Article Sidebar
Date Published:
25/04/2018
Online Published:
25/04/2018
Abstract Views: 27
Views PDF: 13
Views PDF: 13
Section
Natural Sciences Issue
How to Cite
Pham, A. L., & Nguyen, T. H. (2018). On the exsitence and approximation of fixed points of monotone mappings satisfying condition (E) in partially ordered Banach spaces. Dong Thap University Journal of Science, 31, 65-73. https://doi.org/10.52714/dthu.31.4.2018.571
On the exsitence and approximation of fixed points of monotone mappings satisfying condition (E) in partially ordered Banach spaces
Main Article Content
Abstract
In this paper, we introduce the notion of a monotone mapping satisfying condition (E) in partially ordered Banach spaces, and establish the exsitence and the approximation of fixed points of such mappings by the Mann iteration process in partially ordered uniformly convex Banach spaces. These results are the generations of the main results in [4, 6, 7]. Also, we provide examples to illustrate the obtained results.
Article Details
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.
Keywords
Monotone mapping satisfying condition (E), Mann iteration, partially ordered Banach spaces
References
[1]. K. Aoyama and F. Kohsaka (2011), “Fixed point theorem for a-nonexpansive mapping in Banach space”, Nonlinear Anal., (74), p. 4387-4391.
[2]. M. Bachar and M. A. Khamsi (2015), “On common approximate fixed points of monotone nonexpansive semigroups in Banach spaces”, Fixed Point Theory Appl., (2015:160), p. 1-12.
[3]. B. Beauzamy (1982), Introduction to Banach spaces and their geometry, North-Holland, Amsterdam.
[4]. B. A. B. Dehaish and M. A. Khamsi (2015), “Mann iteration process for monotone nonexpansive mappings”, Fixed Point Theory Appl., (2015:177), p. 1-8.
[5]. E. L. Dozo (1973), “Multivalued nonexpansive mappings and Opial's condition”, Proc. Amer. Math. Soc., 38 (2), p. 286-292.
[6]. J. Garcia-Falset, E. Llorens-Fuster, and T. Suzuki (2011), “Fixed point theory for a class of generalized nonexpansive mappings”, J. Math. Anal. Appl., 375 (1), p. 185-195.
[7]. Y. Song, P. Kumam, and Y. J. Cho (2016), “Fixed point theorems and iterative approximations for monotone nonexpansive mappings in ordered Banach spaces”, Fixed Point Theory Appl., (2016:73), p. 1-11.
[8]. Y. Song, K. Promluang, P. Kumam, and Y. J. Cho (2016), “Some convergence theorems of the Mann iteration for monotone a-nonexpansive mappings”, Appl. Math. Comput., (287-288), p. 74-82.
[9]. W. Takahashi (2000), Nonlinear functional analysis: Fixed point theory and its applications, Yokohama Publishers Inc., Yokohama.
[10]. H. K. Xu (1991), “Inequality in Banach space with applications”, Nonlinear Anal., (16), p. 1127-1138.
[2]. M. Bachar and M. A. Khamsi (2015), “On common approximate fixed points of monotone nonexpansive semigroups in Banach spaces”, Fixed Point Theory Appl., (2015:160), p. 1-12.
[3]. B. Beauzamy (1982), Introduction to Banach spaces and their geometry, North-Holland, Amsterdam.
[4]. B. A. B. Dehaish and M. A. Khamsi (2015), “Mann iteration process for monotone nonexpansive mappings”, Fixed Point Theory Appl., (2015:177), p. 1-8.
[5]. E. L. Dozo (1973), “Multivalued nonexpansive mappings and Opial's condition”, Proc. Amer. Math. Soc., 38 (2), p. 286-292.
[6]. J. Garcia-Falset, E. Llorens-Fuster, and T. Suzuki (2011), “Fixed point theory for a class of generalized nonexpansive mappings”, J. Math. Anal. Appl., 375 (1), p. 185-195.
[7]. Y. Song, P. Kumam, and Y. J. Cho (2016), “Fixed point theorems and iterative approximations for monotone nonexpansive mappings in ordered Banach spaces”, Fixed Point Theory Appl., (2016:73), p. 1-11.
[8]. Y. Song, K. Promluang, P. Kumam, and Y. J. Cho (2016), “Some convergence theorems of the Mann iteration for monotone a-nonexpansive mappings”, Appl. Math. Comput., (287-288), p. 74-82.
[9]. W. Takahashi (2000), Nonlinear functional analysis: Fixed point theory and its applications, Yokohama Publishers Inc., Yokohama.
[10]. H. K. Xu (1991), “Inequality in Banach space with applications”, Nonlinear Anal., (16), p. 1127-1138.
Most read articles by the same author(s)
- Trung Hieu Nguyen, Buu Son Ky Huong believer's costume from the perspective of sociocultural and natural environment , Dong Thap University Journal of Science: Vol. 11 No. 4 (2022): Social Sciences and Humanities Issue (Vietnamese)
- Bich Nhu Nguyen, Trung Hieu Nguyen, Assessing pedagogy students’ satisfaction from training activities at Soc Trang Community College , Dong Thap University Journal of Science: Vol. 10 No. 4 (2021): Social Sciences and Humanities Issue (Vietnamese)
- Bich Nhu Nguyen, Bich Tram Nguyen, Trung Hieu Nguyen, Assessing students’ satisfaction from online learning experiences at Soc Trang Community College , Dong Thap University Journal of Science: Vol. 11 No. 6 (2022): Social Sciences and Humanities Issue (Vietnamese)
- Trung Hieu Nguyen, Bich Nhu Nguyen, Using classical test theory to analyze multiple – choice questions , Dong Thap University Journal of Science: No. 35 (2018): Part A - Social Sciences and Humanities
- Tan Tien Tran, Trung Hieu Nguyen, Convergence of an iteration to common fixed points of two Bregman totally quasi-asymptotically nonexpansive mappings in reflexive Banach spaces , Dong Thap University Journal of Science: Vol. 11 No. 2 (2022): Natural Sciences Issue (Vietnamese)
- Van Dung Nguyen, Trung Hieu Nguyen, Duc Thinh Vo, Công bố khoa học của Trường Đại học Đồng Tháp giai đoạn 2003-2013 và đề xuất một số định hướng , Dong Thap University Journal of Science: No. 9 (2014): Part A - Social Sciences and Humanities
- Cam Tien Truong, Trung Hieu Nguyen, Convergence of hybrid iteration for equilibrium problems and mappings satisfying condition (ø-Eµ) in uniformly convex and uniformly smooth banach spaces , Dong Thap University Journal of Science: No. 27 (2017): Part B - Natural Sciences
- Thanh Nghia Nguyen, Trung Hieu Nguyen, The fixed point theorem for almost generalized (ψ ,ϕ)- contractive mappings in ordered b -metric spaces , Dong Thap University Journal of Science: No. 14 (2015): Part B - Natural Sciences
- Trung Hieu Nguyen, Thi Chac Le, Common fixed point theorems for generalized weak -contraction mappings in partially ordered 2 -metric spaces , Dong Thap University Journal of Science: No. 22 (2016): Part B - Natural Sciences
- Trung Hieu Nguyen, Fixed point theorems for contractions of rational type in ordered rectangular metric spaces , Dong Thap University Journal of Science: No. 12 (2015): Part B - Natural Sciences