Geometric construction of homology classes in Riemannian manifolds covered by products of hyperbolic planes

Abstract

We study the homology of Riemannian manifolds of finite volume that are covered by an r-fold product (H2)r = H2 × … × H2 of hyperbolic planes. Using a variation of a method developed by Avramidi and Nguyen-Phan, we show that any such manifold M possesses, up to finite coverings, an arbitrarily large number of compact oriented flat totally geodesic r-dimensional submanifolds whose fundamental classes are linearly independent in the homology group Hr(M;Z).