An Integral Digit Derivative Basis for Carlitz Prime Power Torsion Extensions

Abstract

Let p be a monic irreducible polynomial in A:=Fq[θ], the ring of polynomials in the indeterminate θ over the finite field Fq, and let ζ be a root of p in an algebraic closure of Fq(θ). For each positive integer n, let λn be a generator of the A-module of Carlitz pn-torsion. We give a basis for the ring of integers A[ζ,λn] ⊂ K(ζ, λn) over A[ζ] ⊂ K(ζ) which consists of monomials in the hyperderivatives of the Anderson-Thakur function ω evaluated at the roots of p. We also give an explicit field normal basis for these extensions. This builds on (and in some places, simplifies) the work of Angl\`es-Pellarin.