Conjugates of Pisot numbers

Abstract

In this paper we investigate the Galois conjugates of a Pisot number q ∈ (m, m+1), m ≥ 1. In particular, we conjecture that for q ∈ (1,2) we have |q'| ≥ 5-12 for all conjugates q' of q. Further, for m ≥ 3, we conjecture that for all Pisot numbers q ∈ (m, m+1) we have |q'| ≥ m+1-m2+2m-32. A similar conjecture if made for m =2. We conjecture that all of these bounds are tight. We provide partial supporting evidence for this conjecture. This evidence is both of a theoretical and computational nature. Lastly, we connect this conjecture to a result on the dimension of Bernoulli convolutions parameterized by β, whose conjugate is the reciprocal of a Pisot number.