Skip to main content
SpringerLink
Log in

On vector variational inequalities

  • Contributed Papers
  • Published:
Journal of Optimization Theory and Applications Aims and scope Submit manuscript

Abstract

In this paper, we introduce a general form of a vector variational inequality and prove the existence of its solutions with and without convexity assumptions.

This is a preview of subscription content, log in via an institution to check access.

Access this article

Log in via an institution

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.

Institutional subscriptions

Similar content being viewed by others

References

  1. Giannessi, F.,Theorems of the Alternative, Quadratic Programs, and Complementary Problems, Variational Inequalities and Complementarity Problems, Edited by R. W. Cottle, F. Giannessi, and J. L. Lions, John Wiley and Sons, New York, New York, pp. 151–186, 1980.

    Google Scholar 

  2. Chen, Y., andCheng, G. M.,Vector Variational Inequalities and Vector Optimization, Lecture Notes in Economics and Mathematical Systems, Springer Verlag, Berlin, Germany, Vol. 285, pp. 408–416, 1987.

    Google Scholar 

  3. Chen, G. Y., andYang, X. Q.,Vector Complementarity Problem and Its Equivalence with a Weak Minimal Element in Ordered Space, Journal of Mathematical Analysis and Applications, Vol. 153, pp. 136–158, 1990.

    Google Scholar 

  4. Chen, G. Y.,Existence of Solutions for a Vector Variational Inequality: An Extension of the Hartmann-Stampacchia Theorem, Journal of Optimization Theory and Applications, Vol. 74, pp. 445–456, 1992.

    Google Scholar 

  5. Isac, G.:A Special Variational Inequality and the Implicit Complementarity Problem, Journal of the Faculty of Sciences of the University of Tokyo, Vol. 37, pp. 109–127, 1990.

    Google Scholar 

  6. Noor, M. A.,General Variational Inequality, Applied Mathematical Letters, Vol. 1, pp. 119–122, 1988.

    Google Scholar 

  7. Hartman, P., andStampacchia, G.,On Some Nonlinear Elliptic Differential Functional Equations, Acta Mathematica, Vol. 115, pp. 271–310, 1966.

    Google Scholar 

  8. Fan, K.,A Generalization of Tychonoff's Fixed-Point Theorem, Mathematische Annalen, Vol. 142, pp. 305–310, 1961.

    Google Scholar 

  9. Fan, K.,A Minimax Inequality and Applications, Inequalities III, Edited by O. Shisha, Academic Press, New York, New York, pp. 103–113, 1972.

    Google Scholar 

  10. Bardaro, C., andCeppitelli, R.,Some Further Generalizations of the Knaster-Kuratowski-Mazurkiewicz Theorem and Minimax Inequalities, Journal of Mathematical Analysis and Applications, Vol. 132, pp. 484–490, 1988.

    Google Scholar 

  11. Jameson, G.,Ordered Linear Spaces, Springer Verlag, