Virtual fibring of Poincar\'e-duality groups
Abstract
We show that a RFRS Poincar\'e-duality group G admits a virtual epimorphism to the integers whose kernel is itself a Poincar\'e-duality group over every field if and only if the L2-homology of G vanishes and so do the positive-characteristic variants thereof. Our investigations yield a more general relationship between cohomology at infinity of groups that algebraically fibre and their fibres. In particular, we show that if the fundamental group of an aspherical manifold of dimension at least three algebraically fibres, then the fibre is one ended.
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