Cohomology of flag bundles over compact Hermitian locally symmetric spaces
Abstract
Let E B be a complex analytic fiber bundle with fiber F, a flag variety over a compact complex manifold B. We shall obtain a description of the cohomology of E when B=X:= X, E=Y:= Y and F=K/H, a flag variety, where Y=G/H and X=G/K, a Hermitian globally symmetric space of non-compact type with G being a real, connected, non-compact, semisimple linear Lie group with no compact factors and simply connected complexification, K⊂ G, a maximal compact subgroup, H=ZK(S), the centralizer in K of a toral subgroup S⊂eq K containing Z(K), the center of K and ⊂ G, a uniform and torsionless lattice in G. We also obtain a description of the Picard group of Y and X, for which the complexification of G need not be simply connected. Moreover when G is simple, we obtain the values of q for which Hp,q(X) vanishes when p=0,1. This extends the results of R. Parthasarathy from 1980, who considered (partially) the case p=0.
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