DISCRIMINANT and integral basis OF Q([12]a)

Abstract

Suppose m be a 12-th power free integer. Let K=Q(θ) be an algebraic number field defined by a complex root θ of an irreducible polynomial x12-m and OK be its ring of integers. In this paper, we determine the highest power of p dividing the index of the subgroup [θ] in OK and p-integral basis of K for each prime p. These p-integral bases lead to the construction of an integral basis of K which is illustrated with examples. In particular, when m is a square free integer, we provide necessary and sufficient conditions for the set \1,θ,θ2,·s,θ10,θ11\ to be an integral basis of K.