1 |
H. J. Seiffert, Problem 887, Nieuw Archief voor Wiskunde, 11(1993), 176-176.
|
2 |
H. J. Seiffert, Aufgabe 16, Die Wurzel, 29(1995), 221-222.
|
3 |
P. A. Hasto, Optimal inequalities between Seiffert's mean and power mean, Mathematical Inequalities and Applications, 7(2004), 47-53.
|
4 |
E. Neuman and J. Sandor, On certain means of two arguments and their extensions, International Journal of Mathematics and Mathematical Sciences, 16(2003), 981-993.
|
5 |
E. Neuman and J. Sandor, On the Schwab-Borchardt mean, Mathematica Pannonica, 14(2003), 253-266.
|
6 |
P. A. Hasto, A monotonicity property of ratios of symmetric homogeneous means, Journal of Inequalities in Pure and Applied Mathematics, 3(2002), 1-54.
|
7 |
H. J. Seiffert, Ungleichungen fur einen bestimmten mittelwert, Nieuw Archief voor Wiskunde, 13(1995), 195-198.
|
8 |
Y. M. Chu, Y. F. Qiu, M. K. Wang and G. D. Wang, The optimal convex combination bounds of arithmetic and harmonic means for the Seiffert's mean, Journal of Inequalities and Applications, Article ID 436457, dio: 10.1155/436457, 7 pages, 2010.
|
9 |
M. K. Wang, Y. M. Chu and Y. F. Qiu, Some comparison inequalities for generalized Muirhead and identric means, Journal of Inequalities and Applications, 2010, Article ID 295620,10 pages, 2010.
|
10 |
B. Y. Long and Y. M. Chu, Optimal inequalities for generalized logarithmic, arithmetic and geometric means, Journal of Inequalities and Applications, 2010, Article ID 806825, 10 pages, 2010.
|
11 |
B. Y. Long and Y. M. Chu, Optimal power mean bounds for the weighted geometric mean of classical means, Journal of Inequalities and Applications, 2010, Article ID 905679, 6 pages, 2010.
|
12 |
W. F. Xia, Y. M. Chu and G. D. Wang, The optimal upper and lower power mean bounds for a convex combination of the arithmetic and logarithmic means, Abstract and Applied Analysis, 2010, Article ID604804, 9 pages, 2010.
|
13 |
Y. M. Chu and B. Y. Long, Best possible inequalities between generalized logarithmic mean and classical means, Abstract and Applied Analysis, 2010, Article ID 303286, 13 pages, 2010.
|
14 |
M. Y. Shi, Y. M. Chu and Y. P. Jiang, Optimal inequalities among various means of two arguments, Abstract and Applied Analysis, 2009, Article ID 694394, 10 pages, 2009.
|
15 |
Y. M. Chu and W. F. Xia, Two sharp inequalities for power mean, geometric mean and harmonic mean, Journal of Inequalities and Applications, 2009, Article ID 741923, 6 pages, 2009.
|
16 |
Y. M. Chu and W. F. Xia, Inequalities for generalized logarithmic means, Journal of Inequalities and Applications, 2009, Article ID 763252, 7 pages, 2009.
|
17 |
J. J. Wen and W. L. Wang, The optimization for the inequalities of power means, Journal of Inequalities and Applications, 2006, Article ID 46782, 25 pages, 2006.
|
18 |
T. Hara, M. Uchiyama and S. E. Takahasi, A refinement of various mean inequalities, Journal of Inequalities and Applications, 2(1998), 387-395.
|
19 |
E. Neuman and J. Sandor, On the Schwab-Borchardt mean, Mathematica Pannonica, 17(2006), 49-59.
|
20 |
A. A. Jagers, Solution of problem 887, Nieuw Archief voor Wiskunde, 12(1994), 230-231.
|