Galois groups associated to generic Drinfeld modules and a conjecture of Abhyankar

Abstract

Let φ be a rank r Drinfeld q[T]-module determined by φT(X) = TX+g1Xq+...+gr-1Xqr-1+Xqr, where g1,...,gr-1 are algebraically independent over q(T). Let N∈q[T] be a polynomial, and k/q an algebraic extension. We show that the Galois group of φN(X) over k(T,g1,...,gr-1) is isomorphic to r(q[T]/Nq[T]), settling a conjecture of Abhyankar.