[PDF] Top 20 Optimal power mean bounds for the second Yang mean

... logarithmic mean, identric mean, first Seiffert mean [], first Yang mean [], Toader mean [], Neuman-Sándor mean [, ], Sándor mean [], second Seif- fert ... See full document

... Optimal bounds for Neuman-Sándor mean in terms of the convex combination of the logarithmic and the second Seiffert means Jing-Jing Chen, Jian-Jun Lei and Bo-Yong Long* *.. Correspondenc[r] ... See full document

... Wang, “The optimal convex combination bounds of arithmetic and harmonic means for the Seiffert’s mean,” Journal of Inequalities and Applications, vol.. Chu, “An optimal inequality for pow[r] ... See full document

... arithmetic mean A(a, b) [1–4], the quadratic mean Q(a, b) [5], the contra-harmonic mean C(a, b) [6–9], the Neuman–Sándor mean NS(a, b) [10–12], the second Seiffert mean T (a, b) ... See full document

... The second inequality of (.) is due to Borwein and Borwein [], and Yang [] presented a simple proof by use of the ‘Comparison Lemma’ [, Lemma ... See full document

... 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

... Seiffert mean, T (a, b) = 2 arctan[(a−b)/(a+b)] a−b = SB [A (a, b) , Q (a, b)] is the second Seiffert mean, M (a,b) = 2 arcsin h[(a−b)/(a+b)] a−b = SB [Q (a, b) , A (a, b)] is the Neuman-S´andor ... See full document

... holds for all a, b >  with a = b. The left inequality of (.) was first proposed by Carlson and Vuorinen [] and also was proved by different methods in [–]. Vamanamurthy and Vuorinen [] proved that AG(a, b) ... See full document

... Optimal power mean bounds for Yang mean Zhen-Hang Yang1 , Li-Min Wu2 and Yu-Ming Chu1* * Correspondence: [email protected] 1 School of mathematics and Computation Science, Hunan City[r] ... See full document

... Wang, “The optimal upper and lower power mean bounds for a convex combination of the arithmetic and logarithmic means,” Abstract and Applied Analysis, vol.. Long, “Best possible inequali[r] ... See full document

... the optimal convex combination bounds of the geometric and Neuman means for the Toader-type mean, and give several new upper and lower bounds for the complete elliptic integral of the ... See full document

... ing with respect to p ∈ R for fixed a, b >  with a = b, the Schwab-Borchardt mean SB(a, b) is strictly increasing in both a and b, nonsymmetric and homogeneous of de- gree  with respect to a and b. Many ... See full document

... 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 harmonic ...new bounds for a ... See full document

... 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

... Wang, “The optimal upper and lower power mean bounds for a convex combination of the arithmetic and logarithmic means,” Abstract and Applied Analysis, vol.. Long, “Best possible inequali[r] ... See full document

... Xia, W-F, Chu, Y-M, Wang, G-D: The optimal upper and lower power mean bounds for a convex combination of the arithmetic and logarithmic means.. Long, B-Y, Chu, Y-M: Optimal power mean bo[r] ... See full document

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

... 25. Sándor, J: On certain inequalities for means. J Math Anal Appl. 189(2), 602 – 606 (1995). doi:10.1006/jmaa.1995.1038 26. Sándor, J: On certain inequalities for means II. J Math Anal Appl. 199(2), 629 – 635 (1996). ... See full document

... Chu, Y-M, Wang, M-K, Qiu, S-L: Optimal combination bounds of root-square and arithmetic means for Toader mean.. Song, Y-Q, Jiang, W-D, Chu, Y-M, Yan, D-D: Optimal bounds for Toader mean [r] ... See full document

... The study of inequalities involving means has become very popular in recent years be- cause of their applications in various kinds of areas of mathematics. Finding sharp bounds for inequalities is an important ... See full document