Transcendence of generating functions whose coefficients are multiplicative
Abstract
Let K be a field of characteristic 0, f:N K be a multiplicative function, and F(z)=Σn≥ 1 f(n)zn∈ K[[z]] be algebraic over K(z). Then either there is a natural number k and a periodic multiplicative function (n) such that f(n)=nk (n) for all n, or f(n) is eventually zero. In particular, the generating function of a multiplicative function f:N K is either transcendental or rational.
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