Some explicit cocycles on the Furstenberg boundary for products of isometries of hyperbolic spaces and SL(3,K)

Abstract

Nicolas Monod showed that the evaluation map H*m(G G/P) H*m(G) between the measurable cohomology of the action of a connected semisimple Lie group G on its Furstenberg boundary G/P and the measurable cohomology of G is surjective with a kernel that can be entirely described in terms of invariants in the cohomology of a maximal split torus A<G. In a recent paper we refine Monod's result and show in particular that the cohomology of non-alternating cocycles on G/P is in general not trivial and lies in the kernel of the evaluation. In this paper we describe explicitly such non-alternating and alternating cocycles on G/P in low degrees when G is either a product of isometries of real hyperbolic spaces or G=SL(3,K), where K is either the real or the complex field. As a consequence, we deduce that the comparison map H*m,b(G)→ H*m(G) from the measurable bounded cohomology is injective in degree 3 for nontrivial products of isometries of hyperbolic spaces. We get also another proof of the injectivity for G=SL(3,K), when K is either the real field or the complex one.