Optimal bounds of exponential type for arithmetic mean by Seiffert-like mean and centroidal mean
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Publication:2240595
DOI10.1007/s13398-021-01125-0zbMath1490.26035OpenAlexW3204687790WikidataQ115600878 ScholiaQ115600878MaRDI QIDQ2240595
Publication date: 4 November 2021
Published in: Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A: Matemáticas. RACSAM (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s13398-021-01125-0
Related Items (3)
Optimal bounds for two Seiffert-like means by arithmetic mean and harmonic mean ⋮ Sharp weighted Hölder mean bounds for the complete elliptic integral of the second kind ⋮ Monotonicity of three kinds of functions involving the Gaussian hypergeometric function
Cites Work
- Unnamed Item
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- Inequalities for quasiconformal mappings in space
- A double inequality for the ratio of two non-zero neighbouring Bernoulli numbers
- On some inequalities for the Bernoulli numbers
- Sharp bounds for the Bernoulli numbers
- Optimal bounds for the sine and hyperbolic tangent means. IV
- Sharp bounds for Neuman means in terms of two-parameter contraharmonic and arithmetic mean
- Optimal bounds for the tangent and hyperbolic sine means
- Sharp bounds for the ratio of two zeta functions
- Sharp one-parameter geometric and quadratic means bounds for the Sándor-Yang means
- New bounds for the ratio of two adjacent even-indexed Bernoulli numbers
- Sharp power mean bounds for two Sándor-Yang means
- Monotonicity criterion for the quotient of power series with applications
- Optimal inequalities between Neuman-Sándor, centroidal and harmonic means
- On Seiffert-like means
- Optimal bounds for the tangent and hyperbolic sine means II
- Bounds for the perimeter of an ellipse in terms of power means
- Optimal bounds for Neuman mean using arithmetic and centroidal means
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