Volume and Euler classes in bounded cohomology of transformation groups

Abstract

Let M be an oriented smooth manifold, and Homeo(M,ω) the group of measure preserving homeomorphisms of M, where ω is a finite measure induced by a volume form. In this paper we define volume and Euler classes in bounded cohomology of an infinite dimensional transformation group Homeo0(M,ω) and Homeo(M,ω) respectively, and in several cases prove their non-triviality. More precisely, we define: - Volume classes in Hbn(Homeo0(M,ω)) where M is a hyperbolic manifold of dimension n. - Euler classes in Hb2(Homeo(S,ω)) where S is a closed hyperbolic surface. We show that Euler classes have positive norms for any closed hyperbolic S and volume classes have positive norms for all hyperbolic surfaces and certain hyperbolic 3-manifolds, and hence they are non-trivial.