Arithmetic properties of arguments of algebraic numbers on the unit circle

Abstract

An irrational number θ is called Diophantine if there exist c>0 and τ < ∞ such that | θ - pq | cqτ holds for every (p,q) ∈ Z × N. In this paper, we study Diophantine and transcendence properties of some real numbers. Using lower bounds for linear forms in logarithms, we show that if β ∈ C is an algebraic number with |β|=1 that is not a root of unity, then Arg(β)2π is Diophantine. We also prove that if β = eiα is algebraic, then απ is either rational or transcendental. As a consequence, we obtain that if n 2 is an integer and α ∈ (0,π2) satisfies n α = (n α), then α2π is both Diophantine and transcendental, and α is transcendental. This extends a result of [V. Cyr, A number theoretic question arising in the geometry of plane curves and in billiard dynamics, Proc. Amer. Math. Soc. 140 (2012), no. 9, 3035--3040], which establishes that α2π is irrational.