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Double groups and their representations
Janssen, T.  International Tables for Crystallography (2013). Vol. D, Section 1.2.2.9, pp. 45-46 [ doi:10.1107/97809553602060000901 ]
Double groups and their representations 1.2.2.9. Double groups and their representations Three-dimensional rotation point groups are subgroups of SO(3). In quantum mechanics, rotations act according to some representation of SO(3). Because wave functions can be multiplied by an arbitrary phase factor, in principle projective representations play ...
     [more results from section 1.2.2 in volume D]

Introduction
Janssen, T.  International Tables for Crystallography (2013). Vol. D, Section 1.2.1, pp. 34-35 [ doi:10.1107/97809553602060000901 ]
... of Magnetic Space Groups. Boulder, Colorado: Pruett Press. Stokes, H. T. & Hatch, D. M. (1988). Isotropy Subgroups of the 230 ...

Tables
Janssen, T.  International Tables for Crystallography (2013). Vol. D, Section 1.10.5, pp. 262-268 [ doi:10.1107/97809553602060000909 ]
Tables 1.10.5. Tables In this section are presented the irreducible representations of point groups of quasiperiodic structures up to rank six that do not occur as three-dimensional crystallographic point groups. Table 1.10.5.1 gives the characters of the point groups with n = 5, 8, 10, 12, with n = 5, 8, 10 ...

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