Packing, Tiling, and Covering with Tetrahedra

Packing, Tiling, and Covering with Tetrahedra

It is well known that three-dimensional Euclidean space cannot be tiled by regular tetrahedra. But how well can we do? In this work, we give several constructions that may answer the various senses of this question. In so doing, we provide some solutions to packing, tiling, and covering problems of...

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Veröffentlicht in:Proceedings of the National Academy of Sciences - PNAS 2006-07, Vol.103 (28), p.10612-10617
Hauptverfasser: Conway, J. H., Torquato, S.
Format: Artikel
Sprache:eng
Schlagworte:
Bubbles
Coordinate systems
Density
Euclidean space
Icosahedrons
Mathematical lattices
Octahedrons
Packing density
Physical Sciences
Studies
Symmetry
Tessellations
Tetrahedra
Tetrahedrons
Vertices
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Zusammenfassung:It is well known that three-dimensional Euclidean space cannot be tiled by regular tetrahedra. But how well can we do? In this work, we give several constructions that may answer the various senses of this question. In so doing, we provide some solutions to packing, tiling, and covering problems of tetrahedra. Our results suggest that the regular tetrahedron may not be able to pack as densely as the sphere, which would contradict a conjecture of Ulam. The regular tetrahedron might even be the convex body having the smallest possible packing density.
ISSN:0027-8424
1091-6490
DOI:10.1073/pnas.0601389103