Difference between revisions of "Manuals/calci/RIEMANNZETA"

Revision as of 00:56, 25 July 2014

RIEMANNZETA(s)

$s$ is the value from 0 10 infinity.

Description

This function gives the result for the function of Riemann-Zeta function.
It is also known as Euler-Riemann Zeta function.
This function is useful in number theory for the investigating properties of prime numbers.
It is denoted by $\zeta (s)$ .
This function is defined as the infinite series $\zeta (s)=1+2^{-s}+3^{-s}+.....$ .
When the value of s=1,then this series is called the harmonic series.
When it is increase without any bound or limit, then its sum is infinite.
When the value of s is larger than 1,the the series converges to a finite number as successive terms are added.
The riemann zeta function is defined for Complex numbers also.
So $\zeta (s)$ is a function of a complex variable $s=\sigma +it$ ,where $\sigma$ and t are real numbers.i is the imaginary unit.
It is also a function of a complex variable s that analytically continues the sum of the infinite series , which converges when the real part of s is greater than 1.
It is defined by : $\zeta (s)=\sum _{n=1}^{\infty }n^{-s}={\frac {1}{1^{s}}}+{\frac {1}{2^{s}}}+{\frac {1}{3^{s}}}+.....$ where $\sigma$ =Real part of s>1.
We can define this by integral also:Failed to parse (syntax error): {\displaystyle zeta(s)=\frac{1}{\Gamma(s)}\int\limits_{0}^{\infty} \frac{x^{s-1}{e^{x-1}\,dx }
Riemann zeta function is a meromorphic function on the whole complex s-plane, which is holomorphic everywhere except for a simple pole at s = 1 with residue 1.
(For special values:(i)Any positive integer 2n.for n ≥ 1)so in particular ζ vanishes at the negative even integers because Bm = 0 for all odd m other than 1.
For odd positive integers, no such simple expression is known.
- When s=1,then ζ (1) is Harmonic series.
- when s=2, then ζ (2) derivation is Basel problem.
- when s=3, then ζ (3) derivation is Apery's constant.
- When s=4, then ζ (4) derivation is Planck's law

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 *This function is useful in number theory for the investigating properties of prime numbers.
 *It is denoted by <math>\zeta(s)</math>.
-*This function is defined as the infinite series ζ(s)=1+2^-s+3^-s+.....
+*This function is defined as the infinite series <math>\zeta(s)=1+2^{-s}+3^{-s}+.....</math>.
 *When the value of s=1,then this series is called the harmonic series.
 *When it is increase without any bound or limit, then its sum is infinite.
 *When the value of s is larger than 1,the  the series converges to a finite number as successive terms are added.
 *The riemann zeta function is defined for Complex numbers also.
-*So  ζ(s) is a function of a complex variable s = σ + it.
+*So  <math>\zeta(s)</math> is a function of a complex variable <math>s = \sigma + it</math>,where <math>\sigma</math> and t are real numbers.i is the imaginary unit.
-*It is a function of a complex variable s that analytically continues the sum of the infinite series , which converges when the real part of s is greater than 1.
+*It is also  a function of a complex variable s that analytically continues the sum of the infinite series , which converges when the real part of s is greater than 1.
-*It is defined by :ζ(s)=summation n= 1 to infinity n^-s= 1/1^s+1/2^s+1/3^s+..... where σ =Real part of s>1.
+*It is defined by :<math>\zeta(s)=\sum_{n=1}^\infty n^{-s}= \frac{1}{1^s}+\frac{1}{2^s}+\frac{1}{3^s}+.....</math> where <math>\sigma</math> =Real part of s>1.
-*We can define this by integral also:ζ(s)=1/gamma (s)integral 0 to infinity x^(s-1)/e^x-1 dx.
+*We can define this by integral also:<math>zeta(s)=\frac{1}{\Gamma(s)}\int\limits_{0}^{\infty} \frac{x^{s-1}{e^{x-1}\,dx </math>
 *Riemann zeta function is a meromorphic function on the whole complex s-plane, which is holomorphic everywhere except for a simple pole at s = 1 with residue 1.
 *(For  special values:(i)Any positive integer 2n.for n ≥ 1)so in particular ζ vanishes at the negative even integers because Bm = 0 for all odd m other than 1.

Difference between revisions of "Manuals/calci/RIEMANNZETA"

Revision as of 00:56, 25 July 2014

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