A new class of general nonlinear random set-valued variational inclusion problems involving A-maximal m-relaxed η-accretive mappings and random fuzzy mappings in Bana
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- 作者:Narin Petrot (1)
Javad Balooee (2) - 关键词:variational inclusions ; A ; maximal m ; relaxed η ; accretive mapping ; random relaxed cocoercive mapping ; resolvent operator technique ; random iterative algorithm ; random fuzzy mapping ; q ; uniformly smooth Banach space
- 刊名:Journal of Inequalities and Applications
- 出版年:2012
- 出版时间:December 2012
- 年:2012
- 卷:2012
- 期:1
- 全文大小:273KB
- 参考文献:1. Agarwal RP, Cho YJ, Huang NJ: Generalized nonlinear variational inclusions involving maximal η -monotone mappings. / Nonlinear Anal Appl 2003, 1,2:59-3. (to Lakshmikantham V on His 80th Birthday. Kluwer Academic Publishers, Dordrecht, The Netherlands) 3.3
2. Agarwal RP, Khan MF, O'Regan D, Salahuddin : On generalized multivalued nonlinear variational-like inclusions with fuzzy mappings. / Adv Nonlinear var Inequal 2005, 8:41-5. 3.3
3. Ahmad R, Ansari QH, Irfan SS: Generalized variational inclusions and generalized resolvent equations in Banach spaces. / Comput Math Appl 2005, 49:1825-835. 3.3 CrossRef
4. Ahmad R, Bazan FF: An iterative algorithm for random generalized nonlinear mixed variational inclusions for random fuzzy mappings. / Appl Math Comput 2005, 167:1400-411. 1 CrossRef
5. Alimohammady M, Balooee J, Cho YJ, Roohi M: A new system of nonlinear fuzzy variational inclusions involving ( A, η )-accretive mappings in uniformly smooth Banach spaces. / J Inequal Appl 2009, 2009:33. (Article ID 806727). doi:10.1155/2010/806727 CrossRef
6. Alimohammady M, Balooee J, Cho YJ, Roohi M: Generalized nonlinear random equations with random fuzzy and relaxed cocoercive mappings in Banach spaces. / Adv Nonlinear Var Inequal 2010, 13:37-8.
7. Alimohammady M, Balooee J, Cho YJ, Roohi M: New perturbed finite step iterative algorithms for a system of extended generalized nonlinear mixed-quasi variational inclusions. / Comput Math Appl 2010, 60:2953-970. CrossRef
8. Balooee J, Cho YJ, Kang MK: The Wiener-Hopf equation technique for solving general nonlinear regularized nonconvex variational inequalities. / Fixed Point Theory Appl 2011, 2011:86. doi:10.1186/1687-812-011-6 CrossRef
9. Balooee J, Cho YJ, Kang MK: Projection methods and a new system of extended general regularized nonconvex set-valued variational inequalities. / J Appl Math 2012, 2012:18. (Article ID 690648) CrossRef
10. Aubin JP: / Mathematical Methods of Game and Economics Theory. North-Holland, Amsterdam; 1979.
11. Bensoussan A, Goursat M, Lions JL: Control impulsinnel et inequations quasivariationalles stationaries. / C R Acad Sci 1973, 276:1279-248. 1
12. Chang SS: / Fixed Point Theory with Applications. Chongqing Publishing House, Chongqing; 1984.
13. Chang SS: Variational Inequality and Complementarity Problem Theory with Applications. In / Shanghai Scientific and Tech. Literature Publishing House, Shanghai; 1991. 1, 3.8, 4.3
14. Chang MS, Chen HY: A fuzzy user-optimal route choice problem using a link-based fuzzy variational inequality formulation. / Fuzzy Sets Syst 2000, 114:339-45. 1 CrossRef
15. Chang SS, Huang NJ: Generalized complementarity problems for fuzzy mappings. / Fuzzy Sets Syst 1993, 55:227-34. 1 CrossRef
16. Chang SS, Huang NJ: Generalized strongly nonlinear quasi-complementarity problems in Hilbert spaces. / J Math Anal Appl 1991, 158:194-02. 1 CrossRef
17. Chang SS, Huang NJ: Generalized multivalued implicit complementarity problems in Hilbert spaces. / Math Japon 1991, 36:1093-100. 1
18. Chang SS, Huang NJ: Generalized random multivalued quasi-complementarity problems. / Indian J Math 1993, 35:305-20. 1, 3.8, 4.3
19. Chang SS, Huang NJ: Random generalized set-valued quasi-complementarity problems. / Acta Math Appl Sinica 1993, 16:396-05. 1
20. Chang SS, Zhu YG: On variational inequalities for fuzzy mappings. / Fuzzy Sets Syst 1989, 32:359-67. 1 CrossRef
21. Chang SS, Zhu YG: On the problems for a class of random variational inequalities and quasi-variational inequalities. / J Math Res Exposition 1989, 9:385-93. 1
22. Cho YJ, Huang NJ, Kang SM: Random generalized set-valued strongly nonlinear implicit quasi-varitional inequalities. / J Inequal Appl 2000, 5:515-31. 1, 3.3, 3.8, 4.3
23. Cho YJ, Lan HY: Generalized nonlinear random ( A, η )-accretive equations with random relaxed cocoercive mappings in Banach spaces. / Comput Math Appl 2008, 55:2173-182. 1, 3.3, 3.8, 4.3 CrossRef
24. Cho YJ, Petrot N: On the system of nonlinear mixed implicit equilibrium problems in Hilbert spaces. / J Inequal Appl 2010, 2010:12. (Article ID 437976) 1, 3.8, 4.3
25. Ceng LC, Ansari QH, Ho JL: Hybrid viscosity-like approximation methods for general monotone variational inequalities. / Taiwanese J Math 2011, 15:1871-896.
