Truncated Dodecahedron

Electronic Geometry Model No. 2001.02.064

Author

Martin Henk

Description

Densest lattice packing of a truncated dodecahedron

The truncated dodecahedron has 60 vertices, 90 edges and 32 facets, 12 decagons and 20 triangles. It is one of the thirteen Archimedean solids and its dual is called triakis icosahedron. It was rediscovered during th 15th century by the outstanding artist Piero della Francesca.

The density of a densest lattice packing was calculated with the algorithm of Betke and Henk. The density is equal to 0.8977..., and the 12 points in the picture show the lattice points of a critical lattice lying in the boundary.

Model produced with: JavaView v2.00.a11

Keywords		lattice packings; polytopes; packings; critical lattice; truncated dodecahedron
MSC-2000 Classification		52C17 (11H31)

References

Ulrich Betke and Martin Henk: Densest lattice packings of 3-polytopes, Comp. Geom. 16, 3 (2000), 157 - 186.

Files

Master File: truncated_dodecahedron_Master.jvx
Applet File: truncated_dodecahedron_Master.jvx

Gif-file was produced by Povray 3.02

Author's Address

Martin Henk

University of Magdeburg
Department of Mathematics
Universitätsplatz 2
D-39106 Magdeburg
henk@mail.math.uni-magdeburg.de
http://www.math.uni-magdeburg.de/~henk