| 1. | For = 3 this is the rotation group SO ( 3 ).
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| 2. | Like SO ( 4 ), all even-dimensional rotation groups contain isoclinic rotations.
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| 3. | For this is the rotation group SO ( 3 ).
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| 4. | A subtler example occurs in charts on SO ( 3 ), the rotation group.
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| 5. | After this identification, we arrive at a topological space homeomorphic to the rotation group.
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| 6. | The most important special case is that of the rotation group SO ( 3 ).
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| 7. | The total angular momentum corresponds to the Casimir invariant of the Lie algebra rotation group.
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| 8. | The rotation group SO ( 3 ) is three-dimensional.
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| 9. | The rotation group in four dimensions, SO ( 4 ), has six degrees of freedom.
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| 10. | In this case the little group is, the rotation group, all of whose representations are known.
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मोबाइल