Fixed-point-free space group
From Online Dictionary of Crystallography
Revision as of 15:03, 10 April 2017 by MassimoNespolo (talk | contribs) (→See also: 6th edition of ITA)
Revision as of 15:03, 10 April 2017 by MassimoNespolo (talk | contribs) (→See also: 6th edition of ITA)
Space groups with no special Wyckoff positions (i.e. with no special crystallographic orbits) are called fixed-point-free space groups or torsion-free space groups or Bieberbach groups. In fixed-point-free space groups every element other than the identity has infinite order.
Fixed-point-free space groups in E2
Only two fixed-point-free space groups exist in E2: p1 and pg.
Fixed-point-free space groups in E3
Thirteen fixed-point-free space groups exist in E3: P1, P21, Pc, Cc, P212121, Pca21, Pna21, P41, P43, P31, P32, P61, P65.
See also
- crystallographic orbit
- point configuration
- Wyckoff position
- Section 1.4.4.2 of the International Tables of Crystallography, Volume A, 6th edition