Decomposition of cohomology of vector bundles on homogeneous ind-spaces

Abstract

Let G be a locally semisimple ind-group, P be a parabolic subgroup, and E be a finite-dimensional P-module. We show that, under a certain condition on E, the nonzero cohomologies of the homogeneous vector bundle OG/P(E*) on G/P induced by the dual P-module E* decompose as direct sums of cohomologies of bundles of the form OG/P(R) for (some) simple constituents R of E*. In the finite-dimensional case, this result is a consequence of the Bott-Borel-Weil theorem and Weyl's semisimplicity theorem. In the infinite-dimensional setting we consider, there is no relevant semisimplicity theorem. Instead, our results are based on the injectivity of the cohomologies of the bundles OG/P(R).