Mixed Hodge structures on cohomology jump ideals
Abstract
In previous work, we constructed for a smooth complex variety X and for a linear algebraic group G a mixed Hodge structure on the complete local ring O to the moduli space of representations of the fundamental group π1(X,x) into G at a representation underlying a variation of mixed Hodge structure. We now show that the jump ideals Jki ⊂ O, defining the locus of representations such the the dimension of the cohomology of X in degree i of the associated local system is greater than k, are sub-mixed Hodge structures; this is in accordance with various known motivicity results for these loci. In rank one we also recover, and find new cases, where these loci are translated sub-tori of the moduli of representations. Our methods are first transcendental, relying on Hodge theory, and then combined with tools of homotopy and algebra.
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