| 11. | Let be an-eigenvector of eigenvalue \ alpha _ 1.
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| 12. | Let be the first vertices on a shortest-path in.
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| 13. | Let be a field and an-dimensional extension field of.
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| 14. | Now, let be the-path from with respect to.
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| 15. | Just restore it, and lets be done with this silliness.
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| 16. | Let be a morphism and let be an irreducible algebraic curve.
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| 17. | Let be a morphism and let be an irreducible algebraic curve.
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| 18. | Let be the fitness or cost function which must be minimized.
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| 19. | Let be an algebraically closed field and be a subfield of.
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| 20. | Let be the number of such exotic spheres for, then
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