On the height of cyclotomic polynomials

Abstract

Let An denote the height of cyclotomic polynomial n, where n is a product of k distinct odd primes. We prove that An εkφ(n)k-12k-1-1 with -εk c2k, c>0. The same statement is true for the height Cn of the inverse cyclotomic polynomial n. Additionally, we improve on a bound of Kaplan for the maximal height of divisors of xn-1, denoted by Bn. We show that Bn<ηk n(3k-1)/(2k)-1, with - ηk c3k and the same c.