Cohomology of the Hilbert scheme of points on a surface with values in representations of tautological bundles

Abstract

Let X a smooth quasi-projective algebraic surface, L a line bundle on X. Let X[n] the Hilbert scheme of n points on X and L[n] the tautological bundle on X[n] naturally associated to the line bundle L on X. We explicitely compute the image (L[n]) of the tautological bundle L[n] for the Bridgeland-King-Reid equivalence : Db(X[n]) Db_n(Xn) in terms of a complex CL of n-equivariant sheaves in Db_n(Xn). We give, moreover, a characterization of the image (L[n] ... L[n]) in terms of of the hyperderived spectral sequence Ep,q1 associated to the derived k-fold tensor power of the complex CL. The study of the n-invariants of this spectral sequence allows to get the derived direct images of the double tensor power and of the general k-fold exterior power of the tautological bundle for the Hilbert-Chow morphism, providing Danila-Brion-type formulas in these two cases. This yields easily the computation of the cohomology of X[n] with values in L[n] L[n] and k L[n].