On the symmetries of the 6j symbol
The 6j tensor for compact groups is shown to transform as a basis vector for the identity representation of the permutation group S4. This allows character theory to be used to determine the minimum number of independent components and a projection operator to determine the relations between compone...
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AIP Publishing
1983
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| Summary: | The 6j tensor for compact groups is shown to transform as a basis vector for the identity representation of the permutation group S4. This allows character theory to be used to determine the minimum number of independent components and a projection operator to determine the relations between components-the symmetry properties. |
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