Logarithmically Complete Monotonicity Properties Relating to the Gamma Function

Logarithmically Complete Monotonicity Properties Relating to the Gamma Function

We prove that the function fα,β(x)=Γβ(x+α)/xαΓ(βx) is strictly logarithmically completely monotonic on (0,∞) if (α,β)∈{( α,β):1/α≤β≤1, α≠1}∪{(α,β):0<β≤1,φ1(α,β)≥0,φ2(α,β)≥0} and [fα,β(x)]-1 is strictly logarithmically completely monotonic on (0,∞) if (α,β)∈{(α,β):0<α≤1/2,0<β≤1}∪{(α,β):1≤β≤1...

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Bibliographic Details
Main Authors:	Tie-Hong Zhao, Yu-Ming Chu, Hua Wang
Format:	Article
Language:	English
Published:	Wiley 2011-01-01
Series:	Abstract and Applied Analysis
Online Access:	http://dx.doi.org/10.1155/2011/896483
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