The growth of the discriminant of the endomorphism ring of the reduction of a rank 2 generic Drinfeld module

Abstract

Let : A F\τ\ be a Drinfeld A-module over F of rank 2 and without complex multiplication, where A = Fq[T], F = Fq(T), and q is an odd prime power. For a prime p = p A of A of good reduction for and with residue field Fp, we study the growth of the absolute value |p| of the discriminant of the Fp-endomorphism ring of the reduction of modulo p. We prove that for all p, |p| grows with |p|. Moreover, we prove that for a density 1 of primes p, |p| is as close as possible to its upper bound |ap2 - 4 μpp|, where X2+apX+μp p ∈ A[X] is the characteristic polynomial of τdeg \ p.