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Références
[1]Arbarello, E., Cornalba, M., Griffiths, P. & Harris, J.,Geometry of Algebraic Curves, vol. I. Grundlehren der Mathematischen Wissenschaften, 267. Springer-Verlag, 1984.
[2]Ballico, E. &Ellia, P., The maximal rank conjecture for non special curves inP n.Math. Z., 197 (1987), 355–367.
[3]Beauville, A. &Merindol, J. Y., Sections hyperplanes des surfaces K3.Duke Math. J., 55 (1987), 873–878.
[4]Carlson, J., Green, M., Griffiths, P. &Harris, J., Infinitesimal variations of Hodge structure.Compositio Math., 50 (1983), 109–205.
[5]Ciliberto, C., Harris, J. &Miranda, R., On the surjectivity of the Wahl map.Duke Math. J., 57 (1988), 829–858.
[6]Ciliberto, C. & Miranda, R., On the Gaussian map for canonical curves of low genus. Preprint.
[7]Ciliberto, C. & Miranda, R. Gaussian map for certain families of cannical curves. Preprint.
[8]Eisenbud, D. &Harris, J., Irreducibility and monodromy of some families of linear series.Ann. Sci. École Norm. Sup. (4), 20 (1987), 65–87.
[9]Hartshorne, R. & Hirschowitz, A., Smoothing algebraic space curves, inAlgebraic Geometry, Proceedings, Sitjes 1983. Lecture notes in Math., no. 1124, pp. 98–131.
[10]Lazarsfeld, R., Brill-Noether-Petri without degenerations.J. Differential Geom., 23 (1986), 299–307.
[11]Mori, S. & Mukai, S., The uniruledness of the moduli space of curves of genus II, inAlgebraic Geometry, Proceedings, Tokyo/Kyoto, 1982. Lecture Notes in Math., no. 1016, pp. 334–353.
[12]Mukai, S., On the moduli space of bundles on K3 surfaces I, dansVector bundles on algebraic varieties. Tata Institute of Fundamental Research, Bombay, 1984.
[13]—, Symplectic structure of the moduli space of sheaves on an abelian or K3 surfaces.Invent. Math., 77 (1984), 101–116.
[14]Muka, S., Curves, K3 surfaces and Fano manifolds of genus ≤10, dansAlgebraic geometry and commutative algebra in honor of Nagata (1987), pp. 357–377.
[15]—, Biregular classification of Fano threefolds and Fano manifolds of co-index 3.Proc. Nat. Acad. Sci. U.S.A., 86 (1989), 3000–3002.
[16]Reid, M., Infinitesimal view of extending a hyperplane section-Deformation theory and computer algebra. À paraître dansHyperplane sections and related topics. Springer Lecture Notes in Math.
[17]Tjurin, A. N., Cycles, curves and vector bundles on an algebraic surface.Duke Math. J., 54 (1987), 1–26.
[18]Whal, J., The Jacobian algebra of a Gorenstein singularity.Duke Math. J., 55 (1987), 843–871.
[19]Wahl, J., Gaussian maps on algebraic curves. Preprint.
[20]Cukierman, F. & Ulmer, D., Curves of genus ten on K3 surfaces. Preprint 1991.
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Voisin, C. Sur l’application de Wahl des courbes satisfaisant la condition de Brill-Noether-Petri. Acta Math 168, 249–272 (1992). https://doi.org/10.1007/BF02392980
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DOI: https://doi.org/10.1007/BF02392980