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International Tables for Crystallography (2006). Vol. E. ch. 1.2, pp. 5-28
https://doi.org/10.1107/97809553602060000647 |
Chapter 1.2. Guide to the use of the subperiodic group tables
Chapter index
affine subperiodic group types 1.2.1.1
asymmetric unit 1.2.8
bases
crystallographic 1.2.1.2.1
cell choice 1.2.2.1
enantiomorphic rod-group types 1.2.1.1
enantiomorphic subgroups of lowest index 1.2.15.2
enantiomorphic supergroups of lowest index 1.2.15.4
general-position diagrams 1.2.6
generators 1.2.10
groups
point 1.2.1.2
lattice 1.2.1.2
maximal subgroups 1.2.15
enantiomorphic subgroups of lowest index 1.2.15.2
isotypic subgroups 1.2.15.2
non-isotypic non-enantiomorphic subgroups 1.2.15.1
minimal supergroups 1.2.15
enantiomorphic supergroups of lowest index 1.2.15.4
isotypic supergroups 1.2.15.4
non-isotypic non-enantiomorphic supergroups 1.2.15.3
Nomenclature for subperiodic groups 1.2.16
non-isotypic non-enantiomorphic subgroups 1.2.15.1
non-isotypic non-enantiomorphic supergroups 1.2.15.3
oriented site-symmetry symbols 1.2.12
origin 1.2.7
Patterson symmetry 1.2.5
point group 1.2.1.2
proper affine subperiodic group types 1.2.1.1
Reflection conditions 1.2.13
site-symmetry symbols, oriented 1.2.12
special projections, symmetry of 1.2.14
subgroups and supergroups
enantiomorphic 1.2.15.2
enantiomorphic supergroups of lowest index 1.2.15.4
maximal subgroups 1.2.15
minimal supergroups 1.2.15
subgroups of lowest index 1.2.15.2
subgroups of supergroups 1.2.15
subperiodic group diagrams 1.2.6
for frieze groups 1.2.6
for layer groups 1.2.6
for rod groups 1.2.6
symmetry diagrams 1.2.6
symmetry directions 1.2.4
Symmetry of special projections 1.2.14
symmetry operations 1.2.9
Wyckoff positions 1.2.11