English

Two asymptotic expansions for gamma function developed by Windschitl's formula

Classical Analysis and ODEs 2017-12-22 v1

Abstract

In this paper, we develop Windschitl's approximation formula for the gamma function to two asymptotic expansions by using a little known power series. In particular, for nNn\in \mathbb{N} with n4n\geq 4, we have \begin{equation*} \Gamma \left( x+1\right) =\sqrt{2\pi x}\left( \tfrac{x}{e}\right) ^{x}\left( x\sinh \tfrac{1}{x}\right) ^{x/2}\exp \left( \sum_{k=3}^{n-1}\tfrac{\left( 2k\left( 2k-2\right) !-2^{2k-1}\right) B_{2k}}{2k\left( 2k\right) !x^{2k-1}} +R_{n}\left( x\right) \right) \end{equation*} with \begin{equation*} \left| R_{n}\left( x\right) \right| \leq \frac{\left| B_{2n}\right| }{2n\left( 2n-1\right) }\frac{1}{x^{2n-1}} \end{equation*} for all x>0x>0, where B2nB_{2n} is the Bernoulli number. Moreover, we present some approximation formulas for gamma function related to Windschitl's approximation one, which have higher accuracy.

Keywords

Cite

@article{arxiv.1712.08039,
  title  = {Two asymptotic expansions for gamma function developed by Windschitl's formula},
  author = {Zhen-Hang Yang and Jing-Feng Tian},
  journal= {arXiv preprint arXiv:1712.08039},
  year   = {2017}
}

Comments

14 pages

R2 v1 2026-06-22T23:26:10.651Z