Ampleness equivalence and dominance for vector bundles
Abstract
Hartshorne in "Ample vector bundles" proved that E is ample if and only if P(E)(1) is ample. Here we generalize this result to flag manifolds associated to a vector bundle E on a complex manifold X: For a partition a we show that the line bundle Qas on the corresponding flag manifold Fls(E) is ample if and only if aE is ample. In particular Q on Gr(E) is ample if and only if rE is ample.\\ We give also a proof of the Ampleness Dominance theorem that does not depend on the saturation property of the Littlewood-Richardson semigroup.
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