Elements of irreducible tensorial matrices generated by finite group with applications to ligand field Hamiltonians (Q1360602)
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scientific article; zbMATH DE number 1036822
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Elements of irreducible tensorial matrices generated by finite group with applications to ligand field Hamiltonians |
scientific article; zbMATH DE number 1036822 |
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Elements of irreducible tensorial matrices generated by finite group with applications to ligand field Hamiltonians (English)
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15 November 1998
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Finite symmetry groups are used to generate \(d\)-type ligand-field Hamiltonians. The irreducible representations of the involved group are employed to construct tensor operators of definite symmetry. Starting from a reference matrix, by elegant group theoretical methods the Hamiltonian is derived. This relation is substantial more efficient than previous techniques for evaluating matrix elements of octahedral and tetragonal \(d\)-type ligand-field Hamiltonians.
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finite groups
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ligand-field Hamiltonians
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normalized irreducible tensorial matrices
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irreducible representations
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tensor operators
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crystallographic groups
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point symmetries
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0.86307293
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0.8427675
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0.83775616
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0.8372233
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