Sebastien Boucksom
Published 2002-01-05Version 1
Using a result of Fujita on approximate Zariski decompositions and the singular version of Demailly's holomorphic Morse inequalities as obtained by Bonavero, we express the volume of a line bundle in terms of the absolutely continuous parts of all the positive curvature currents on it, with a way to pick an element among them which is most homogeneous with respect to the volume. This enables us to introduce the volume of any pseudoeffective class on a compact Kaehler manifold, and Fujita's theorem is then extended to this context.
On k-jet ampleness of line bundles on hyperelliptic surfaces
A note on k-very ampleness of line bundles on general blow-ups of hyperelliptic surfaces
Morphisms of 1-motives defined by line bundles
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