| 11. | In the case of matrices, the bijection follows from resolvant formulas.
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| 12. | This is where the concept of a bijection comes in : define the correspondence
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| 13. | Normed spaces for which the map ? is a bijection are called reflexive.
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| 14. | The image of a computable set under a total computable bijection is computable.
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| 15. | There is thus an inclusion-reversing bijection between the projective spaces and.
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| 16. | Such a bijection can be obtained using the Pr�fer sequence of each tree.
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| 17. | Formally, the gluing is defined by a bijection between the two boundaries.
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| 18. | Because the isomorphism must be a bijection, every recursive model is countable.
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| 19. | While the map is an analytic bijection, its inverse is not continuous.
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| 20. | Since is a bijection, is an injection, and thus is isomorphic to.
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