De Rham 2-cohomology of real flag manifolds

Abstract

Let F =G/P be a flag manifold associated to a non-compact real simple Lie group G and the parabolic subgroup % P . This is a closed subgroup of G determined by a subset % of simple restricted roots of g=Lie(G). This paper computes the second de Rham cohomology group of F. We prove that it zero in general, with some rare exceptions. When it is non-zero, we give a basis of H2(F,R) through the Weil construction of closed 2-forms as characteristic classes of principal fiber bundles. The starting point is the computation of the second homology group of F with coefficients in a ring R.