball packing configurations in H2\!×\!R geometry, generated by screw motion groups. These groups are derived from the direct product of rotational groups on H2 and some translation components on the real fibre direction R that can be determined by the corresponding Frobenius congruences. Moreover, we developed a procedure to determine the optimal radius for the densest geodesic ball packing configurations related to the considered screw motion groups. The highest packing density, ≈0.80529, is achieved by a multi-transitive case given by rotational parameters (2,20,4). E. Moln\'ar demonstrated that homogeneous 3-spaces can be uniformly interpreted in the projective 3-sphere PS3(V4, V4, R). We use this projective model of H2\!×\!R to compute and visualize the locally optimal geodesic ball arrangements.
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