Degree of L2-Alexander torsion for 3-manifolds

Abstract

For an irreducible orientable compact 3-manifold N with empty or incompressible toral boundary, the full L2--Alexander torsion τ(2)(N,φ)(t) associated to any real first cohomology class φ of N is represented by a function of a positive real variable t. The paper shows that τ(2)(N,φ) is continuous, everywhere positive, and asymptotically monomial in both ends. Moreover, the degree of τ(2)(N,φ) equals the Thurston norm of φ. The result confirms a conjecture of J.~Dubois, S.~Friedl, and W.~L\"uck and addresses a question of W.~Li and W.~Zhang. Associated to any admissible homomorphism γ:π1(N) G, the L2--Alexander torsion τ(2)(N,γ,φ) is shown to be continuous and everywhere positive provided that G is residually finite and (N,γ) is weakly acyclic. In this case, a generalized degree can be assigned to τ(2)(N,γ,φ). Moreover, the generalized degree is bounded by the Thurston norm of φ.