SHARP BOUNDS FOR SANDOR-YANG MEANS IN TERMS OF ONE-PARAMETER FAMILY OF BIVARIATE MEANS

被引：0

作者：

Yang, Yue-Ying ^{[1
]}

Qian, Wei-Mao ^{[2
]}

Xu, Hui-Zuo ^{[3
]}

机构：

[1] Huzhou Vocat & Tech Coll, Sch Mech & Elect Engn, Huzhou 313000, Peoples R China

[2] Huzhou Broadcast & TV Univ, Sch Continuing Educ, Huzhou 31300, Peoples R China

[3] Wenzhou Broadcast & TV Univ, Sch Econ & Management, Wenzhou 325000, Peoples R China

来源：

JOURNAL OF MATHEMATICAL INEQUALITIES | 2019年 / 13卷 / 04期

关键词：

Sandor-Yang mean; one-parameter mean; harmonic mean; geometric mean; quadratic mean; contra-harmonic mean; SINGULAR INTEGRAL OPERATOR; NICHOLSONS BLOWFLIES MODEL; TRANSFORMATION INEQUALITIES; NEURAL-NETWORKS; LIMIT-CYCLES; COMMUTATOR; EXISTENCE; EQUATION; SYSTEMS; NUMBER;

D O I：

10.7153/jmi-2019-13-84

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

In the article, we present the best possible parameters alpha(1), alpha(2), alpha(3), alpha(4), beta(1), beta(2), beta(3) and beta(4) on the interval (0, 1) such that the double inequalities G(alpha 1)(x,y) < R-GQ(x,y) < G(beta 1)(x,y), Q(alpha 2)(x,y) < R-QG(x,y) < Q(beta 2)(x,y), H-alpha 3(x,y) < R-GQ(x,y) < H-beta 3(x,y), C-alpha 4(x,y) < R-QG(x,y) < C-beta 4(x,y) hold for all x,y > 0 with x not equal y, where R-GQ(x,y) and R-QG(x,y) arc the Sandor-Yang means, H-p(x,y), G(p) (x,y), Q(p)(x,y) and C-p(x,y) are the one-parameter means.

引用

页码：1181 / 1196

页数：16

共 50 条

[31] SHARP BOUNDS FOR NEUMAN-SANDOR MEAN IN TERMS OF THE CONVEX COMBINATION OF QUADRATIC AND FIRST SEIFFERT MEANS
Chu, Yuming
Zhao, Tiehong
Song, Yingqing
ACTA MATHEMATICA SCIENTIA, 2014, 34 (03) : 797 - 806
[32] Sharp approximations for the complete elliptic integrals of the second kind by one-parameter means
Yang, Zhen-Hang
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2018, 467 (01) : 446 - 461
[33] SHARP BOUNDS FOR NEUMAN MEANS IN TERMS OF GEOMETRIC, ARITHMETIC AND QUADRATIC MEANS
Guo, Zhi-Jun
Zhang, Yan
Chu, Yu-Ming
Song, Ying-Qing
JOURNAL OF MATHEMATICAL INEQUALITIES, 2016, 10 (02): : 301 - 312
[34] OPTIMAL ONE-PARAMETER MEAN BOUNDS FOR THE CONVEX COMBINATION OF ARITHMETIC AND LOGARITHMIC MEANS
He, Zai-Yin
Wang, Miao-Kun
Chu, Yu-Ming
JOURNAL OF MATHEMATICAL INEQUALITIES, 2015, 9 (03): : 699 - 707
[35] Optimal one-parameter mean bounds for the convex combination of arithmetic and geometric means
Xia, Weifeng
Hou, Shouwei
Wang, Gendi
Chu, Yuming
JOURNAL OF APPLIED ANALYSIS, 2012, 18 (02) : 197 - 207
[36] Sharp bounds for Neuman means in terms of two-parameter contraharmonic and arithmetic mean
Qian, Wei-Mao
He, Zai-Yin
Zhang, Hong-Wei
Chu, Yu-Ming
JOURNAL OF INEQUALITIES AND APPLICATIONS, 2019, 2019 (1)
[37] 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
[38] Sharp bounds for Neuman means in terms of two-parameter contraharmonic and arithmetic mean
Wei-Mao Qian
Zai-Yin He
Hong-Wei Zhang
Yu-Ming Chu
Journal of Inequalities and Applications, 2019
[39] Sharp inequalities for Toader mean in terms of other bivariate means
Jiang, Wei-Dong
HACETTEPE JOURNAL OF MATHEMATICS AND STATISTICS, 2023, 52 (04): : 841 - 849
[40] Sharp Power Mean Bounds for the One-Parameter Harmonic Mean
Chu, Yu-Ming
Wu, Li-Min
Song, Ying-Qing
JOURNAL OF FUNCTION SPACES, 2015, 2015

← 1 2 3 4 5 →