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Abstract and Applied Analysis
Volume 2013 (2013), Article ID 903982, 5 pages
Bounds for the Combinations of Neuman-Sándor, Arithmetic, and Second Seiffert Means in terms of Contraharmonic Mean
1Department of Mathematics, Huzhou Teachers College, Huzhou 313000, China
2School of Distance Education, Huzhou Broadcast and TV University, Huzhou 313000, China
3School of Information and Engineering, Huzhou Teachers College, Huzhou 313000, China
4School of Mathematics and Computation Science, Hunan City University, Yiyang 413000, China
Received 4 January 2013; Accepted 27 February 2013
Academic Editor: Salvatore A. Marano
Copyright © 2013 Zai-Yin He et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Citations to this Article [7 citations]
The following is the list of published articles that have cited the current article.
- Hui Sun, Xu-Hui Shen, Tie-Hong Zhao, and Yu-Ming Chu, “Optimal bounds for the neuman-sándor means in terms of geometric and contraharmonic means,” Applied Mathematical Sciences, vol. 7, no. 85-88, pp. 4363–4373, 2013.
- Wei-Mao Qian, and Yu-Ming Chu, “On Certain Inequalities for Neuman-Sándor Mean,” Abstract and Applied Analysis, vol. 2013, pp. 1–6, 2013.
- Fan Zhang, Yu-Ming Chu, and Wei-Mao Qian, “Bounds for the Arithmetic Mean in Terms of the Neuman-Sándor and Other Bivariate Means,” Journal of Applied Mathematics, vol. 2013, pp. 1–7, 2013.
- Hui Sun, Tiehong Zhao, Yuming Chu, and Baoyu Liu, “A Note On The Neuman-Sandor Mean,” Journal of Mathematical Inequalities, vol. 8, no. 2, pp. 287–297, 2014.
- Edward Neuman, “On Some Means Derived From The Schwab-Borchardt Mean Ii,” Journal of Mathematical Inequalities, vol. 8, no. 2, pp. 359–368, 2014.
- Mira C. Anisiu, and Valeriu Anisiu, “The first Seiffert mean is strictly (G, A)-super-stabilizable,” Journal of Inequalities and Applications, 2014.
- Edward Neuman, “On Some Means Derived From The Schwab-Borchardt Mean,” Journal of Mathematical Inequalities, vol. 8, no. 1, pp. 171–183, 2014.