Analytic Number Theory/Dirichlet series

For the remainder of this book, we shall use Riemann's convention of denoting complex numbers:

${\displaystyle s=\sigma +it}$

Definition[edit | edit source]

Convergence considerations[edit | edit source]

Proof:

Denote by ${\displaystyle S}$ the set of all real numbers ${\displaystyle \sigma }$ such that

${\displaystyle \sum _{n=1}^{\infty }\left|{\frac {f(n)}{n^{s}}}\right|}$

diverges. Due to the assumption, this set is neither empty nor equal to ${\displaystyle \mathbb {C} }$. Further, if ${\displaystyle \sigma _{0}+it_{0}\notin S}$, then for all ${\displaystyle \sigma >\sigma _{0}}$ and all ${\displaystyle t}$ ${\displaystyle \sigma +it\notin S}$, since

${\displaystyle \left|{\frac {f(n)}{n^{s_{0}}}}\right|={\frac {|f(n)|}{n^{\sigma _{0}}}}\geq {\frac {|f(n)|}{n^{\sigma }}}=\left|{\frac {f(n)}{n^{s}}}\right|}$

and due to the comparison test. It follows that ${\displaystyle S}$ has a supremum. Let ${\displaystyle \sigma _{a}}$ be that supremum. By definition, for ${\displaystyle \sigma >\sigma _{a}}$ we have convergence, and if we had convergence for ${\displaystyle \sigma <\sigma _{a}}$ we would have found a lower upper bound due to the above argument, contradicting the definition of ${\displaystyle \sigma _{a}}$.${\displaystyle \Box }$

Formulas[edit | edit source]

Proof:

This follows directly from theorem 2.11 and the fact that ${\displaystyle f}$ strongly multiplicative ${\displaystyle \Rightarrow }$ ${\displaystyle {\frac {f(n)}{n^{s}}}}$ strongly multiplicative.${\displaystyle \Box }$