A short note on number fields defined by exponential Taylor polynomials

Abstract

Let n be a positive integer and fn(x)= 1+x+x22!+·s + xnn! denote the n-th Taylor polynomial of the exponential function. Let K = Q(θ) be an algebraic number field where θ is a root of fn(x) and ZK denote the ring of algebraic integers of K. In this paper, we prove that for any prime p, p does not divide the index of the subgroup Z[θ] in ZK if and only if p2 n!.