arXiv:1712.01122 Abstract | arXiv Analytics

arXiv:1712.01122 [math.MG]Abstract References Reviews Resources

Characterization of the Two-Dimensional Five-Fold Lattice Tiles

Published 2017-12-01Version 1

In 1885, Fedorov discovered that a convex domain can form a lattice tiling of the Euclidean plane if and only if it is a parallelogram or a centrally symmetric hexagon. It is known that there is no other convex domain which can form a two-, three- or four-fold lattice tiling in the Euclidean plane, but there is a centrally symmetric convex decagon which can form a five-fold lattice tiling. This paper characterizes all the convex domains which can form a five-fold lattice tiling of the Euclidean plane.

Comments: 13 pages, 4 figures. arXiv admin note: text overlap with arXiv:1711.02514, arXiv:1710.05506

Categories: math.MG

Subjects: 52C22

Keywords: two-dimensional five-fold lattice tiles, convex domain, euclidean plane, characterization, five-fold lattice tiling

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arXiv:1712.01122 [math.MG]Abstract References Reviews Resources

Characterization of the Two-Dimensional Five-Fold Lattice Tiles

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arXiv:1712.01122 [math.MG]AbstractReferencesReviewsResources

Characterization of the Two-Dimensional Five-Fold Lattice Tiles

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arXiv:1712.01122 [math.MG]Abstract References Reviews Resources