26. Ceng LC, Ansari QH, Yao JC: Hybrid proximal-type and hybrid shrinking projection algorithms for equilibrium problems, maximal monotone operators, and relatively nonexpansive mappings. / Numer Funct Anal Optim 2010, 31:763-97. CrossRef
27. Ceng LC, Ansari QH, Yao JC: Hybrid pseudoviscosity approximation schemes for equilibrium problems and fixed point problems of infinitely many nonexpansive mappings. / Nonlinear Anal Hybrid Syst 2010, 4:743-54. CrossRef
28. Ceng LC, Ansari QH, Yao JC: On relaxed viscosity iterative methods for variational inequalities in Banach spaces. / J Comput Appl Math 2009, 230:813-22. CrossRef
29. Ceng LC, Ansari QH, Yao JC: Relaxed extragradient iterative methods for variational inequalities. / Appl Math Comput 2011, 218:1112-123. CrossRef
30. Ding XP: Algorithm of solutions for mixed implicit quasi-variational inequalities with fuzzy mappings. / Comput Math Appl 1999,38(5-):231-49. 1 CrossRef
31. Ding XP, Park JY: A new class of generalized nonlinear implicit quasivariational inclusions with fuzzy mapping. / J Comput Appl Math 2002, 138:243-57. 1 CrossRef
32. Dubois D, Prade H: / Fuzzy Sets Systems, Theory and Applications. Academic Press, London; 1980.
33. Ganguly A, Wadhawa K: On random variational inequalities. / J Math Anal Appl 1997, 206:315-21. 1, 3.8, 4.3 CrossRef
34. Hassouni A, Moudafi A: A perturbed algorithm for variational inclusions. / J Math Anal Appl 1994, 185:706-12. 1, 3.3, 3.8, 4.3 CrossRef
35. Himmelberg CJ: Measurable relations. / Fund Math 1975, 87:53-2. 3.7
36. Huang NJ: A new method for a class of nonlinear variational inequalities with fuzzy mappings. / Appl Math Lett 1997,9(3):129-33. 1 CrossRef
37. Huang NJ: Generalized nonlinear variational inclusions with noncompact valued mappings. / Appl Math Lett 1996, 9:25-9. 1, 3.3, 3.8, 4.3 CrossRef
38. Huang NJ: Nonlinear implicit quasi-variational inclusions involving generalized m -accretive mappings. / Inequal Appl 2004, 2:413-25. 1, 3.8, 4.3
39. Huang NJ: Random generalized nonlinear variational inclusions for random fuzzy mappings. / Fuzzy Sets Syst 1999, 105:437-44. 1, 3.8, 4.3 CrossRef
40. Huang NJ, Cho YJ: Random completely generalized set-valued implicit quasi-variational inequalities. / Positivity 1999, 3:201-13. 1, 3.8, 4.3 CrossRef
41. Huang NJ, Fang YP: Generalized m-accretive mappings in Banach spaces. / J Sichuan Univ 2001, 38:591-92. 1
42. Huang NJ, Fang YP: A new class of general variational inclusions involving maximal η -monotone mappings. / Pub Math Debrecen 2003, 62:83-8. 1, 3.8, 4.3
43. Huang NJ, Lan HY: A couple of nonlinear equations with fuzzy mappings in fuzzy normed spaces. / Fuzzy Sets Syst 2005, 152:209-22. 1 CrossRef
44. Huang NJ, Long X, Cho YJ: Random completely generalized nonlinear variational inclusions with non-compact valued random mappings. / Bull Korean Math Soc 1997, 34:603-15. 1, 3.8, 4.3
45. Jeong JU: Generalized set-valued variational inclusions and resolvent equations in Banach spaces. / Comput Math Appl 2004, 47:1241-247. 3.3 CrossRef
46. Jin MM, Liu QK: Nonlinear quasi-variational inclusions involving generalized m -accretive mappings. / Non Func Anal Appl 2004, 9:413-25. 1, 3.8, 4.3
47. Khan MF, Salahuddin , Verma RU: Generalized random variational-like inequalities with randomly pseudo-monotone multivalued mappings. / PanAmer Math J 2006, 16:33-6. 1
48. Kumam P, Petrot N: Mixed variational-like inequality for fuzzy mappings in reflexive Banach spaces. / J Inequal Appl 2009, 2009:15. (Article ID 209485) 1 CrossRef
