References
Ballico, E., Ellia, P.: The maximal rank conjecture for non-special curves inP 3. Invent. Math.79, 541–557 (1985)
Ballico, E., Ellia, P.: Beyond the maximal rank conjecture for curves inP 3. Spaces curves, Proceedings, Rocca di Papa. (Lect. Notes, Math., Vol. 1266). Berlin Heidelberg New York: Springer 1985
Bolondi, G., Migliore, J.: Classification of maximal rank curves in the liaison classL n . Math. Ann.277, 585–603 (1987)
Ellingsrud, G., Hirschowitz, A.: Sur le fibré normal des courbes gauches. C.R. Acad. Sc. Paris Sér. I299, 245–248 (1984)
Ellia, P., Hirschowitz, A.: Voie Ouest I, courbes gauches générique a résolution linéaire dominante. Preprint no 197, Nice, 1988
Hartshorne, R., Hirschowitz, A.: Droites en position générale des l'espace projectif. Algebraic Geometry, Proceedings, La Rabida. (Lect. Notes Math., Vol. 961, p. 169–189.) Berlin Heidelberg New York: Springer 1981
Hartshorne, R., Hirschowitz, A.: Smoothing of algebraic curves. Algebraic Geometry, Sitges (Barcelona 1983). (Lect. Notes Math. Vol. 1126, p. 98–113.) Berlin Heidelberg New York: Springer 1985
Hirschowitz, A.: Sur la postulation générique des courbes rationelles. Acta. Math.146, 209–230 (1981)
Hirschowitz, A.: Sections planes et multisecantes pour les courbes gauches génériques principales. Space curves, Proceedings, Rocca di Papa. (Lect. Notes Math. Vol. 1266.) Berlin Heidelberg New York: Springer 1985
Pareschi, G. Components of the Hilbert scheme of smooth space curves with the expected number of moduli. Manuscr. Math.63, 1–16 (1989)
Sernesi, E.: Curves with good properties. Invent. Math.75, 25–57 (1984)
Walter, C.: The cohomology of the normal bundle of space curves, I. Preprint
Walter, C.: On the cohomology of the normal bundles of curves inP 3, II. Preprint
Walter, C.: Maximal rank curves inP 3 with σ=s. Preprint
Walter, C.: Curves on surfaces with a multiple line. Preprint
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Fløystad, G. Construction of space curves with good properties. Math. Ann. 289, 33–54 (1991). https://doi.org/10.1007/BF01446556
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DOI: https://doi.org/10.1007/BF01446556