Difference between revisions of "Manuals/calci/GFUNCTION"

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*According to elementary factors, it is a special case of the double gamma function.
 
*According to elementary factors, it is a special case of the double gamma function.
 
*Formally, the Barnes G-function is defined in the following Weierstrass product form:
 
*Formally, the Barnes G-function is defined in the following Weierstrass product form:
<math>G(1+z)={(2\pi)}^\frac{z}{2}exp(-\frac{z+z^2(1+\gamma)}{2})</math>
+
<math>G(1+z)={(2\pi)}^\frac{z}{2}exp(-\frac{z+z^2(1+\gamma)}{2})\prod_{k=1}^\infty [{(1+\frac{z}{k})}^k exp(\frac {z^2}{2k}-z)]</math>
<math>\prod_{k=1}^\infty{{(1+\frac{z}{k}}^k exp(\frac {z^2}{2k}-z)</math>
+
 
 +
 
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==Examples==
 +
# GFUNCTION(10) = 5056584744960000
 +
# GFUNCTION(4) = 2
 +
# GFUNCTION(7) = 34560
 +
# GFUNCTION(5.2) = 12
 +
 
 +
==Related Videos==
 +
 
 +
{{#ev:youtube|v=XZIVrkkYBRI&t=101s|280|center|Gamma Function}}
 +
 
 +
==See Also==
 +
*[[Manuals/calci/BETAFUNCTION | BETAFUNCTION]]
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*[[Manuals/calci/KFUNCTION  | KFUNCTION ]]
 +
 
 +
==References==
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*[https://en.wikipedia.org/wiki/Barnes_G-function  G Function]
 +
 
 +
*[[Z_API_Functions | List of Main Z Functions]]
 +
 
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*[[ Z3 |  Z3 home ]]

Latest revision as of 15:02, 22 February 2019

GFUNCTION (Number)


  • is any positive real number.

Description

  • This function shows the value of the Barnes G-function value.
  • In , is any real number.
  • is a function that is an extension of super factorials to the complex numbers.
  • It is related to the Gamma function, the K-function and the Glaisher–Kinkelin constant, and was named after mathematician Ernest William Barnes.
  • According to elementary factors, it is a special case of the double gamma function.
  • Formally, the Barnes G-function is defined in the following Weierstrass product form:


Examples

  1. GFUNCTION(10) = 5056584744960000
  2. GFUNCTION(4) = 2
  3. GFUNCTION(7) = 34560
  4. GFUNCTION(5.2) = 12

Related Videos

Gamma Function

See Also

References