Best possible inequalities among harmonic, geometric, logarithmic and seiffert means
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Publication:2885361
DOI10.7153/MIA-15-36zbMath1242.26044OpenAlexW2335051624MaRDI QIDQ2885361
Zi-Kui Wang, Miao-Kun Wang, Yu-Ming Chu
Publication date: 23 May 2012
Published in: Mathematical Inequalities & Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.7153/mia-15-36
Related Items (11)
Ostrowski type inequalities involving conformable fractional integrals ⋮ Optimal bounds for Neuman-Sándor mean in terms of the convex combination of the logarithmic and the second Seiffert means ⋮ Some new inequalities of Hermite-Hadamard type for \(s\)-convex functions with applications ⋮ Sharp bounds for Sándor-Yang means in terms of quadratic mean ⋮ Sharp Cusa type inequalities with two parameters and their applications ⋮ Sharp power mean bounds for the one-parameter harmonic mean ⋮ Optimal bounds of classical and non-classical means in terms of \(Q\) means ⋮ Optimal bounds for the first and second Seiffert means in terms of geometric, arithmetic and contraharmonic means ⋮ Improvements of bounds for the Sándor-Yang means ⋮ Sharp power mean bounds for two Sándor-Yang means ⋮ Bounding the Sándor-Yang means for the combinations of contraharmonic and arithmetic means
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