The Borel-Weil theorem for reductive Lie groups

Abstract

In this manuscript we consider the extent to which an irreducible representation for a reductive Lie group can be realized as the sheaf cohomolgy of an equivariant holomorphic line bundle defined on an open invariant submanifold of a complex flag space. Our main result is the following: suppose G0 is a real reductive group of Harish-Chandra class and let X be the associated full complex flag space. Suppose Oλ is the sheaf of sections of a G0-equivariant holomorphic line bundle on X whose parameter λ (in the usual twisted D% -module context) is antidominant and regular. Let S⊂eq X be a G0% -orbit and suppose U⊃eq S is the smallest G0-invariant open submanifold of X that contains S. From the analytic localization theory of Hecht and Taylor one knows that there is a nonegative integer q such that the compactly supported sheaf cohomology groups Hcq(S,OλS) vanish except in degree q, in which case Hcq(S,OλS) is the minimal globalization of an associated standard Beilinson-Bernstein module. In this study we show that the q-th compactly supported cohomolgy group Hcq(U,OλU) defines, in a natural way, a nonzero submodule of Hcq(S,OλS), which is irreducible (i.e. realizes the unique irreducible submodule of Hcq(S,OλS)) when an associated algebraic variety is nonsingular. By a tensoring argument, we can show that the result holds, more generally (for nonsingular Schubert variety), when the representation Hcq(S,OλS) is what we call a classifying module.