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- Title
Non-Crystallographic Symmetry in Packing Spaces.
- Authors
Rau, Valery G.; Lomtev, Leonty A.; Rau, Tamara F.
- Abstract
In the following, isomorphism of an arbitrary finite group of symmetry, non-crystallographic symmetry (quaternion groups, Pauli matrices groups, and other abstract subgroups), in addition to the permutation group, are considered. Application of finite groups of permutations to the packing space determines space tilings by policubes (polyominoes) and forms a structure. Such an approach establishes the computer design of abstract groups of symmetry. Every finite discrete model of the real structure is an element of symmetry groups, including non-crystallographic ones. The set packing spaces of the same order N characterizes discrete deformation transformations of the structure.
- Subjects
TILING spaces; SYMMETRY groups; PAULI matrices; DIRAC function; QUATERNION functions; CAYLEY graphs; POLYOMINOES
- Publication
Symmetry (20738994), 2013, Vol 5, Issue 1, p54
- ISSN
2073-8994
- Publication type
Article
- DOI
10.3390/sym5010054