EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES

Applied Mathematics and Mechanics (English Edition) ›› 2003, Vol. 24 ›› Issue (11): 1324-1333.

EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES

曾六川

Department of Mathematics, Shanghai Normal University, Shanghai 200234, P. R. China

收稿日期:2001-07-19 修回日期:2003-06-19 出版日期:2003-11-18 发布日期:2003-11-18
基金资助:
the Teaching and Research Award Fund for Qustanding Young Teachers in Higher Education Institutions of MOE, PRC;the Special Funds for Major Specialities of Shanghai Education Committee;the Department Fund of Science;Technology in Shanghai Higher Educ

EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES

ZENG Lu-chuan

Department of Mathematics, Shanghai Normal University, Shanghai 200234, P. R. China

Received:2001-07-19 Revised:2003-06-19 Online:2003-11-18 Published:2003-11-18
Supported by:
the Teaching and Research Award Fund for Qustanding Young Teachers in Higher Education Institutions of MOE, PRC;the Special Funds for Major Specialities of Shanghai Education Committee;the Department Fund of Science;Technology in Shanghai Higher Educ

摘要/Abstract

摘要： A new class of general multivalued mixed implicit quasi-variational inequalities in a real Hilbert space was introduced, which includes the known class of generalized mixed implicit quasi-variational inequalities as a special case, introduced and studied by Ding Xie-ping. The auxiliary variational principle technique was applied to solve this class of general multivalued mixed implicit quasi-variational inequalities. Firstly, a new auxiliary variational inequality with a proper convex, lower semicontinuous, binary functional was defined and a suitable functional was chosen so that its unique minimum point is equivalent to the solution of such an auxiliary variational inequality. Secondly, this auxiliary variational inequality was utilized to construct a new iterative algorithm for computing approximate solutions to general multivalued mixed implicit quasi-variational inequalities. Here, the equivalence guarantees that the algorithm can generate a sequence of approximate solutions. Finally, the existence of solutions and convergence of approximate solutions for general multivalued mixed implicit quasi-variational inequalities are proved. Moreover, the new convergerce criteria for the algorithm were provided. Therefore, the results give an affirmative answer to the open question raised by M. A. Noor, and extend and improve the earlier and recent results for various variational inequalities and complementarity problems including the corresponding results for mixed variational inequalities, mixed quasi-variational inequalities and quasi-complementarity problems involving the single-valued and set- valued mappings in the recent literature.

Abstract: A new class of general multivalued mixed implicit quasi-variational inequalities in a real Hilbert space was introduced, which includes the known class of generalized mixed implicit quasi-variational inequalities as a special case, introduced and studied by Ding Xie-ping. The auxiliary variational principle technique was applied to solve this class of general multivalued mixed implicit quasi-variational inequalities. Firstly, a new auxiliary variational inequality with a proper convex, lower semicontinuous, binary functional was defined and a suitable functional was chosen so that its unique minimum point is equivalent to the solution of such an auxiliary variational inequality. Secondly, this auxiliary variational inequality was utilized to construct a new iterative algorithm for computing approximate solutions to general multivalued mixed implicit quasi-variational inequalities. Here, the equivalence guarantees that the algorithm can generate a sequence of approximate solutions. Finally, the existence of solutions and convergence of approximate solutions for general multivalued mixed implicit quasi-variational inequalities are proved. Moreover, the new convergerce criteria for the algorithm were provided. Therefore, the results give an affirmative answer to the open question raised by M. A. Noor, and extend and improve the earlier and recent results for various variational inequalities and complementarity problems including the corresponding results for mixed variational inequalities, mixed quasi-variational inequalities and quasi-complementarity problems involving the single-valued and set- valued mappings in the recent literature.

中图分类号:

O177.91

曾六川. EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES[J]. Applied Mathematics and Mechanics (English Edition), 2003, 24(11): 1324-1333.

ZENG Lu-chuan . EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES[J]. Applied Mathematics and Mechanics (English Edition), 2003, 24(11): 1324-1333.

参考文献

[1] Marker P T, Pang J S. Finite-dimensional variational inequatlity and nonlinear complementarity problem,s:a survey of theory, algorithms and applications[J]. Math Programming,1990,48(2): 161-220.
[2] Noor M A, Noor K I, Rassias T M. Some aspects of variational inequalities [J]. J Comput Appl Math, 1993,47:285-312.
[3] Noor M A. General algorithm for variational inequalities Ⅰ[J]. Math Japonica, 1993,38:47-53.
[4] Noor M A. Some recent advances in variational inequalities-Part Ⅰ:Basic concepts[J]. New Zealand J Math, 1997,26:53-80.
[5] DING Xie-ping. Existence and algorithm of solutions for generalized mixed implicit quasi-variational inequalities[J]. Appl Math Comput, 2000,113:67-80.
[6] LI Hong-mei,DING Xie-ping. Generalized strongly nonlinear quasi-complementarity problems[J]. Applied Mathematics and Mechanics (English Edition), 1994,15(4):307-315.
[7] Cohen G. Auxiliary problem principle extended to variational inequalities[J]. J Optim Theory Ap-pl, 1988,59:325-333.
[8] DING Xie-ping. General algorithm of solutions for nonlinear variational inequalities in Banach spaces[J]. Computer Math Appl, 1997,34:131-137.
[9] Noor M A. Nonconvex functions and variational inequalities[J]. J Optim Theory Appl, 1995,87: 615-630.
[10] Noor M A. Multivalued strongly nonlinear quasivariational inequalities [J]. Chin J Math, 1995,23: 275-286.
[11] Noor M A. On a class of multivalued variational inequalities [J]. J Appl Math Stochastic Anal, 1998,11:79-93.
[12] Noor M A. Auxiliary principle for generalized mixed variational-like inequalities[J]. J Math Anal Appl, 1997,215:75-85.
[13] Chang S S,Huang N J. Generalized strongly nonlinear quasi-complementarity problems in Hilbert spaces[J]. J Math Anal Appl, 1991,158,194-202.
[14] ZENG Lu-chuan. Iterative algorithms for finding approximate solutions for general strongly nonlinear variational inequalities[J]. J Math Anal Appl, 1994,187:352-360.
[15] ZENG Lu-chuan. Completely generalized strongly nonlinear quasi-complementarity problems in Hilbert spaces[J].J Math Anal Appl, 1995,193:706-714.
[16] ZENG Lu-chuan. Iterative algorithm for finding approximate solutions to completely generalized strongly nonlinear quasi-variational inequalities [J].J Math Anal Appl, 1996,201:180-194.
[17] ZENG Lu-chuan. On a general projection algorithm for variational inequalities[J]. J Optim Theory Appl,1998,97(1):229-235.
[18] DING Xie-ping. A new class of generalized strongly nonlinear quasivariational inequalities and quasi-complementarity problems[J]. Indian J Pure Appl Math, 1994,25:1115-1128.
[19] Chang S S,Huang N J. Generalized multivalued implicit complementarity problem in Hilbert space[J]. Math Japonica, 1991,36(6): 1093-1100.
[20] Pascali D, Sburlan S. Nonlinear Mappings of Monotone Type[M]. The Netherlands: Sijthoff &Noordhoof, 1978:24-25.
[21] Nadler S B, Jr. Multi-valued contraction mappings[J]. Pacific J Math, 1969,30:475-487.

EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES

EXISTENCE AND ALGORITHM OF SOLUTIONS FOR GENERAL MULTIVALUED MIXED IMPLICIT QUASI-VARIATIONAL INEQUALITIES

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