Bases, lattices, Bravais lattices and other classifications

International Tables for Crystallography (2006). Vol. A. ch. 9.1, pp. 742-749
https://doi.org/10.1107/97809553602060000517

Chapter 9.1. Bases, lattices, Bravais lattices and other classifications

Basis

crystallographic, conventional, primitive 9.1.1, 9.1.4, 9.1.4, 9.1.5, 9.1.5, 9.1.5, 9.1.5, 9.1.7

of a lattice 9.1.2, 9.1.5

reduced 9.1.4

Bravais

(type of) lattice 9.1.6, 9.1.6

Cell

centred and primitive 9.1.4

conventional 9.1.4

reduced 9.1.4

Centred cell and lattice 9.1.4

Conventional basis, cell, coordinate system and origin 9.1.4, 9.1.4, 9.1.4, 9.1.5

Crystal

family 9.1.6

Crystallographic

basis, coordinate system and origin 9.1.1, 9.1.4, 9.1.5

Delaunay reduction and sorts 9.1.8

Dirichlet domain 9.1.3

Domain of influence 9.1.3, 9.1.3, 9.1.7

Eisenstein–Niggli reduction 9.1.8

Holohedry and holohedral point group 9.1.4

Lattice

parameters 9.1.4

topological properties of 9.1.3

type (Bravais type) 9.1.6

Matrix

of metrical coefficients (metric tensor) 9.1.1, 9.1.7.1

Metrical conventions for labelling of axes 9.1.1

Metric tensor 9.1.1, 9.1.7

Primitive basis, cell and lattice 9.1.5, 9.1.5, 9.1.7

Reduced basis and cell 9.1.4, 9.1.4

S centring 9.1.4

Selling–Delaunay reduction 9.1.8

Symmetrische Sorten 9.1.6, 9.1.8, 9.1.8.1

Topological properties of lattices 9.1.3

Translation

subgroup of a space group 9.1.6

Type

of lattice (Bravais type) 9.1.6, 9.1.6

Unit cell 9.1.2

Voronoi domain and Voronoi type 9.1.3, 9.1.6, 9.1.8

Wigner–Seitz cell 9.1.3

Wirkungsbereich (domain of influence) 9.1.3