Transcendence of Power Series for Some Number Theoretic Functions

Abstract

We give a new proof of Fatou's theorem: if an algebraic function has a power series expansion with bounded integer coefficients, then it must be a rational function. This result is applied to show that for any non--trivial completely multiplicative function from N to \-1,1\, the series Σn=1∞ f(n)zn is transcendental over Z[z]; in particular, Σn=1∞ λ(n)zn is transcendental, where λ is Liouville's function. The transcendence of Σn=1∞ μ(n)zn is also proved.