On power integral bases of certain pure number fields defined by X60-m

Abstract

Let K be a pure number field generated by a complex root of a monic irreducible polynomial F(x)=x60-m∈ Z[x], with m≠ 1 a square free integer. In this paper, we study the monogeneity of K. We prove that if m 14, m 1 9 and m∈\ 1, 7\ 25, then K is monogenic. But if m 14, m 1 9, or m 125, then K is not monogenic. Our results are illustrated by examples.