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.
€204.99
Taal Engels ● Formaat PDF ● Pagina’s 424 ● ISBN 9789812384911 ● Bestandsgrootte 15.3 MB ● Uitgeverij World Scientific Publishing Company ● Stad Singapore ● Land SG ● Gepubliceerd 2001 ● Downloadbare 24 maanden ● Valuta EUR ● ID 2445002 ● Kopieerbeveiliging Adobe DRM
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