Lanczos approximation

Summary

Lanczos approximation is a mathematical concept^[1]. It draws 12 Wikipedia views per month (mathematical_concept category, ranking #245 of 1,007).^[2]

Key Facts

• Lanczos approximation's instance of is recorded as mathematical concept^[3].
• Cornelius Lanczos is named after Lanczos approximation^[4].
• Lanczos approximation's Freebase ID is recorded as /m/06btg5^[5].
• Lanczos approximation's defining formula is recorded as \Gamma(z+1) = \sqrt{2\pi} {\left( z + g + \frac{1}{2} \right)}^{z + \frac{1}{2} } e^{-\left(z+g+\frac{1}{2}\right)} A_g(z)^[6].
• Lanczos approximation's MathWorld ID is recorded as LanczosApproximation^[7].
• Lanczos approximation's maintained by WikiProject is recorded as WikiProject Mathematics^[8].
• Lanczos approximation's Microsoft Academic ID is recorded as 88059565^[9].

Why It Matters

Lanczos approximation draws 12 Wikipedia views per month (mathematical_concept category, ranking #245 of 1,007).^[2]