Difference between revisions of "Manuals/calci/GFUNCTION"

Revision as of 16:43, 8 August 2017

GFUNCTION (Number)

This function shows the value of the Barnes G-function value.
In $GFUNCTION(Number)$ , $Number$ is any real number.
$G(z)$ 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:

$G(1+z)={(2\pi )}^{\frac {z}{2}}exp(-{\frac {z+z^{2}(1+\gamma )}{2}})$

Failed to parse (syntax error): {\displaystyle {{(1+\frac{z}{k})}^k exp(\frac {z^2}{2k}-z)}

@@ Line 10: / Line 10: @@
 *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>\prod_{k=1}^\infty {{(1+\frac{z}{k})}^k </math>
+*<math>\prod_{k=1}^\infty {(1+\frac{z}{k})}^k </math>
 <math>{{(1+\frac{z}{k})}^k exp(\frac {z^2}{2k}-z)</math>