ISSN:
1600-5724
Source:
Crystallography Journals Online : IUCR Backfile Archive 1948-2001
Topics:
Chemistry and Pharmacology
,
Geosciences
,
Physics
Notes:
A periodic lattice in \bb En is associated with an n-grid and its dual, and with a point symmetry group G. Given a subgroup H of G, a subspace \bb Em, m 〈 n, of \bb En, invariant under H, is chosen and a projection of the n-grid from \bb En to \bb Em is defined. The translational and point symmetries of the projected n-grid are analyzed. A projection of the cubic n-grid from \bb En to \bb En-1 based on H = S(n) yields a periodic n-grid. A projection of the cubic 12-grid from \bb E12 to \bb E3 based on H = A(5) yields a non-periodic 12-grid. This 12- grid is characterized by three real numbers and from its projection has a well defined orientation. The dual to this 12-grid yields a generalization of the non-periodic Penrose patterns from two to three dimensions.
Type of Medium:
Electronic Resource
URL:
http://dx.doi.org/10.1107/S0108767384001203
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