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Inequalities for the gamma function with applications to permanents

✍ Scribed by Peter J. Grabner; Robert F. Tichy; Uwe T. Zimmermann

Publisher
Elsevier Science
Year
1996
Tongue
English
Weight
548 KB
Volume
154
Category
Article
ISSN
0012-365X

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✦ Synopsis

The best known upper bound on the permanent of a O-l matrix relies on the knowledge of the number of nonzero entries per row. In certain applications only the total number of nonzero entries is known. In order to derive bounds in this situation we prove that the function f:( -1, co) + l%, defined by f(x):= (logT(x + l))/ x, is concave, strictly increasing and satisfies an analogue of the famous Bohr-Mollerup theorem. For further discussion of such bounds we derive some inequalities for this function.

πŸ“œ SIMILAR VOLUMES

Logarithmic Convexity and Inequalities f
Logarithmic Convexity and Inequalities for the Gamma Function
✍ Milan Merkle πŸ“‚ Article πŸ“… 1996 πŸ› Elsevier Science 🌐 English βš– 132 KB

We propose a method, based on logarithmic convexity, for producing sharp Ž . Ž . bounds for the ratio ⌫ x q ␀ r⌫ x . As an application, we present an inequality that sharpens and generalizes inequalities due to Gautschi, Chu, Boyd, Lazarevic-Ĺupas ¸, and Kershaw.