Topological Rigidity for FJ by the Infinite Cyclic Group

Abstract

We call a group FJ if it satisfies the K- and L-theoretic Farrell-Jones conjecture with coefficients in Z. We show that if G is FJ, then the simple Borel conjecture (in dimensions 5) holds for every group of the form G Z. If in addition Wh(G× Z)=0, which is true for all known torsion free FJ groups, then the bordism Borel conjecture (in dimensions n 5) holds for G Z. One of the key ingredients in proving these rigidity results is another main result, which says that if a torsion free group G satisfies the L-theoretic Farrell-Jones conjecture with coefficients in Z, then any semi-direct product G Z also satisfies the L-theoretic Farrell-Jones conjecture with coefficients in Z. Our result is indeed more general and implies the L-theoretic Farrell-Jones conjecture with coefficients in additive categories is closed under extensions of torsion free groups. This enables us to extend the class of groups which satisfy the Novikov conjecture.