论文信息 - Logarithmic convexity and inequalities for the gamma function

Logarithmic convexity and inequalities for the gamma function

Abstract We propose a method, based on logarithmic convexity, for producing sharp bounds for the ratio Γ(x+β)/Γ(x). As an application, we present an inequality that sharpens and generalizes inequalities due to Gautschi, Chu, Boyd, Lazarevic-Lupas, and Kershaw.

Milan Merkle | M. Merkle

[1] D. Kershaw. Some extensions of W. Gautschi’s inequalities for the gamma function , 1983 .

[2] V. Uppuluri. A stronger version of Gautschi's inequality satisfied by the gamma function , 1964 .

[3] K. Strubecker,et al. Mitrinovic: Analytic Inequalities / Hilbert: Hilbert, Gesammelte Abhandlungen / Pepperhoff und Ettwig: Interferenzschichten‐Mikroskopie , 1971 .

[4] J. Chu. A Modified Wallis Product and Some Applications , 1962 .

[5] F. B. Hildebrand,et al. Introduction To Numerical Analysis , 1957 .

[6] E. Artin,et al. The Gamma Function , 1964 .

[7] Horst Alzer,et al. Some gamma function inequalities , 1993 .

[8] A. V. Boyd. Note on a paper by Uppuluri. , 1967 .

[9] W. Gautschi. Some Elementary Inequalities Relating to the Gamma and Incomplete Gamma Function , 1959 .