An Approach to Non-Abelian Cyclotomic Fields

Abstract

We mainly study a polynomial f1,n(x)=xn-1 + 2xn-2 + 3xn-3 + ·s + kxn-k + ·s + (n-1)x + n over Z and the Galois group of the minimal splitting field. First, we show that an arbitrary root αn of f1,n(x) satisfies |αn| 1 (n ∞), and discuss the irreducibility of f1,n(x) over Z for several type n. After that, we show that the Galois group of f1,n(x) is Symmetric group Sn-1 for several type n. Although those roots of f1,n(x)=0 don't draw an exact circle, it looks like a circle on complex plane. Moreover by considering that Galois groups of f1,n(x) are not abelian in many cases, we call such extension fields over Q "Non-Abelian Cycrotomic Fields" here.