Difference between revisions of "Symmorphic space groups"
From Online Dictionary of Crystallography
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* ''hemisymmorphic'': non-[[Sohncke groups]] whose [[site symmetry|site-symmetry group]] of highest order is a a subgroup of index 2 of the point group and contains only operations of the first kind; | * ''hemisymmorphic'': non-[[Sohncke groups]] whose [[site symmetry|site-symmetry group]] of highest order is a a subgroup of index 2 of the point group and contains only operations of the first kind; | ||
* ''asymmorphic'': all the other groups. | * ''asymmorphic'': all the other groups. | ||
− | ''Example''. ''Pmmm'' is a symmorphic type of space group whose site-symmetry group of highest order is of type ''mmm''. Among the other fifteen types of group in the same [[arithmetic crystal class]]. three (''Pnnn'' '' | + | ''Example''. ''Pmmm'' is a symmorphic type of space group whose site-symmetry group of highest order is of type ''mmm''. Among the other fifteen types of group in the same [[arithmetic crystal class]]. three (''Pnnn'' ''Pccm'' and ''Pban'') have a site-symmetry group of highest order of type 222, ''i''.''e''. a subgroup of order two of ''mmm'' that contains only operations of the first kind and are thus hemisymmophic according to Fedorov's definition. The other twelve are asymmorphic. |
== See also == | == See also == |
Revision as of 09:25, 6 April 2016
Groupes d'espaces symorphiques (Fr). Symmorphe Raumgruppen (Ge). Gruppi spaziali simmorfici (It). 共型空間群 (Ja).
Contents
Definition
A space group is called symmorphic if, apart from the lattice translations, all generating symmetry operations leave one common point fixed. Permitted as generators are thus only the point-group operations: rotations, reflections, inversions and rotoinversions. The symmorphic space groups may be easily identified because their Hermann-Mauguin symbol does not contain a glide or screw operation. The combination of the Bravais lattices with symmetry elements with no translational components yields the 73 symmorphic space groups, e.g. P2, Cm, P2/m, P222, P32, P23. They are in one to one correspondence with the arithmetic crystal classes.
A characteristic feature of a symmorphic space group is the existence of a special position, the site-symmetry group of which is isomorphic to the point group to which the space group belongs. Symmorphic space groups have no zonal or serial reflection conditions, but may have integral reflection conditions (e.g. C2, Fmmm).
Note
In the literature sometimes it is found the wrong statement that a symmorphic space group does not contain glide planes or screw axes. This comes from a misunderstanding for the fact that, according to the priority rule, glide planes and screw axes do not appear in the Hermann-Mauguin symbol of the space group, although they can be present in the group. For example, a space group of type Amm2 contains c glides perpendicular to [010] and passing at x,1/4,z as well as two-fold screws parallel to [001] and passing at 0,1/4,z. This is not even limited to space groups with centred conventional cells: for example, a space group of type P422 contains two-fold screws parallel to the two-fold axes.
Subdivision
Fedorov (see B.K. Vainshtein, Fundamentals of Crystals) distinguished non-symmorphic space groups in two types:
- hemisymmorphic: non-Sohncke groups whose site-symmetry group of highest order is a a subgroup of index 2 of the point group and contains only operations of the first kind;
- asymmorphic: all the other groups.
Example. Pmmm is a symmorphic type of space group whose site-symmetry group of highest order is of type mmm. Among the other fifteen types of group in the same arithmetic crystal class. three (Pnnn Pccm and Pban) have a site-symmetry group of highest order of type 222, i.e. a subgroup of order two of mmm that contains only operations of the first kind and are thus hemisymmophic according to Fedorov's definition. The other twelve are asymmorphic.
See also
- Sections 2.2.5 and 8.1.6 of International Tables for Crystallography, Volume A
- Section 1.4 of International Tables for Crystallography, Volume C