Riemann zeta-function: Difference between revisions

Definition

As a Dirichlet series

The Riemann zeta-function is the following Dirichlet series of ${\displaystyle s}$:

${\displaystyle \zeta (s)={\displaystyle \sum _{n=1}^{\mathrm{\infty }}}\frac{1}{n^s}}$.

In other words, it is the Dirichlet series for the all ones function ${\displaystyle U}$.

It can also be expressed as a product, using the product formula for Dirichlet series of completely multiplicative function:

${\displaystyle \zeta (s)={\sum }_{p\in \mathbb{P}}\frac{1}{1-p^{-s}}}$.

As the function obtained by analytic continuation

The Dirichlet series for the Riemann zeta-function is absolutely convergent for all complex numbers ${\displaystyle s}$ for which ${\displaystyle \mathrm{R}\mathrm{e}(s)>1}$. Although the series does not make sense for other ${\displaystyle s}$, the function extends to a meromorphic function of ${\displaystyle \mathbb{C}}$, with a single simple pole at the point ${\displaystyle 1}$.

In terms of the Dirichlet eta-function

The Riemann zeta-function can be defined in terms of the Dirichlet eta-function:

${\displaystyle \zeta (s)=\frac{\eta (s)}{1-2^{1-s}}}$.

The Dirichlet eta-function is also defined in terms of a Dirichlet series, but this Dirichlet series has the advantage of being convergent on a wider range.

Related functions

Similarly defined functions

• Dirichlet L-function
• Dedekind zeta-function is a generalization to number fields.

Other related functions

• Gamma function
• Beta function

Zeros and poles

Poles

The Riemann zeta-function has a single simple pole at ${\displaystyle 1}$.

Zeros

The Riemann zeta-function has zeros at all negative even integers. There are also infinitely many zeros with real part ${\displaystyle 1/2}$. The Riemann hypothesis states that all zeros other than the negative even integers have real part ${\displaystyle 1/2}$.