Vanishing of Local Cohomology with Applications to Hodge Theory
Abstract
Let H = ((H, F), L) be a polarized variation of Hodge structure on a smooth quasi-projective variety U. By M. Saito's theory of mixed Hodge modules, the variation of Hodge structure H can be viewed as a polarized Hodge module M ∈ HM(U). Let X be a compactification of U, and j:U X is the natural map. In this paper, we use local cohomology with mixed Hodge module theory to study j+M ∈ DbMHM(X). In particular, we study the graded pieces of the de Rham complex GrFpDR(j+M) ∈ Dbcoh(X), and the Hodge structure of Hi(U,L) for i in sufficiently low degrees.
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