9 citations to 10.18514/MMN.2014.1176 (Crossref Cited-By Service)

1. Jing-Jing Chen, Jian-Jun Lei, Bo-Yong Long, “Optimal bounds for Neuman-Sándor mean in terms of the convex combination of the logarithmic and the second Seiffert means”, J Inequal Appl, 2017, № 1, 2017, 251  
2. Ling Zhu, “New bounds for the exponential function with cotangent”, J Inequal Appl, 2018, № 1, 2018, 106  
3. Hui-Zuo Xu, Yu-Ming Chu, Wei-Mao Qian, “Sharp bounds for the Sándor–Yang means in terms of arithmetic and contra-harmonic means”, J Inequal Appl, 2018, № 1, 2018, 127  
4. Hao-Chuan Cui, Nan Wang, Bo-Yong Long, “Optimal Bounds for the Neuman-Sándor Mean in terms of the Convex Combination of the First and Second Seiffert Means”, Mathematical Problems in Engineering, 2015, 2015, 1  
5. Fei Yan, Qin Gao, “Extensions and demonstrations of Hölder’s inequality”, J Inequal Appl, 2019, № 1, 2019, 97  
6. Ravi Prakash Agarwal, Erdal Karapinar, Marko Kostić, Jian Cao, Wei-Shih Du, “A Brief Overview and Survey of the Scientific Work by Feng Qi”, Axioms, 11, № 8, 2022, 385  
7. Wen-Hui Li, Qi-Xia Shen, Bai-Ni Guo, “Several Double Inequalities for Integer Powers of the Sinc and Sinhc Functions with Applications to the Neuman–Sándor Mean and the First Seiffert Mean”, Axioms, 11, № 7, 2022, 304  
8. Wen-Hui Li, Peng Miao, Bai-Ni Guo, “Bounds for the Neuman–Sándor Mean in Terms of the Arithmetic and Contra-Harmonic Means”, Axioms, 11, № 5, 2022, 236  
9. Wei-Mao Qian, Tie-Hong Zhao, Yu-Pei Lv, “Refinements of bounds for the arithmetic mean by new Seiffert-like means”, AIMS Mathematics, 6, № 8, 2021, 9036