Finiteness conditions in covers of Poincaré duality spaces
arXiv:1301.3972
Abstract
A closed 4-manifold (or, more generally, a finite $PD_4$-space) has a finitely dominated infinite regular covering space if and only if either its universal covering space is finitely dominated or it is finitely covered by the mapping torus of a self homotopy equivalence of a $PD_3$-complex.
v2: Theorem 7 added at end