Cup product in bounded cohomology of negatively curved manifolds

Abstract

Let M be a negatively curved compact Riemannian manifold with (possibly empty) convex boundary. Every closed differential 2-form ∈2(M) defines a bounded cocycle c∈ Cb2(M) by integrating over straightened 2-simplices. In particular Barge and Ghys proved that, when M is a closed hyperbolic surface, 2(M) injects this way in Hb2(M) as an infinite dimensional subspace. We show that any class of the form [c], where is an exact differential 2-form, belongs to the radical of the cup product on the graded algebra Hb(M).