Kernels in measurable cohomology for transitive actions

Abstract

Given a connected semisimple Lie group G, Monod has recently proved that the measurable cohomology of the G-action H*m(G G/P) on the Furstenberg boundary G/P, where P is a minimal parabolic subgroup, maps surjectively on the measurable cohomology of G through the evaluation on a fixed basepoint. Additionally, the kernel of this map depends entirely on the invariant cohomology of a maximal split torus. In this paper we show a similar result for a fixed subgroup L<P such that the stabilizer of almost every pair of points in G/L is compact. More precisely, we show that the cohomology of the G-action Hpm(G G/L) maps surjectively onto Hpm(G) with a kernel isomorphic to Hp-1m(L). Examples of such groups are given either by any term of the derived series of the unipotent radical N of P or by a maximal split torus A. We conclude the paper by computing explicitly some cocycles on quotients of SL(2,K) for K=R, C.