Exceptional extensions of local fields and the Carlitz--Wan conjecture

Abstract

For any prime power q, a polynomial f(X)∈q[X] is ``exceptional'' if it induces bijections of qk for infinitely many k; this condition is known to be equivalent to f(X) inducing a bijection of qk for at least one k with qk (f)4. In this paper, we introduce the notion of an ``exceptional'' extension of local fields of any characteristic, and show that if f(X)∈q[X] is exceptional in the classical sense then the field extension q(X)/q(f(X)) yields an exceptional local field extension upon passing to the completion at a degree-1 place. We describe all exceptional local field extensions of degree coprime to the residue characteristic, determine the relationship between exceptionality of a local field extension and exceptionality of a subextension, and give various Galois-theoretic characterizations of exceptional local field extensions. As a consequence, we obtain three new proofs, using quite different tools, of a theorem of Guralnick and M\"uller about ramification indices in exceptional maps between curves over q. This theorem generalizes a result of Lenstra which subsumes earlier conjectures of Carlitz and Wan.