Universal Realisators for Homology Classes

Abstract

We study oriented closed manifolds Mn possessing the following Universal Realisation of Cycles (URC) Property: For each topological space X and each integral homology class z of it, there exist a finite-sheeted covering n of Mn and a continuous mapping f of n to X such that f takes the fundamental class [n] to kz for a non-zero integer k. We find wide class of examples of such manifolds Mn among so-called small covers of simple polytopes. In particular, we find 4-dimensional hyperbolic manifolds possessing the URC property. As a consequence, we prove that for each 4-dimensional oriented closed manifold N4, there exists a mapping of non-zero degree of a hyperbolic manifold M4 to N4. This was conjectured by Kotschick and Loeh.