Access the full text.
Sign up today, get DeepDyve free for 14 days.
Yaping Fang, N. Huang, J. Kim (2003)
A System of Multi-Valued Generalized Order Complementarity Problems in Ordered Metric SpacesZeitschrift Fur Analysis Und Ihre Anwendungen, 22
G Isac, WT Obuchowska (1998)
Functions without EFE and complementarity problemsJ. Optim. Theory Appl., 99
G. Isac (2006)
Leray–Schauder Type Alternatives, Complementarity Problems and Variational Inequalities
G. Isac, M. Kostreva (1991)
Kneser's theorem and the multivalued generalized order complementarity problemApplied Mathematics Letters, 4
Yitian Zhao, Jiye Han, H. Qi (1999)
Exceptional Families and Existence Theorems for Variational Inequality ProblemsJournal of Optimization Theory and Applications, 101
G. Isac (1996)
The fold complementarity problemTopol. Methods Nonlinear Anal., 8
D. Goeleven (1996)
A uniqueness theorem for the generalized-order linear complementary problem associated with M-matricesLinear Algebra and its Applications, 235
J. Borwein, M. Dempster (1989)
The Linear Order Complementarity ProblemMath. Oper. Res., 14
S. Németh (2010)
Exceptional family of elements for general order complementarity problemsAppl. Math. Comput., 217
L. Tan, Liren Huang (2007)
Exceptional families of elements for a variational inequality problemAppl. Math. Lett., 20
P. Harker, J. Pang (1990)
Finite-dimensional variational inequality and nonlinear complementarity problems: A survey of theory, algorithms and applicationsMathematical Programming, 48
RW Cottle, JS Pang, RE Stone (1992)
The linear complementarity problems
Ke-qing Wu, N. Huang (2008)
Solvability of f-complementarity problems with a new exceptional family of elementsAppl. Math. Lett., 21
G. Isac (2008)
Nonlinear analysis and complementarity theoryJournal of Global Optimization, 40
G. Isac, A. Carbone (1999)
Exceptional Families of Elements for Continuous Functions: Some Applications to Complementarity TheoryJournal of Global Optimization, 15
YB Zhao, JY Han (1999)
Exeptional family of elements for a variational inequality problem and its applicationsJ. Global Optim., 14
Shuzi Zhou, M. Bai (2004)
A new exceptional family of elements for a variational inequality problem on Hilbert spaceAppl. Math. Lett., 17
G. Isac, M. Kostreva (1991)
The generalized order complementarity problemJournal of Optimization Theory and Applications, 71
Gong-Nong Li (2005)
Analysis for a homotopy path of complementarity problems based on mu-exceptional familyAppl. Math. Comput., 169
N. Huang, Cheng-Jia Gao, Xiao-ping Huang (2003)
Exceptional Family of Elements and Feasibility for Nonlinear Complementarity ProblemsJournal of Global Optimization, 25
N. Huang, Yaping Fang (2003)
Fixed Point Theorems and a New System of Multivalued Generalized Order Complementarity Problems*Positivity, 7
YB Zhao (1997)
Exceptional family and finite-dimensional variational inequality over polyhedral setsAppl. Math. Comput., 87
J Leray, J Schauder (1934)
Topologie ét equations fonctionnellesAnn. Sci. École Normale Sup., 51
G. Isac, D. Goeleven (1993)
The Implicit General Order Complementarity Problem, models and iterative methodsAnnals of Operations Research, 44
S. Billups, K. Murty (2000)
Complementarity problemsJournal of Computational and Applied Mathematics, 124
M. Bianchi, N. Hadjisavvas, S. Schaible (2006)
Exceptional Families of Elements for Variational Inequalities in Banach SpacesJournal of Optimization Theory and Applications, 129
KQ Wu, NJ Huang (2008)
Solvability of $$f$$ -complementarity problems with a new exceptional family of elementsAppl. Math. Lett., 21
G. Isac (2009)
Topological Methods in Complementarity Theory
J. Leray, J. Schauder (1934)
Topologie et équations fonctionnellesAnnales Scientifiques De L Ecole Normale Superieure, 51
G. Isac, V. Bulavski, V. Kalashnikov (1997)
Exceptional Families, Topological Degree and Complementarity ProblemsJournal of Global Optimization, 10
GN Li (2005)
Analysis for a homotopy path of complementarity problems based on $$\mu $$ -exceptional familyAppl. Math. Comput., 169
G Isac, M Kostreva (1996)
The implicit general order complementarity problem and Leontief’s input–output modelAppl. Math., 24
D Goeleven (1996)
A uniqueness theorem for the generalized-order linear complementary problem associated with $$M$$ -matricesLinear Algebra Appl., 235
G. Isac, Y. Zhao (2000)
Exceptional Family of Elements and the Solvability of Variational Inequalities for Unbounded Sets in Infinite Dimensional Hilbert SpacesJournal of Mathematical Analysis and Applications, 246
Jinlu Li, J. Whitaker (2005)
Exceptional family of elements and solvability of variational inequalities for mappings defined only on closed convex cones in Banach spacesJournal of Mathematical Analysis and Applications, 310
F. Facchinei, J. Pang (2003)
Finite-Dimensional Variational Inequalities and Complementarity Problems
The purpose of this paper is to study the existence of solutions to a system of generalized order complementarity problems via an order exceptional family of elements. We prove that under certain conditions, either the system of generalized order complementarity problems has a solution or it has an order exceptional family of elements.
Positivity – Springer Journals
Published: Mar 19, 2013
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.