• PART 1: SPACE GROUPS AND THEIR SUBGROUPS
  • 1.1. Historical introduction (M. I. Aroyo, U. Müller and H. Wondratschek)
  • 1.2. General introduction to the subgroups of space groups (H. Wondratschek)
  • 1.3. Remarks on Wyckoff positions (U. Müller)
  • 1.4. Computer checking of the subgroup data (F. Gähler)
  • 1.5. The mathematical background of the subgroup tables (G. Nebe)

• PART 2: MAXIMAL SUBGROUPS OF THE PLANE GROUPS AND SPACE GROUPS
  • 2.1. Guide to the subgroup tables and graphs (H. Wondratschek and M. I. Aroyo)
  • 2.2. Tables of maximal subgroups of the plane groups (Y. Billiet, M. I. Aroyo and H. Wondratschek)
  • 2.3. Tables of maximal subgroups of the space groups (Y. Billiet, M. I. Aroyo and H. Wondratschek)
  • 2.4. Graphs for translationengleiche subgroups (V. Gramlich and H. Wondratschek)
  • 2.5. Graphs for klassengleiche subgroups (V. Gramlich and H. Wondratschek)

• PART 3: RELATIONS BETWEEN THE WYCKOFF POSITIONS
  • 3.1. Guide to the tables (U. Müller)
  • 3.2. Tables of the relations of the Wyckoff positions (U. Müller)

• Appendix. Differences in the presentation of Parts 2 and 3 (U. Müller and H. Wondratschek)

• References

• Subject index

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