The dense packing of microscopic spheres (i.e. atoms) is the basic geometric arrangement in crystals of mono-atomic elements with weak covalent bonds, which achieves the optimal "known density" of B/?18. In 1611, Johannes Kepler had already "conjectured" that B/?18 should be the optimal "density" of sphere packings. Thus, the central problems in the study of sphere packings are the proof of Kepler's conjecture that B/?18 is the optimal density, and the establishing of the least action principle that the hexagonal dense packings in crystals are the geometric consequence of optimization of density. This important book provides a self-contained proof of both, using vector algebra and spherical geometry as the main techniques and in the tradition of classical geometry.
| ISBN: | 9789810246709 |
| Publication date: | 26th December 2001 |
| Author: | WuYi Hsiang |
| Publisher: | World Scientific Publishing an imprint of World Scientific |
| Format: | Hardback |
| Pagination: | 402 pages |
| Series: | Nankai Tracts in Mathematics |
| Genres: |
Geometry |