English

Hard sphere packings within cylinders

Soft Condensed Matter 2016-02-24 v1

Abstract

The packing of hard spheres (HS) of diameter σ\sigma in a cylinder has been used to model experimental systems, such as fullerenes in nanotubes and colloidal wire assembly. Finding the densest packings of HS under this type of confinement, however, grows increasingly complex with the cylinder diameter, DD. Little is thus known about the densest achievable packings for D>2.873σD>2.873\sigma. In this work, we extend the identification of the packings up to D=4.00σD=4.00\sigma by adapting Torquato-Jiao's adaptive-shrinking-cell formulation and sequential-linear-programming (SLP) technique. We identify 17 new structures, almost all of them chiral. Beyond D2.85σD\approx2.85\sigma, most of the structures consist of an outer shell and an inner core that compete for being close packed. In some cases, the shell adopts its own maximum density configuration, and the stacking of core spheres within it is quasiperiodic. In other cases, an interplay between the two components is observed, which may result in simple periodic structures. In yet other cases, the very distinction between core and shell vanishes, resulting in more exotic packing geometries, including some that are three-dimensional extensions of structures obtained from packing hard disks in a circle.

Keywords

Cite

@article{arxiv.1511.08472,
  title  = {Hard sphere packings within cylinders},
  author = {Lin Fu and William Steinhardt and Hao Zhao and Joshua E. S. Socolar and Patrick Charbonneau},
  journal= {arXiv preprint arXiv:1511.08472},
  year   = {2016}
}

Comments

11 pages, 11 figures

R2 v1 2026-06-22T11:55:07.035Z