International Tables for Crystallography (2006). Vol. B. ch. 1.5, pp. 162-188
https://doi.org/10.1107/97809553602060000553 |
Chapter 1.5. Crystallographic viewpoints in the classification of space-group representations
Chapter index
Adjusted coefficients 1.5.4.2
Affine space-group type 1.5.3.2
Arithmetic crystal class 1.5.3.2
Arms of star 1.5.3.4
Asymmetric unit 1.5.4.2
Bases
primitive 1.5.3.2
Basic domain 1.5.4.2
Brillouin zone
first 1.5.3.4
Column part 1.5.3.2
Completely reducible matrix group 1.5.3.1
Conventional coefficients 1.5.4.2
Crystal class, arithmetic 1.5.3.2
Dimension of a representation 1.5.3.1
Direct space 1.5.3.2
Equivalent matrix groups 1.5.3.1
Field of a k vector 1.5.5.3
Finite space group 1.5.3.3
First Brillouin zone 1.5.3.4
Fundamental region 1.5.3.4
General k vector 1.5.3.4
Holohedral point group 1.5.4.2
Holosymmetric space group 1.5.4.2
Homomorphism 1.5.3.1
Ideal crystal 1.5.3.2
Irreducible matrix group 1.5.3.1
Irreps 1.5.2
Isomorphism 1.5.3.1
Little group 1.5.3.4
Matrix groups 1.5.3.1
completely reducible 1.5.3.1
equivalent 1.5.3.1
irreducible 1.5.3.1
reducible 1.5.3.1
unitary 1.5.3.1
Matrix part 1.5.3.2
Minimal domain 1.5.4.2
Multiplicity 1.5.4.3
Orbit of k 1.5.3.4
Periodicity 1.5.3.2
Primitive basis 1.5.3.2
Primitive coefficients 1.5.4.2
Real crystal 1.5.3.2
Reducible matrix group 1.5.3.1
Representation, irreducible 1.5.3.1
Representation domain 1.5.4.2
Site-symmetry group 1.5.4.2
Special k vector 1.5.3.4
Symmetry 1.5.3.1
Symmetry group 1.5.3.1
Symmetry operation 1.5.3.1
Symmorphic space groups 1.5.3.2
Translation lattice 1.5.3.2
Uni-arm k vector 1.5.4.3
Unitary matrix group 1.5.3.1
Vector lattice 1.5.3.2
Wigner–Seitz cell 1.5.3.4
Wintgen letter 1.5.4.3
Wintgen position 1.5.4.3
Wintgen symbol 1.5.4.3
Wyckoff letter 1.5.4.2
Wyckoff position 1.5.4.2