Horrocks Correspondence on ACM Varieties
Abstract
We describe a vector bundle on a smooth n-dimensional ACM variety in terms of its cohomological invariants Hi*(), 1≤ i ≤ n-1, and certain graded modules of "socle elements" built from . In this way we give a generalization of the Horrocks correspondence. We prove existence theorems where we construct vector bundles from these invariants and uniqueness theorems where we show that these data determine a bundle up to isomorphisms. The cases of the quadric hypersurface in Pn+1 and the Veronese surface in P5 are considered in more detail.
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