The dense packing of microscopic spheres (atoms) is the basic geometric arrangement in crystals of mono-atomic elements with weak covalent bonds, which achieves the optimal "known density" of B/O18. In 1611, Johannes Kepler had already "conjectured" that B/O18 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/O18 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 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.
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The book presents an expostition of the ideas suggested by W Y Hsiang to prove this interesting and difficult conjecture. -- Mathematics Abstracts
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Inside This Book
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First Sentence:
Among all the kinds of geometric shapes, the sphere is clearly the most beautiful and useful. Read the first page Key Phrases - Capitalized Phrases (CAPs): (learn more)
Kepler's Conjecture, Proof Let, Proof Set, Definition Let, Proof Note New!
Concordance | Text Stats Browse Sample Pages:
Front Cover | Table of Contents | First Pages | Index | Back Cover | Surprise Me!
Among all the kinds of geometric shapes, the sphere is clearly the most beautiful and useful. Read the first page Key Phrases - Capitalized Phrases (CAPs): (learn more)
Kepler's Conjecture, Proof Let, Proof Set, Definition Let, Proof Note New!
Concordance | Text Stats Browse Sample Pages:
Front Cover | Table of Contents | First Pages | Index | Back Cover | Surprise Me!
Citations (learn more)
This book cites 5
books:
- Lectures on Chern-Weil Theory and Witten Deformations by Weiping Zhang in Front Matter
- Sphere Packings (Universitext) by Chuanming Zong in Back Matter
- Sphere Packings, Lattices and Groups (Grundlehren der mathematischen Wissenschaften) (v. 290) by John Horton Conway in Back Matter
- Scissors Congruences, Group Homology and Characteristic Classes (Nankai Tracts in Mathematics, V. 1.) by Johan L. Dupont in Front Matter
- Packing and Covering (Cambridge Tracts in Mathematics and Mathematical Physics 54) by C. A.. Rogers in Back Matter
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