Dirichlet Series of Convolution of Arithmetic Functions

Theorem
Let $f, g: \N \to \C$ be arithmetic functions.

Let $h = f * g$ be their Dirichlet convolution.

Let $F, G, H$ be their Dirichlet series.

Let $s$ be a complex number such that $\map F s$ and $\map G s$ converge absolutely.

Then $\map H s$ converges absolutely to $\map F s \times \map G s$.

Also see

 * Dirichlet Series of Inverse of Arithmetic Function
 * Upper Bound for Abscissa of Absolute Convergence of Product of Dirichlet Series