| 11. | The result is known as a homogeneous space.
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| 12. | There are many further homogeneous spaces of the classical linear groups in common use in mathematics.
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| 13. | This quotient formulation gives \ mathrm { AdS } _ n the structure of a homogeneous space.
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| 14. | Similarly, the matrices could be taken as automorphisms of a homogeneous space; this defines a geometric finite automaton.
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| 15. | In other words, the " traditional spaces " are homogeneous spaces; but not for a uniquely determined group.
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| 16. | The extra differential structure that these homogeneous spaces possess allows one to study and generalize their geometry using calculus.
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| 17. | In this case the non-compact space is the unit disk, a homogeneous space for SU ( 1, 1 ).
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| 18. | These equations contain only functions of time; this is a condition that has to be fulfilled in all homogeneous spaces.
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| 19. | It may be identified with the homogeneous space of complex dimension " n ( n + 1 ) / 2"
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| 20. | Using the identification of with the homogeneous space, the connection 1-form is just a component of the Maurer� Cartan 1-form on.
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