Optimal bounds of exponential type for arithmetic mean by Seiffert-like mean and centroidal mean

被引:0
作者
Ling Zhu
机构
[1] Zhejiang Gongshang University,Department of Mathematics
来源
Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A. Matemáticas | 2022年 / 116卷
关键词
Bounds; Seiffert-like means; Sine mean; hyperbolic tangent mean; Arithmetic mean; Centroidal mean; Primary 33B10; Secondary 26D05;
D O I
暂无
中图分类号
学科分类号
摘要
In this paper, optimal bounds for arithmetic mean in terms of hyperbolic sine mean and centroidal mean, the tangent mean and centroidal mean in exponential type are established using the monotone form of L’Hospital’s rule and the criterions for the monotonicity of the quotient of power series. Based on two basic conclusions, we carefully compare them with the existing inequalities involving the four means mentioned above, and obtain a new refined inequality chain.
引用
收藏
相关论文
共 50 条
  • [21] OPTIMAL BOUNDS FOR TOADER MEAN IN TERMS OF ARITHMETIC AND CONTRAHARMONIC MEANS
    Song, Ying-Qing
    Jiang, Wei-Dong
    Chu, Yu-Ming
    Yan, Dan-Dan
    JOURNAL OF MATHEMATICAL INEQUALITIES, 2013, 7 (04): : 751 - 757
  • [22] Optimal power mean bounds for the second Yang mean
    Li, Jun-Feng
    Yang, Zhen-Hang
    Chu, Yu-Ming
    JOURNAL OF INEQUALITIES AND APPLICATIONS, 2016, : 1 - 9
  • [23] Optimal power mean bounds for the second Yang mean
    Jun-Feng Li
    Zhen-Hang Yang
    Yu-Ming Chu
    Journal of Inequalities and Applications, 2016
  • [24] OPTIMAL BOUNDS FOR THE SANDOR MEAN IN TERMS OF THE COMBINATION OF GEOMETRIC AND ARITHMETIC MEANS
    Qian, Wei-Mao
    Ma, Chun-Lin
    Xu, Hui-Zuo
    JOURNAL OF MATHEMATICAL INEQUALITIES, 2021, 15 (02): : 667 - 674
  • [25] A double inequality for bounding Toader mean by the centroidal mean
    Hua, Yun
    Qi, Feng
    PROCEEDINGS OF THE INDIAN ACADEMY OF SCIENCES-MATHEMATICAL SCIENCES, 2014, 124 (04): : 527 - 531
  • [26] A double inequality for bounding Toader mean by the centroidal mean
    YUN HUA
    FENG QI
    Proceedings - Mathematical Sciences, 2014, 124 : 527 - 531
  • [27] Optimal evaluation of a Toader-type mean by power mean
    Song, Ying-Qing
    Zhao, Tie-Hong
    Chu, Yu-Ming
    Zhang, Xiao-Hui
    JOURNAL OF INEQUALITIES AND APPLICATIONS, 2015, : 1 - 12
  • [28] SHARP TWO PARAMETER BOUNDS FOR THE LOGARITHMIC MEAN AND THE ARITHMETIC-GEOMETRIC MEAN OF GAUSS
    Chu, Yu-Ming
    Wang, Miao-Kun
    Qiu, Ye-Fang
    Ma, Xiao-Yan
    JOURNAL OF MATHEMATICAL INEQUALITIES, 2013, 7 (03): : 349 - 355
  • [29] Optimal combinations bounds of root-square and arithmetic means for Toader mean
    Chu, Yu-Ming
    Wang, Miao-Kun
    Qiu, Song-Liang
    PROCEEDINGS OF THE INDIAN ACADEMY OF SCIENCES-MATHEMATICAL SCIENCES, 2012, 122 (01): : 41 - 51
  • [30] THE OPTIMAL CONVEX COMBINATION BOUNDS OF ARITHMETIC AND HARMONIC MEANS IN TERMS OF POWER MEAN
    Xia, We-Feng
    Janous, Walther
    Chu, Yu-Ming
    JOURNAL OF MATHEMATICAL INEQUALITIES, 2012, 6 (02): : 241 - 248
12345