Virtual Betti numbers of mapping tori of 3-manifolds

Abstract

Given a reducible 3-manifold M with an aspherical summand in its prime decomposition and a homeomorphism f M M, we construct a map of degree one from a finite cover of Mf S1 to a mapping torus of a certain aspherical 3-manifold. We deduce that Mf S1 has virtually infinite first Betti number, except when all aspherical summands of M are virtual T2-bundles. This verifies all cases of a conjecture of T.-J. Li and Y. Ni, that any mapping torus of a reducible 3-manifold M not covered by S2× S1 has virtually infinite first Betti number, except when M is virtually (\#n T2 S1)\#(\#mS2× S1). Li-Ni's conjecture was recently confirmed by Ni with a group theoretic result, namely, by showing that there exists a π1-surjection from a finite cover of any mapping torus of a reducible 3-manifold to a certain mapping torus of \#m S2× S1 and using the fact that free-by-cyclic groups are large when the free group is generated by more than one element.