Bounded Cohomology and l1-Homology of Three-Manifolds

Abstract

In this paper we define, for each aspherical orientable 3-manifold M endowed with a torus splitting T, a 2-dimensional fundamental l1-class [M]T whose l1-norm has similar properties as the Gromov simplicial volume of M (additivity under torus splittings and isometry under finite covering maps). Next, we use the Gromov simplicial volume of M and the l1-norm of [M]T to give a complete characterization of those nonzero degree maps f M N which are homotopic to a deg(f)-covering map. As an application we characterize those degree one maps f M N which are homotopic to a homeomorphism in terms of bounded cohomology classes.