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 Results for DC.creator="A." AND DC.creator="J." AND DC.creator="C." AND DC.creator="Wilson" in section 1.4.1 of volume C
Arithmetic crystal classes in one, two and higher dimensions
Wilson, A. J. C.  International Tables for Crystallography (2006). Vol. C, Section 1.4.1.2, p. 16 [ doi:10.1107/97809553602060000575 ]
... there are two geometric crystal classes, 1 and m, and a single Bravais lattice, . Two arithmetic crystal classes result, and ... ten geometric crystal classes, and two Bravais lattices, p and c; 13 arithmetic crystal classes result. The two-dimensional geometric and ... this volume. References Brown, H., Bülow, R., Neubüser, J., Wondratschek, H. & Zassenhaus, H. (1978). Crystallographic groups of ...

Arithmetic crystal classes in three dimensions
Wilson, A. J. C.  International Tables for Crystallography (2006). Vol. C, Section 1.4.1.1, p. 15 [ doi:10.1107/97809553602060000575 ]
... m, and the Bravais lattices are monoclinic P and monoclinic C. The six arithmetic crystal classes in the monoclinic system are ... the orthorhombic crystal class1 mm with the end-centred lattice C. The intersection of the mirror planes of the crystal class defines one unique direction, the C centring of the lattice another. If these directions are ...

Arithmetic crystal classes
Wilson, A. J. C.  International Tables for Crystallography (2006). Vol. C, Section 1.4.1, pp. 15-19 [ doi:10.1107/97809553602060000575 ]
... and are treated from that point of view in Volume A of International Tables for Crystallography (2005), Section 8.2.3 . They ... 8.2.3 ). The tabulation of arithmetic crystal classes in Volume A is incomplete, and the relation of the notation used in ... m, and the Bravais lattices are monoclinic P and monoclinic C. The six arithmetic crystal classes in the monoclinic system ...

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