| 1. | This matrix subgroup is precisely the special unitary group.
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| 2. | This is equivalent to the special unitary group description.
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| 3. | However, algorithms to produce Clebsch� Gordan coefficients for the special unitary group are known.
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| 4. | Such matrices form a Lie group called SU ( 2 ) ( see special unitary group ).
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| 5. | The stabilizer of 3 points is the projective special unitary group PSU ( 3, 2 2 ), which is solvable.
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| 6. | In modern terms, this presents the special unitary group SU ( 2 ) as a double cover of SO ( 3 ).
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| 7. | The PSU obviously refers to the projective special unitary group . . . but I am only familiar with this over the complex numbers.
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| 8. | The center of the special unitary group has order and consists of those unitary scalars which also have order dividing " n ".
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| 9. | From the perspective of Lie groups, " S " 3 can be identified with the special unitary group SU ( 2 ).
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| 10. | A r has as its associated simply connected compact group the special unitary group, PU ( " r " + 1 ).
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