| Package | Description |
|---|---|
| dev.nm.analysis.function.special.gamma |
| Class and Description |
|---|
| Gamma
The Gamma function is an extension of the factorial function to real and complex numbers, with its argument shifted down by 1.
|
| Lanczos
The Lanczos approximation is a method for computing the Gamma function numerically, published by Cornelius Lanczos in 1964.
|
| LogGamma.Method
the available methods to compute \(\log (\Gamma(z))\)
|
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