49. Lan HY: Approximation solvability of nonlinear random ( A, η )-resolvent operator equations with random relaxed cocoercive operators. / Comput Math Appl 2009, 57:624-32. 1, 3.3, 4.3 CrossRef
50. Lan HY: On multi-valued nonlinear variational inclusion problems with ( A, η )-accretive mappings in Banach spaces. / J Inequal Appl 2006, 2006:12. (Article ID 59836) 3.3
51. Lan HY: Projection iterative approximations for a new class of general random implicit quasi-variational inequalities. / J Inequal Appl 2006, 2006:17. (Article ID 81261) 1
52. Lan HY, Cho YJ, Verma RU: Nonlinear relaxed cocoercive variational inclusions involving ( A, η )-accretive mappings in Banach spaces. / Comput Math Appl 2006, 51:1529-538. 1, 2.9, 2.10, 2.12 CrossRef
53. Lan HY, Cho YJ, Xie W: General nonlinear random equations with random multivalued operator in Banach spaces. / J Inequal Appl 2009, 2009:17. (Article ID 865093) 1, 3.3, 3.8, 4.3 CrossRef
54. Lan HY, Verma RU: Iterative algorithms for nonlinear fuzzy variational inclusion systems with ( A, η )-accretive mappings in Banach spaces. / Adv Nonlinear Var Inequal 2008,11(1):15-0. 1
55. Noor MA: Variational inequalities with fuzzy mappings (I). / Fuzzy Sets Syst 1989, 55:309-14. 1 CrossRef
56. Park JY, Jeong JU: A perturbed algorithm of variational inclusions for fuzzy mappings. / Fuzzy Sets Syst 2000, 115:419-24. 1 CrossRef
57. Park JY, Jeong JU: Iterative algorithm for finding approximate solutions to completely generalized strongly quasivariational inequalities for fuzzy mappings. / Fuzzy Sets Syst 2000, 115:413-18. 1 CrossRef
58. Onjai-Uea N, Kumam P: A generalized nonlinear random equations with random fuzzy mappings in uniformly smooth Banach spaces. / J Inequal Appl 2010, 2010:15. (Article ID 728452) 1, 3.3, 3.8, 4.3 CrossRef
59. Verma RU: A -monotonicity and applications to nonlinear inclusion problems. / J Appl Math Stoch Anal 2004, 17:193-95. 1 CrossRef
60. Verma RU: The over-relaxed A -proximal point algorithm and applications to nonlinear variational inclusions in Banach spaces. / Fixed Point Theory 2009, 10:185-95. 1
61. Xu HK: Inequalities in Banach spaces with applications. / Nonlinear Anal 1991, 16:1127-138. 2 CrossRef
62. Zadeh LA: Fuzzy sets. / Inf Control 1965, 8:338-58. 1 CrossRef
63. Zimmermann HI: / Fuzzy Set Theory and its Applications. Kluwer Academic Publishing Group, Boston, MA; 1988. - 作者单位:Narin Petrot (1)
Javad Balooee (2)
1. Department of Mathematics, Faculty of Science, Naresuan University, Phitsanulok, 65000, Thailand
2. Department of Mathematics, Sari Branch, Islamic Azad University, Sari, Iran - ISSN:1029-242X
文摘
At the present article, we consider a new class of general nonlinear random A-maximal m-relaxed η-accretive equations with random relaxed cocoercive mappings and random fuzzy mappings in q-uniformly smooth Banach spaces. By using the resolvent mapping technique for A-maximal m-relaxed η-accretive mappings due to Lan et al. and Chang's lemma, we construct a new iterative algorithm with mixed errors for finding the approximate solutions of this class of nonlinear random equations. We also verify that the approximate solutions obtained by the our proposed algorithm converge to the exact solution of the general nonlinear random A-maximal m-relaxed η-accretive equations with random relaxed cocoercive mappings and random fuzzy mappings in q-uniformly smooth Banach spaces. Mathematical Subject Classification 2010: Primary, 47B80; Secondary, 47H40, 60H25.