Intermediate Jacobians and Hodge Structures of Moduli Spaces
Abstract
Let SUX(n,L) be the moduli space of rank n semistable vector bundles with fixed determinant L on a smooth projective genus g>1 curve X. Let SUXs(n,L) denote the open subset parameterizing stable bundles. We show that for small i, the mixed Hodge structure on Hi(SUXs(n, L), Q) is independent of the degree of L, and hence pure of weight i. Moreover any simple factors is, up to Tate twisting, isomorphic to a summand of a tensor power of H1(X,Q). A more precise statement for i = 3, yields a Torelli theorem complementing earlier work of several authors. This is a replacement of our preprint Intermediate Jacobians of Moduli spaces which contained a gap.
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