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References
Aprodu, M., Farkas, G.: The Green conjecture for smooth curves lying on arbitrary K3 surfaces. Compos. Math. 147, 211–226 (2011)
Aprodu, M., Nagel, J.: Koszul cohomology and algebraic geometry. In: University Lecture Series, vol. 52. AMS (2010)
Barth, W. Abelian surfaces with \((1,2)\)-polarization. In: Algebraic Geometry, Sendai, 1985, Advanced Studies in Pure Mathematics, vol. 10, pp. 41–84. North-Holland, Amsterdam (1987)
Beauville, A.: Complex Algebraic Surfaces, LMS Student Texts, vol. 34, p. 144. Cambridge University Press, Cambridge (1983)
Buium, A.: Sur le nombre de Picard des revêtements doubles des surfaces algébriques. C. R. Acad. Sci. Paris Sér. I Math. 296, 361–364 (1983)
Camere, C.: About the stability of the tangent bundle of \({\mathbb{P}}^n\) restricted to a surface. Math. Z. 271(1–2), 499–507 (2012)
Ein, L., Lazarsfeld, R.: Syzygies and Koszul cohomology of smooth projective varieties of arbitrary dimension. Invent. Math. 111(1), 51–67 (1993)
Ein, L., Lazarsfeld, R.: Syzygies of projective varieties of large degree: recent progress and open problems. In: Algebraic Geometry: Salt Lake City 2015. Proceedings of Symposia in Pure Mathematics, vol. 97, pp 223–242. American Mathematical Society, Providence, RI (2018)
Eisenbud, D.: The Geometry of Syzygies, Graduate Texts in Mathematics, vol. 229. Springer, New York (2005)
Gallego, F.J., Purnaprajna, B.P.: Vanishing theorems and syzygies for K3 surfaces and Fano varieties. J. Pure Appl. Algebra 146(3), 251–265 (2000)
Green, M.: Koszul cohomology and the geometry of projective varieties. J. Differ. Geom. 19(1), 125–171 (1984)
Green, M.: Koszul cohomology and the geometry of projective varieties II. J. Differ. Geom. 20(1), 279–289 (1984)
Green, M., Lazarsfeld, R.: On the projective normality of complete linear series on an algebraic curve. Invent. Math. 83(1), 73–90 (1986)
Green, M., Lazarsfeld, R.: Special divisors on curves on a K3 surface. Invent. Math. 89(2,), 357–370 (1987)
Green, M., Lazarsfeld, R.: Some results on the syzygies of finite sets and algebraic curves. Compos. Math. 67(3), 301–314 (1988)
Gruson, L., Lazarsfeld, R., Peskine, C.: On a theorem of Castelnuovo, and the equations defining space curves. Invent. Math. 72, 491–506 (1983)
Ito, A.: A remark on higher syzygies on abelian surfaces. Commun. Algebra. (2018). https://doi.org/10.1080/00927872.2018.1464172
Knutsen, A.L.: On \(k\)th-order embeddings of K3 surfaces and Enriques surfaces. Manuscr. Math. 104(2), 211–237 (2001)
Knutsen, A.L., Lopez, A.F.: Brill-Noether theory of curves on Enriques surfaces II: the Clifford index. Manuscr. Math. 147(1–2), 193–237 (2015)
Knutsen, A.L., Syzdek, W., Szemberg, T.: Moving curves and Seshadri constants. Math. Res. Lett. 16(4), 711–719 (2009)
Küronya, A., Lozovanu, V.: A Reider-type theorem for higher syzygies on abelian surfaces (2015). arXiv:1509.08621
Saint-Donat, B.: Projective models of \(K-3\) surfaces. Am. J. Math. 96, 602–639 (1974)
Serrano, F.: Extension of morphisms defined on a divisor. Math. Ann. 277, 395–413 (1987)
Voisin, C.: Green’s generic syzygy conjecture for curves of even genus lying on a K3 surface. J. Eur. Math. Soc. (JEMS) 4(4), 363–404 (2002). https://doi.org/10.1007/s100970200042
Voisin, C.: Green’s canonical syzygy conjecture for generic curves of odd genus. Compos. Math. 141(5), 1163–1190 (2005). https://doi.org/10.1112/S0010437X05001387
Acknowledgements
We are grateful to Giuseppe Pareschi, Angelo Lopez, Klaus Hulek, Gavril Farkas, and Andreas Leopold Knutsen for helpful conversations. We would also like to thank the anonymous referee for providing helpful comments and suggestions. The first author was supported by the Grant IRTG 1800 of the DFG.
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Agostini, D., Küronya, A. & Lozovanu, V. Higher syzygies of surfaces with numerically trivial canonical bundle. Math. Z. 293, 1071–1084 (2019). https://doi.org/10.1007/s00209-018-2220-0
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DOI: https://doi.org/10.1007/s00209-018-2220-0