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Results for DC.creator="B." AND DC.creator="Souvignier" in section 1.3.3 of volume A |
Symmorphic and non-symmorphic space groups
International Tables for Crystallography (2016). Vol. A, Section 1.3.3.3, p. 31 [ doi:10.1107/97809553602060000921 ]
... corresponding rotation symbol N and every glide reflection symbol a, b, c, d, e, n by the symbol m for a ...
Coset decomposition with respect to the translation subgroup
International Tables for Crystallography (2016). Vol. A, Section 1.3.3.2, pp. 29-31 [ doi:10.1107/97809553602060000921 ]
Coset decomposition with respect to the translation subgroup 1.3.3.2. Coset decomposition with respect to the translation subgroup The translation subgroup of a space group can be used to distribute the operations of into different classes by grouping together all operations that differ only by a translation. This results in the decomposition ...
Point groups of space groups
International Tables for Crystallography (2016). Vol. A, Section 1.3.3.1, pp. 28-29 [ doi:10.1107/97809553602060000921 ]
Point groups of space groups 1.3.3.1. Point groups of space groups The multiplication rule for symmetry operations shows that the mapping which assigns a space-group operation to its linear part is actually a group homomorphism, because the first component of the combined operation is simply the product of the linear ...
The structure of space groups
International Tables for Crystallography (2016). Vol. A, Section 1.3.3, pp. 28-31 [ doi:10.1107/97809553602060000921 ]
... corresponding rotation symbol N and every glide reflection symbol a, b, c, d, e, n by the symbol m for a ...
International Tables for Crystallography (2016). Vol. A, Section 1.3.3.3, p. 31 [ doi:10.1107/97809553602060000921 ]
... corresponding rotation symbol N and every glide reflection symbol a, b, c, d, e, n by the symbol m for a ...
Coset decomposition with respect to the translation subgroup
International Tables for Crystallography (2016). Vol. A, Section 1.3.3.2, pp. 29-31 [ doi:10.1107/97809553602060000921 ]
Coset decomposition with respect to the translation subgroup 1.3.3.2. Coset decomposition with respect to the translation subgroup The translation subgroup of a space group can be used to distribute the operations of into different classes by grouping together all operations that differ only by a translation. This results in the decomposition ...
Point groups of space groups
International Tables for Crystallography (2016). Vol. A, Section 1.3.3.1, pp. 28-29 [ doi:10.1107/97809553602060000921 ]
Point groups of space groups 1.3.3.1. Point groups of space groups The multiplication rule for symmetry operations shows that the mapping which assigns a space-group operation to its linear part is actually a group homomorphism, because the first component of the combined operation is simply the product of the linear ...
The structure of space groups
International Tables for Crystallography (2016). Vol. A, Section 1.3.3, pp. 28-31 [ doi:10.1107/97809553602060000921 ]
... corresponding rotation symbol N and every glide reflection symbol a, b, c, d, e, n by the symbol m for a ...
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