The spectra of polynomial equations with varying exponents

Abstract

We study the dependence of solutions of equations of the form a0 + a1 z1 + ... + am zm = 0, on the exponents 1, ..., m. We apply our results to equations that appear in graph theory, the theory of 3-manifolds fibering over the circle, and the theory of free-by-cyclic groups. In particular, we provide descriptions of the spectra of the Alexander polynomial of a fibered 3-manifold, Teichm\"uller polynomials associated to such a manifold or to a free by cyclic group, and the family of characteristic polynomials of a fixed directed graph with varying edge lengths.