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Optimal lower power mean bound for the convex combination of harmonic and logarithmic means - MaRDI portal

Optimal lower power mean bound for the convex combination of harmonic and logarithmic means

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Publication:554909

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DOI10.1155/2011/520648zbMath1217.26040OpenAlexW2028136887WikidataQ58654266 ScholiaQ58654266MaRDI QIDQ554909

Yu-Ming Chu, Cheng Zong, Shan-shan Wang

Publication date: 22 July 2011

Published in: Abstract and Applied Analysis (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1155/2011/520648

Mathematics Subject Classification ID

Inequalities for sums, series and integrals (26D15)

Related Items

Convexity and concavity of the modified Bessel functions of the first kind with respect to Hölder means ⋮ A best possible double inequality for power mean ⋮ Optimal inequalities for power means ⋮ Sharp bounds by the generalized logarithmic mean for the geometric weighted mean of the geometric and harmonic means ⋮ A sharp double inequality between harmonic and identric means ⋮ Sharp bounds for Sándor-Yang means in terms of quadratic mean ⋮ Sharp power mean bounds for Seiffert mean ⋮ A necessary and sufficient condition for the convexity of the generalized elliptic integral of the first kind with respect to Hölder mean ⋮ Improvements of bounds for the Sándor-Yang means

Cites Work

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