A lower bound for the canonical height associated to a Drinfeld module

Abstract

Denis associated to each Drinfeld module M over a global function function field L a canonical height function, which plays a role analogous to that of the Neron-Tate height in the context of elliptic curves. We prove that there exist constants ε>0 and C, depending only on the number of places at which M has bad reduction, such that either x in M is a torsion point of bounded order, or else the canonical height of x is bound below by ε maxh(jM), deg(DM), where jM is a certain invariant of the isomorphism class of M, and DM is the minimal discriminant of M. As an application, we make some observations about specializations of one-parameter families of Drinfeld modules.