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Maximum density space packing with congruent circular cylinders of infinite length

Published online by Cambridge University Press:  26 February 2010

A. Bezdek
Affiliation:
Mathematical Institute of the Hungarian Academy of Sciences, Budapest, P.O.B. 127, H-1364, Hungary.
W. Kuperberg
Affiliation:
Division of Mathematics, F.A.T., Auburn University, Auburn, AL 36849, U.S.A.
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Abstract

We determine what is the maximum possible (by volume) portion of the three-dimensional Euclidean space that can be occupied by a family of non-overlapping congruent circular cylinders of infinite length in both directions. We show that the ratio of that portion to the whole of the space cannot exceed π/√12 and it attains π/√12 when all cylinders are parallel to each other and each of them touches six others. In the terminology of the theory of packings and coverings, we prove that the space packing density of the cylinder equals π/√12, the same as the plane packing density of the circular disk.

Type
Research Article
Copyright
Copyright © University College London 1990

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References

1.Bezdek, A. and Kuperberg, W.. Placing and moving spheres in the gaps of a cylinder packing. Elemente der Mathematik. To appear.Google Scholar
2.Tóth, L. Fejes. Regular Figures (Pergamon Press, Oxford, 1964).Google Scholar
3.Kuperberg, K.. A nonparallel cylinder packing with positive density (1988) (pre-print).Google Scholar
4.Thue, A.. Über die dichteste Zusammenstellung von kongruenten Kreisen in der Ebene. Christiania Vid. Selsk. Skr., 1 (1910), 39.Google Scholar