[PDF] Top 20 Sharp bounds for Sándor mean in terms of arithmetic, geometric and harmonic means

Sharp bounds for Sándor mean in terms of arithmetic, geometric and harmonic means

... Correspondence: [email protected] 2 School of Mathematics and Computation Sciences, Hunan City University, Yiyang, 413000, China Full list of author information is available at the e[r] ... See full document

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Sharp bounds for a special quasi arithmetic mean in terms of arithmetic and geometric means with two parameters

... the sharp bounds for the special quasi-arithmetic mean E(a, b) in terms of the arithmetic mean A(a, b) and geometric mean G(a, b) with two ...one-parameter ... See full document

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Sharp bounds for the Sándor–Yang means in terms of arithmetic and contra harmonic means

... Schwab–Borchardt mean SB(a, b) is strictly increasing, non-symmetric and homogeneous of degree one with re- spect to its ...Schwab–Borchardt mean has attracted the at- tention of many ...Borchardt ... See full document

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Sharp bounds for Neuman means in terms of two parameter contraharmonic and arithmetic mean

... Yang, Z.-H., Qian, W.-M., Chu, Y.-M., Zhang, W.: On approximating the arithmetic–geometric mean and complete elliptic integral of the ﬁrst kind.. Lin, L., Liu, Z.-Y.: An alternating proj[r] ... See full document

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Sharp bounds involving the Sandor-Yang means in terms of other bivariate means

... classical geometric, arithmetic, quadratic and contra-harmonic means of a and ...Schwab-Borchardt mean is strictly increasing in both a and b, non-symmetric and homogeneous of degree 1 ... See full document

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Optimal bounds for Neuman means in terms of geometric, arithmetic and quadratic means

... Optimal bounds for Neuman-Sándor mean in terms of the convex combinations of harmonic, geometric, quadratic, and contraharmonic ...some means derived from the ... See full document

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Sharp bounds for Seiffert and Neuman Sándor means in terms of generalized logarithmic means

... Chu, Y-M, Zong, C, Wang, G-D: Optimal convex combination bounds of Seiﬀert and geometric means for the arithmetic mean.. Borwein, JM, Borwein, PB: Inequalities for compound mean iteratio[r] ... See full document

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Optimal bounds for the first and second Seiffert means in terms of geometric, arithmetic and contraharmonic means

... Matejíčka, L: Sharp bounds for the weighted geometric mean of the first Seiffert and logarithmic means in terms of weighted generalized Heronian mean.. Yang, Z-H: Sharp bounds for Seiffert[r] ... See full document

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Sharp bounds for Toader mean in terms of arithmetic, quadratic, and Neuman means

... Schwab-Borchardt mean SB(a, b) is strictly increasing in both a and b, nonsymmetric and homogeneous of degree ...ate means are special cases of the Schwab-Borchardt ...Seiﬀert mean, T (a, b) = (a – ... See full document

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Optimal two parameter geometric and arithmetic mean bounds for the Sándor–Yang mean

... the sharp bounds for the Sándor–Yang mean in terms of certain families of the two-parameter geometric and arithmetic mean and the one-parameter geometric and ... See full document

12

Two Sharp Inequalities for Power Mean, Geometric Mean, and Harmonic Mean

... Wu, “Generalization and sharpness of the power means inequality and their applications,” Journal of Mathematical Analysis and Applications, vol.. Richards, “Sharp power mean bounds for t[r] ... See full document

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Optimal bounds for Neuman Sándor mean in terms of the geometric convex combination of two Seiffert means

... Optimal bounds for Neuman-Sándor mean in terms of the geometric convex combination of two Seiffert means Hua-Ying Huang, Nan Wang and Bo-Yong Long* *.. Correspondence: [email protected][r] ... See full document

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Optimal bounds for arithmetic geometric and Toader means in terms of generalized logarithmic mean

... Optimal bounds for arithmetic-geometric and Toader means in terms of generalized logarithmic mean Qing Ding1 and Tiehong Zhao2* *.. Correspondence: [email protected] 2 Department [r] ... See full document

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Optimal bounds for the Neuman Sándor mean in terms of the first Seiffert and quadratic means

... lower bounds for the Neuman-Sándor mean M(a, b) in terms of the geometric convex combinations of the ﬁrst Seiﬀert mean P(a, b) and the quadratic mean Q(a, ... See full document

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Improvements of bounds for the Sándor–Yang means

... 5 Conclusion We present sharp upper and lower bounds for the Sándor–Yang means RAQ and RQA in terms of the arithmetic and contraharmonic means and provide new bounds for the Seiffert mea[r] ... See full document

8

Sharp bounds for the arithmetic geometric mean

... Abstract In this article, we establish some new inequality chains for the ratio of certain bivariate means, and we present several sharp bounds for the arithmetic-geometric mean.. MSC: P[r] ... See full document

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Optimal bounds for Neuman-Sándor mean in terms of one-parameter centroidal mean

... Liu, Optimal bounds for Neuman-S´aandor mean in terms of the convex combinations of harmonic, geometric, quadratic, and contraharmonic means, Abstr. Jiang and Y.-M[r] ... See full document

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The first Seiffert mean is strictly (G,A) super stabilizable

... We have used Maple and Maxima, which already oﬀered good results in proving inequalities for means (see, for example, []). Note that all the symbolic computations are exact, because only polynomials with ... See full document

7

Optimal Power Mean Bounds for the Weighted Geometric Mean of Classical Means

... Wu, “Generalization and sharpness of the power means inequality and their applications,” Journal of Mathematical Analysis and Applications, vol.. Richards, “Sharp power mean bounds for t[r] ... See full document

6

Sharp bounds for Neuman means in terms of one parameter family of bivariate means

... Schwab-Borchardt mean and their ...some means derived from the Schwab-Borchardt ...some means derived from the Schwab-Borchardt mean ... See full document

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