Transcendence and continued fraction expansion of values of Hecke-Mahler series

Abstract

Let θ and be real numbers with 0 θ, < 1 and θ irrational. We show that the Hecke-Mahler series Fθ, (z1, z2) = Σk1 1 \, Σk2 = 1 k1 θ + \, z1k1 z2k2, where · denotes the integer part function, takes transcendental values at any algebraic point (β, α) with 0 < |β|, |β αθ | < 1. This extends earlier results of Mahler (1929) and Loxton and van der Poorten (1977), who settled the case =0. Furthermore, for positive integers b and a, with b 2 and a congruent to 1 modulo b-1, we give the continued fraction expansion of the number (b-1)2 b Fθ, (1 b, 1 a)+ θ+(b-1) b2a, from which we derive a formula giving the irrationality exponent of Fθ, (1/b, 1/a).