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Define a line bundle $L$ on a projective variety to be $q$ -ample, for a natural number $q$ , if tensoring with high powers of $L$ kills coherent sheaf cohomology above dimension $q$ . Thus 0-ampleness is the usual notion of ampleness. We show that $q$ -ampleness of a line bundle on a projective variety in characteristic zero is equivalent to the vanishing of an explicit finite list of cohomology groups. It follows that $q$ -ampleness is a Zariski open condition, which is not clear from the definition.

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La variété de Picard d'une variété complète

Le théorème de Brill-Noether

Length of Extremal Rays and Generalized Adjunction.

Les fibrés de rang deux sur $ℙ_{2}$ et leurs sections

L'existence de certaines spécialisations de courbes projective

Limit linear series: Basic theory.

Line bundles on toroidal groups.

Line bundles with partially vanishing cohomology

Linear Systems on Projective Spaces.

Linear systems on quasi-abelian varieties.

Linear systems representing threefolds which are scrolls on a rational surface.

Linear systems with multiple base points in $ℙ^{2}$ .

L'irrégularité des surfaces de type général dont le système canonique est composé d'un pinceau

Currently displaying 1 – 13 of 13