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Review article

Symmetry Adaptation and Wigner-Racah Algebras in Quantum Chemistry

Maurice Kibler ; Institut de Physique Nucleaire (et IN2P3), Universite Claude Bernard Lyon 1 43 Bd du 11 Novembre 1918, 69622 Vineurbanne Cedex, France


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Abstract

The Wigner-Racah algebra of an arbitrary (finite or compact
continuous) group is presented in an original way that constitutes
a straightforward extension of the corresponding algebra of the
rotation group. Illustrative examples are given around the rotation
group and the octahedral group. The adaptation of the Wigner-
Racah algebra of the double rotation group to one of its subgroups
G is discussed in detail. Special emphasis is put on the Ca'se
where G corresponds to the octahedral group.

Keywords

Hrčak ID:

194074

URI

https://hrcak.srce.hr/194074

Publication date:

14.1.1985.

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