An infinite family of multiplicatively independent bases of number systems in cyclotomic number fields

Abstract

Let ζk be a k-th primitive root of unity, m≥φ(k)+1 an integer and k(X)∈ Z [X] the k-th cyclotomic polynomial. In this paper we show that the pair (-m+ζk, N) is a canonical number system, with N=\0,1,…,|k(m)|\. Moreover we also discuss whether the two bases -m+ζk and -n+ζk are multiplicatively independent for positive integers m and n and k fixed.