Sharp Geometric Mean Bounds for Neuman Means

Sharp Geometric Mean Bounds for Neuman Means

We find the best possible constants α1,α2,β1,β2∈[0,1/2] and α3,α4,β3,β4∈[1/2,1] such that the double inequalities G(α1a+(1-α1)b,α1b + (1-α1)a)<NAG(a,b)<G(β1a + (1-β1)b,β1b+(1-β1)a),G(α2a+(1-α2)b,α2b + (1-α2)a)<NGA(a,b)<G(β2a + (1-β2)b,β2b+(1-β2)a),Q(α3a+(1-α3)b,α3b + (1-α3)a)<NQA(a,b)...

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Bibliographic Details
Main Authors:	Yan Zhang, Yu-Ming Chu, Yun-Liang Jiang
Format:	Article
Language:	English
Published:	Wiley 2014-01-01
Series:	Abstract and Applied Analysis
Online Access:	http://dx.doi.org/10.1155/2014/949815
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