An equivariant isomorphism theorem for mod p reductions of arboreal Galois representations

Abstract

Let φ be a quadratic, monic polynomial with coefficients in OF,D[t], where OF,D is a localization of a number ring OF. In this paper, we first prove that if φ is non-square and non-isotrivial, then there exists an absolute, effective constant Nφ with the following property: for all primes p⊂eq OF,D such that the reduced polynomial φ p∈ ( OF,D/ p)[t][x] is non-square and non-isotrivial, the squarefree Zsigmondy set of φ p is bounded by Nφ. Using this result, we prove that if φ is non-isotrivial and geometrically stable then outside a finite, effective set of primes of OF,D the geometric part of the arboreal representation of φ p is isomorphic to that of φ. As an application of our results we prove R. Jones' conjecture on the arboreal Galois representation attached to the polynomial x2+t.