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The role of normalizers for group-subgroup pairs of space groups
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6.3, pp. 19-20 [ doi:10.1107/97809553602060000791 ]
The role of normalizers for group-subgroup pairs of space groups 1.2.6.3. The role of normalizers for group-subgroup pairs of space groups In Section 1.2.4.5, the normalizer of a subgroup in the group was defined. The equation holds, i.e. is a normal subgroup of . The normalizer , by its index ...
Definitions and examples
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6.2, pp. 18-19 [ doi:10.1107/97809553602060000791 ]
Definitions and examples 1.2.6.2. Definitions and examples `Maximal subgroups' have been introduced by Definition 1.2.4.1.2. The importance of this definition will become apparent in the corollary to Hermann's theorem, cf. Lemma 1.2.8.1.3. In this volume only the maximal subgroups are listed for any plane and any space group. A maximal ...
Introductory remarks
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6.1, p. 18 [ doi:10.1107/97809553602060000791 ]
Introductory remarks 1.2.6.1. Introductory remarks Group-subgroup relations form an essential part of the applications of space-group theory. Let be a space group and a proper subgroup of . All maximal subgroups of any space group are listed in Part 2 of this volume. There are different kinds of subgroups ...
Types of subgroups of space groups
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6, pp. 18-20 [ doi:10.1107/97809553602060000791 ]
Types of subgroups of space groups 1.2.6. Types of subgroups of space groups 1.2.6.1. Introductory remarks | | Group-subgroup relations form an essential part of the applications of space-group theory. Let be a space group and a proper subgroup of . All maximal subgroups of any space group are listed in ...
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6.3, pp. 19-20 [ doi:10.1107/97809553602060000791 ]
The role of normalizers for group-subgroup pairs of space groups 1.2.6.3. The role of normalizers for group-subgroup pairs of space groups In Section 1.2.4.5, the normalizer of a subgroup in the group was defined. The equation holds, i.e. is a normal subgroup of . The normalizer , by its index ...
Definitions and examples
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6.2, pp. 18-19 [ doi:10.1107/97809553602060000791 ]
Definitions and examples 1.2.6.2. Definitions and examples `Maximal subgroups' have been introduced by Definition 1.2.4.1.2. The importance of this definition will become apparent in the corollary to Hermann's theorem, cf. Lemma 1.2.8.1.3. In this volume only the maximal subgroups are listed for any plane and any space group. A maximal ...
Introductory remarks
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6.1, p. 18 [ doi:10.1107/97809553602060000791 ]
Introductory remarks 1.2.6.1. Introductory remarks Group-subgroup relations form an essential part of the applications of space-group theory. Let be a space group and a proper subgroup of . All maximal subgroups of any space group are listed in Part 2 of this volume. There are different kinds of subgroups ...
Types of subgroups of space groups
International Tables for Crystallography (2011). Vol. A1, Section 1.2.6, pp. 18-20 [ doi:10.1107/97809553602060000791 ]
Types of subgroups of space groups 1.2.6. Types of subgroups of space groups 1.2.6.1. Introductory remarks | | Group-subgroup relations form an essential part of the applications of space-group theory. Let be a space group and a proper subgroup of . All maximal subgroups of any space group are listed in ...
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