International
Tables for
Crystallography
Volume A
Space-group symmetry
Edited by Th. Hahn

© International Union of Crystallography 2006
International Tables for Crystallography (2006). Vol. A. ch. 10.1, pp. 762-803
https://doi.org/10.1107/97809553602060000520

Chapter 10.1. Crystallographic and noncrystallographic point groups

Th. Hahna* and H. Klappera

a Institut für Kristallographie, Rheinisch-Westfälische Technische Hochschule, Aachen, Germany
Correspondence e-mail:  hahn@xtl.rwth-aachen.de

References

First citation Burzlaff, H. & Zimmermann, H. (1977). Symmetrielehre, especially ch. II.3. Stuttgart: Thieme.Google Scholar
 First citation Coxeter, H. S. M. (1973). Regular polytopes, 3rd ed. New York: Dover.Google Scholar
 First citation Fischer, W., Burzlaff, H., Hellner, E. & Donnay, J. D. H. (1973). Space groups and lattice complexes. NBS Monograph No. 134, especially pp. 28–33. Washington, DC: National Bureau of Standards.Google Scholar
 First citation Friedel, G. (1926). Leçons de cristallographie. Nancy/Paris/Strasbourg: Berger-Levrault. [Reprinted (1964). Paris: Blanchard.]Google Scholar
 First citation Groth, P. (1921). Elemente der physikalischen und chemischen Kristallographie. München: Oldenbourg.Google Scholar
 First citation Niggli, A. (1963). Zur Topologie, Metrik und Symmetrie der einfachen Kristallformen. Schweiz. Mineral. Petrogr. Mitt. 43, 49–58.Google Scholar
 First citation Niggli, P. (1941). Lehrbuch der Mineralogie und Kristallchemie, 3rd ed. Berlin: Borntraeger.Google Scholar
 First citation Nowacki, W. (1933). Die nichtkristallographischen Punktgruppen. Z. Kristallogr. 86, 19–31.Google Scholar
 First citation Shubnikov, A. V. & Koptsik, V. A. (1974). Symmetry in science and art, especially chs. 2 and 3. New York: Plenum.Google Scholar
 First citation Vainshtein, B. K. (1994). Modern crystallography. I. Symmetry of crystals. Methods of structural crystallography, 2nd ed., especially ch. 2.6. Berlin: Springer.Google Scholar