P-torsion monodromy representations of elliptic curves over geometric function fields

Abstract

Given a complex quasiprojective curve B and a non-isotrivial family E of elliptic curves over B, the p-torsion E[p] yields a monodromy representation E[p]:π1(B)→ GL2(Fp). We prove that if E[p] E'[p] then E and E' are isogenous, provided p is larger than a constant depending only on the gonality of B. This can be viewed as a function field analog of the Frey--Mazur conjecture, which states that an elliptic curve over Q is determined up to isogeny by its p-torsion Galois representation for p> 17. The proof relies on hyperbolic geometry and is therefore only applicable in characteristic 0.