Guide to the use of the scanning tables

Kopskyacute, V.; Litvin, D. B.

doi:10.1107/97809553602060000652

International
Tables for
Crystallography
Volume E
Subperiodic groups
Edited by V. Kopský and D. B. Litvin

pdf | chapter contents | chapter index | related articles

International Tables for Crystallography (2006). Vol. E. ch. 5.2, pp. 393-416 | 1 | 2 |
https://doi.org/10.1107/97809553602060000652

Chapter 5.2. Guide to the use of the scanning tables

V. Kopský^a ^* and D. B. Litvin^b

^a Department of Physics, University of the South Pacific, Suva, Fiji, and Institute of Physics, The Academy of Sciences of the Czech Republic, Na Slovance 2, PO Box 24, 180 40 Prague 8, Czech Republic, and ^bDepartment of Physics, Penn State Berks Campus, The Pennsylvania State University, PO Box 7009, Reading, PA 19610–6009, USA
Correspondence e-mail: kopsky@fzu.cz

References

Davies, B. L. & Dirl, R. (1993a). Space group subgroups generated by sublattice relations: software for IBM-compatible PCs. Anales de Física, Monografías, Vol. 2, edited by M. A. del Olmo, M. Santander & J. M. Mateos Guilarte, pp. 338–341. Madrid: CIEMAT/RSEF.Google Scholar

Davies, B. L. & Dirl, R. (1993b). Space group subgroups, coset decompositions, layer and rod symmetries: integrated software for IBM-compatible PCs. Third Wigner Colloquium, Oxford, September 1993.Google Scholar

Fuksa, J. & Kopský, V. (1993). Layer and rod classes of reducible space groups. II. Z-reducible cases. Acta Cryst. A49, 280–287.Google Scholar

Fuksa, J., Kopský, V. & Litvin, D. B. (1993). Spatial distribution of rod and layer symmetries in a crystal. Anales de Física, Monografías, Vol. 2, edited by M. A. del Olmo, M. Santander & J. M. Mateos Guilarte, pp. 346–369. Madrid: CIEMAT/RSEF.Google Scholar

Guigas, B. (1971). PROSEC. Institut für Kristallographie, Universität Karlsruhe, Germany. Unpublished.Google Scholar

Hirschfeld, F. L. (1968). Symmetry in the generation of trial structures. Acta Cryst. A24, 301–311.Google Scholar

Holser, W. T. (1958a). The relation of structure to symmetry in twinning. Z. Kristallogr. 110, 249–263.Google Scholar

Holser, W. T. (1958b). Point groups and plane groups in a two-sided plane and their subgroups. Z. Kristallogr. 110, 266–281.Google Scholar

International Tables for Crystallography (2005). Vol. A. Space-group symmetry, edited by Th. Hahn. Heidelberg: Springer. [Previous editions: 1983, 1987, 1992, 1995 and 2002. Abbreviated as IT A (2005).]Google Scholar

Janovec, V. (1972). Group analysis of domains and domain pairs. Czech. J. Phys. B, 22, 974–994.Google Scholar

Janovec, V. (1981). Symmetry and structure of domain walls. Ferroelectrics, 35, 105–110.Google Scholar

Janovec, V. & Kopský, V. (1997). Layer groups, scanning tables and the structure of domain walls. Ferroelectrics, 191, 23–28.Google Scholar

Janovec, V., Kopský, V. & Litvin, D. B. (1988). Subperiodic subgroups of space groups. Z. Kristallogr. 185, 282.Google Scholar

Janovec, V., Schranz, W., Warhanek, H. & Zikmund, Z. (1989). Symmetry analysis of domain structure in KSCN crystals. Ferroelectrics, 98, 171–189.Google Scholar

Janovec, V. & Zikmund, Z. (1993). Microscopic structure of domain walls and antiphase boundaries in calomel crystals. Ferroelectrics, 140, 89–94.Google Scholar

Kalonji, G. (1985). A roadmap for the use of interfacial symmetry groups. J. Phys. C, 46, 249–256.Google Scholar

Kopský, V. (1986). The role of subperiodic and lower-dimensional groups in the structure of space groups. J. Phys. A, 19, L181–L184.Google Scholar

Kopský, V. (1988). Reducible space groups. Lecture Notes in Physics, 313, 352–356. Proceedings of the 16th International Colloquium on Group-Theoretical Methods in Physics, Varna, 1987. Berlin: Springer Verlag.Google Scholar

Kopský, V. (1989a). Subperiodic groups as factor groups of reducible space groups. Acta Cryst. A45, 805–815.Google Scholar

Kopský, V. (1989b). Subperiodic classes of reducible space groups. Acta Cryst. A45, 815–823.Google Scholar

Kopský, V. (1989c). Scanning of layer and rod groups. Proceedings of the 12th European Crystallographic Meeting, Moscow, 1989. Collected abstracts, Vol. 1, p. 64.Google Scholar

Kopský, V. (1990). The scanning group and the scanning theorem for layer and rod groups. Ferroelectrics, 111, 81–85.Google Scholar

Kopský, V. (1993a). Layer and rod classes of reducible space groups. I. Z-decomposable cases. Acta Cryst. A49, 269–280.Google Scholar

Kopský, V. (1993b). Translation normalizers of Euclidean motion groups. I. Elementary theory. J. Math. Phys. 34, 1548–1556.Google Scholar

Kopský, V. (1993c). Translation normalizers of Euclidean motion groups. II. Systematic calculation. J. Math. Phys. 34, 1557–1576.Google Scholar

Kopský, V. & Litvin, D. B. (1989). Scanning of space groups. In Group theoretical methods in physics, edited by Y. Saint Aubin & L. Vinet, pp. 263–266. Singapore: World Scientific. Google Scholar

Pond, R. C. & Bollmann, W. (1979). The symmetry and interfacial structure of bicrystals. Philos. Trans. R. Soc. London Ser. A, 292, 449–472.Google Scholar

Pond, R. C. & Vlachavas, D. S. (1983). Bicrystallography. Proc. R. Soc. London Ser. A, 386, 95–143.Google Scholar

Saint-Grégoire, P., Janovec, V. & Kopský, V. (1997). A sample analysis of domain walls in simple cubic phase of C₆₀. Ferroelectrics, 191, 73–78.Google Scholar

Sutton, A. P. & Balluffi, R. W. (1995). Interfaces in crystalline materials. Oxford: Clarendon Press.Google Scholar

Vlachavas, D. S. (1985). Symmetry of bicrystals corresponding to a given misorientation relationship. Acta Cryst. A41, 371–376.Google Scholar

Wondratschek, H. (1971). Institut für Kristallographie, Universität Karlsruhe, Germany. Unpublished manuscript.Google Scholar

Wood, E. (1964). The 80 diperiodic groups in three dimensions. Bell Syst. Tech. J. 43, 541–559. Bell Telephone Technical Publications, Monograph 4680.Google Scholar

Zikmund, Z. (1984). Symmetry of domain pairs and domain twins. Czech. J. Phys. B, 34, 932–949.Google Scholar