Class Group Relations in a Function Field Analogue of Q(ζp, [p]n)

Abstract

For an odd prime p and polynomial P(T), we consider the extension F of k= Fp(T) defined by adjoining a root of xp+Tx-P(T). Such a field is a function field analogue of the number field Q([p]n). We prove two theorems about the Galois closure L of F: that its degree-0 divisor class group is Ap-1 for some group A, and that its class number is the (p-1)-st power of the class number of F, in analogy with results of R. Schoof and T. Honda for number fields.