Drinfeld modules with maximal Galois action

Abstract

With a fixed prime power q>1, define the ring of polynomials A=Fq[t] and its fraction field F=Fq(t). For each pair a=(a1,a2) ∈ A2 with a2 nonzero, let φ(a) A F\τ\ be the Drinfeld A-module of rank 2 satisfying t t+a1τ+a2τ2. The Galois action on the torsion of φ(a) gives rise to a Galois representation φ(a) Gal(Fsep/F) GL2(A), where A is the profinite completion of A. We show that the image of φ(a) is large for random a. More precisely, for all a∈ A2 away from a set of density 0, we prove that the index [GL2(A):φ(a)(Gal(Fsep/F))] divides q-1 when q>2 and divides 4 when q=2. We also show that the representation φ(a) is surjective for a positive density set of a∈ A2.

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