A polynomial invariant for veering triangulations

Abstract

We introduce a polynomial invariant Vτ ∈ Z[H1(M)/torsion] associated to a veering triangulation τ of a 3-manifold M. In the special case where the triangulation is layered, i.e. comes from a fibration, Vτ recovers the Teichm\"uller polynomial of the fibered faces canonically associated to τ. Via Dehn filling, this gives a combinatorial description of the Teichm\"uller polynomial for any hyperbolic fibered 3-manifold. For a general veering triangulation τ, we show that the surfaces carried by τ determine a cone in homology that is dual to its cone of positive closed transversals. Moreover, we prove that this is equal to the cone over a (generally non-fibered) face of the Thurston norm ball, and that τ computes the norm on this cone in a precise sense. We also give a combinatorial description of Vτ in terms of the flow graph for τ and its Perron polynomial. This perspective allows us to characterize when a veering triangulation comes from a fibration, and more generally to compute the face of the Thurston norm determined by τ.