Difference between revisions of "Direct space"
From Online Dictionary of Crystallography
m (→See also: 6th edition of ITA) |
BrianMcMahon (talk | contribs) (Tidied translations and corrected German (U. Mueller)) |
||
(One intermediate revision by the same user not shown) | |||
Line 1: | Line 1: | ||
− | < | + | <font color="blue">Espace direct</font> (''Fr''). <font color="red">Direkter Raum</font> (''Ge''). <font color="black">Spazio diretto</font> (''It''). <font color="purple">直空間</font> (''Ja''). <font color="green">Espacio directo</font> (''Sp''). |
== Definition == | == Definition == | ||
Line 9: | Line 9: | ||
(i) To any two points ''P'' and ''Q'' of the point space ''E<sup>n</sup>'' a vector '''PQ''' = '''r''' of the vector space | (i) To any two points ''P'' and ''Q'' of the point space ''E<sup>n</sup>'' a vector '''PQ''' = '''r''' of the vector space | ||
− | ''V<sup>n</sup>'' is attached | + | ''V<sup>n</sup>'' is attached. |
(ii) For each point ''P'' of ''E<sup>n</sup>'' and for each vector '''r''' of ''V<sup>n</sup>'' there is exactly one point ''Q'' of | (ii) For each point ''P'' of ''E<sup>n</sup>'' and for each vector '''r''' of ''V<sup>n</sup>'' there is exactly one point ''Q'' of | ||
− | ''E<sup>n</sup>'' for which '''PQ''' = '''r''' holds | + | ''E<sup>n</sup>'' for which '''PQ''' = '''r''' holds. |
− | (iii) If ''R'' is a third point of the point space, '''PQ''' + '''QR''' = '''PR''' | + | (iii) If ''R'' is a third point of the point space, '''PQ''' + '''QR''' = '''PR'''. |
== See also == | == See also == | ||
− | [[ | + | *[[Direct lattice]] |
− | ''International Tables | + | *''International Tables for Crystallography, Volume A'', 6th edition |
[[Category:Fundamental crystallography]] | [[Category:Fundamental crystallography]] |
Latest revision as of 13:47, 10 November 2017
Espace direct (Fr). Direkter Raum (Ge). Spazio diretto (It). 直空間 (Ja). Espacio directo (Sp).
Definition
The direct space (or crystal space) is the point space, En, in which the structures of finite real crystals are idealized as infinite perfect three-dimensional structures. To this space one associates the vector space, Vn, of which lattice and translation vectors are elements. It is a Euclidean space where the scalar product of two vectors is defined. The two spaces are connected through the following relations:
(i) To any two points P and Q of the point space En a vector PQ = r of the vector space Vn is attached.
(ii) For each point P of En and for each vector r of Vn there is exactly one point Q of En for which PQ = r holds.
(iii) If R is a third point of the point space, PQ + QR = PR.
See also
- Direct lattice
- International Tables for Crystallography, Volume A, 6th edition