Automatic sequences defined by Theta functions and some infinite products

Abstract

Let p(x) ∈ C(x) be a rational function satisfying the condition p(0)=1 and q an integer larger than 1, in this article we will consider the power expansion of the infinite product f(x)=Πs=0∞f(xqs)=Σi=0∞cixi, and study when the sequence (ci)i ∈ N is q-automatic. The main result is that for given integers q ≥ 2 and d ≥ 0, there exist finitely many polynomials of degree d defined over the field of rational numbers Q, such that Πs=0∞f(xqs)=Σi=1∞cixi is a q-automatic power series.