Optimal Bounds for Neuman Mean Using Arithmetic and Centroidal Means
Joint Authors
Qian, Wei-Mao
Chu, Yu-Ming
Song, Ying-Qing
Source
Issue
Vol. 2016, Issue 2016 (31 Dec. 2016), pp.1-7, 7 p.
Publisher
Hindawi Publishing Corporation
Publication Date
2016-02-02
Country of Publication
Egypt
No. of Pages
7
Main Subjects
Abstract EN
We present the best possible parameters α1,α2,β1,β2∈R and α3,β3∈(1/2,1) such that the double inequalities α1A(a,b)+(1-α1)C(a,b)
Here, N(a,b), A(a,b), Q(a,b), and C(a,b) are, respectively, the Neuman, arithmetic, quadratic, and centroidal means of a and b, and NQA(a,b)=N[Q(a,b),A(a,b)].
American Psychological Association (APA)
Song, Ying-Qing& Qian, Wei-Mao& Chu, Yu-Ming. 2016. Optimal Bounds for Neuman Mean Using Arithmetic and Centroidal Means. Journal of Function Spaces،Vol. 2016, no. 2016, pp.1-7.
https://search.emarefa.net/detail/BIM-1108615
Modern Language Association (MLA)
Song, Ying-Qing…[et al.]. Optimal Bounds for Neuman Mean Using Arithmetic and Centroidal Means. Journal of Function Spaces No. 2016 (2016), pp.1-7.
https://search.emarefa.net/detail/BIM-1108615
American Medical Association (AMA)
Song, Ying-Qing& Qian, Wei-Mao& Chu, Yu-Ming. Optimal Bounds for Neuman Mean Using Arithmetic and Centroidal Means. Journal of Function Spaces. 2016. Vol. 2016, no. 2016, pp.1-7.
https://search.emarefa.net/detail/BIM-1108615
Data Type
Journal Articles
Language
English
Notes
Includes bibliographical references
Record ID
BIM-1108615