Prime Splitting and Common N-Index Divisors in Radical Extensions: Part p=2

Abstract

Following work of Vélez, we explicitly describe the splitting of the integral prime 2 in the radical extension Q([n]a), where xn-a is an irreducible polynomial in Z[x]. With previous work of the second author, this fully describes the splitting of any prime in Q([n]a). Using this description, we classify common index divisors (the primes whose splitting prevents the existence of a power integral basis for the ring of integers). Using work of Pleasants, we extend this to describe common N-index divisors (primes that divide the index of any order generated over Z by N elements). We also present a novel construction of non-monogenic fields with no common index divisors as well as constructions of number rings requiring N+1 ring generators for any N>0. Examples are provided throughout.