Algebraic independence of Mahler functions via radial asymptotics

Abstract

We present a new method for algebraic independence results in the context of Mahler's method. In particular, our method uses the asymptotic behaviour of a Mahler function f(z) as z goes radially to a root of unity to deduce algebraic independence results about the values of f(z) at algebraic numbers. We apply our method to the canonical example of a degree two Mahler function; that is, we apply it to F(z), the power series solution to the functional equation F(z)-(1+z+z2)F(z4)+z4F(z16)=0. Specifically, we prove that the functions F(z), F(z4), F'(z), and F'(z4) are algebraically independent over C(z). An application of a celebrated result of Nishioka then allows one to replace C(z) by Q when evaluating these functions at a nonzero algebraic number α in the unit disc.