Riemann zeta function: Difference between revisions

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imported>Barry R. Smith
m (Increased domain of series validity to complex nos. with imaginary part > 1.)
imported>Barry R. Smith
m (Moved complex numbers link to first appearance of "complex"/removed "positive" from sentence following Euler Product)
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In [[mathematics]], the '''Riemann zeta function''', named after [[Bernhard Riemann]], is a [[meromorphic function]] defined for complex numbers with [[imaginary part]] <math>\scriptstyle \Im(s) > 1</math> by the [[infinite series]]
In [[mathematics]], the '''Riemann zeta function''', named after [[Bernhard Riemann]], is a [[meromorphic function]] defined for [[complex number]]s with [[imaginary part]] <math>\scriptstyle \Im(s) > 1</math> by the [[infinite series]]


: <math> \zeta(s) = \sum_{n=1}^\infty \frac{1}{n^s} </math>
: <math> \zeta(s) = \sum_{n=1}^\infty \frac{1}{n^s} </math>


and then extended to all other [[complex number|complex]] values of ''s'' except ''s'' = 1 by [[analytic continuation]].  The function is holomorophic everywhere except for a simple pole at ''s'' = 1.
and then extended to all other complex values of ''s'' except ''s'' = 1 by [[analytic continuation]].  The function is holomorophic everywhere except for a simple pole at ''s'' = 1.


[[Leonhard Euler|Euler's]] product formula for the zeta function is
[[Leonhard Euler|Euler's]] product formula for the zeta function is
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: <math> \zeta(s) = \prod_{p\ \mathrm{prime}} \frac{1}{1 - p^{-s}} </math>
: <math> \zeta(s) = \prod_{p\ \mathrm{prime}} \frac{1}{1 - p^{-s}} </math>


(the index ''p'' running through the whole set of positive [[prime number]]s.
(the index ''p'' running through the whole set of [[prime number]]s).


The celebrated [[Riemann hypothesis]] is the conjecture that all non-real values of ''s'' for which &zeta;(''s'')&nbsp;=&nbsp;0 have real part 1/2.  The problem of proving the Riemann hypothesis is the most well-known unsolved problem in mathematics.
The celebrated [[Riemann hypothesis]] is the conjecture that all non-real values of ''s'' for which &zeta;(''s'')&nbsp;=&nbsp;0 have real part 1/2.  The problem of proving the Riemann hypothesis is the most well-known unsolved problem in mathematics.

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In mathematics, the Riemann zeta function, named after Bernhard Riemann, is a meromorphic function defined for complex numbers with imaginary part by the infinite series

and then extended to all other complex values of s except s = 1 by analytic continuation. The function is holomorophic everywhere except for a simple pole at s = 1.

Euler's product formula for the zeta function is

(the index p running through the whole set of prime numbers).

The celebrated Riemann hypothesis is the conjecture that all non-real values of s for which ζ(s) = 0 have real part 1/2. The problem of proving the Riemann hypothesis is the most well-known unsolved problem in mathematics.