Rational Surfaces with Anticanonical Divisor not Reduced

Rodriguez, Jesús Adrian Cerda; Lahyane, Mustapha; Osuna-Castro, Osvaldo; Failla, Gioia; Moreno-Mejia, Israel

doi:10.2478/auom-2013-0055

Abstract

We prove the finite generation of the monoid of effective divisor classes on a smooth projective rational surface X endowed with an anticanonical divisor such that all its irreducible components are of multiplicity one except one which has multiplicity two. In almost all cases, the self-intersection of a canonical divisor K_X on X is strictly negative, hence - K_X is neither ample nor numerically effective. In particular, X is not a Del Pezzo surface. Furthermore, it is shown that the first cohomology group of a numerically effective divisor vanishes; as a consequence, we determine the dimension of the complete linear system associated to any given divisor on X

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Rational Surfaces with Anticanonical Divisor not Reduced

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