The densest local packings of N three-dimensional identical nonoverlapping spheres within a radius R-min(N) of a fixed central sphere of the same size are obtained for selected values of N up to N = 1054. In the predecessor to this paper [A. B. Hopkins, F. H. Stillinger, and S. Torquato, Phys. Rev. E 81, 041305 (2010)], we described our method for finding the putative densest packings of N spheres in d-dimensional Euclidean space R-d and presented those packings in R-2 for values of N up to N = 348. Here we analyze the properties and characteristics of the densest local packings in R-3 and employ knowledge of the R-min(N), using methods applicable in any d, to construct both a realizability condition for pair correlation functions of sphere packings and an upper bound on the maximal density of infinite sphere packings. In R-3, we find wide variability in the densest local packings, including a multitude of packing symmetries such as perfect tetrahedral and imperfect icosahedral symmetry. We compare the densest local packings of N spheres near a central sphere to minimal-energy configurations of N + 1 points interacting with short-range repulsive and long-range attractive pair potentials, e. g., 12-6 Lennard-Jones, and find that they are in general completely different, a result that has possible implications for nucleation theory. We also compare the densest local packings to finite subsets of stacking variants of the densest infinite packings in R-3 (the Barlow packings) and find that the densest local packings are almost always most similar as measured by a similarity metric, to the subsets of Barlow packings with the smallest number of coordination shells measured about a single central sphere, e. g., a subset of the fcc Barlow packing. Additionally, we observe that the densest local packings are dominated by the dense arrangement of spheres with centers at distance R-min(N). In particular, we find two "maracas" packings at N = 77 and N = 93, each consisting of a few unjammed spheres free to rattle within a "husk" composed of the maximal number of spheres that can be packed with centers at respective R-min(N).

• 出版日期2011-1-31