Alexander and Thurston norms, and the Bieri-Neumann-Strebel invariants for free-by-cyclic groups

Abstract

We investigate Friedl-L\"uck's universal L2-torsion for descending HNN extensions of finitely generated free groups, and so in particular for Fn-by-Z groups. This invariant induces a semi-norm on the first cohomology of the group which is an analogue of the Thurston norm for 3-manifold groups. We prove that this Thurston semi-norm is an upper bound for the Alexander semi-norm defined by McMullen, as well as for the higher Alexander semi-norms defined by Harvey. The same inequalities are known to hold for 3-manifold groups. We also prove that the Newton polytopes of the universal L2-torsion of a descending HNN extension of F2 locally determine the Bieri-Neumann-Strebel invariant of the group. We give an explicit means of computing the BNS invariant for such groups. As a corollary, we prove that the Bieri-Neumann-Strebel invariant of a descending HNN extension of F2 has finitely many connected components. When the HNN extension is taken over Fn along a polynomially growing automorphism with unipotent image in GL(n, Z), we show that the Newton polytope of the universal L2-torsion and the BNS invariant completely determine one another. We also show that in this case the Alexander norm, its higher incarnations, and the Thurston norm all coincide.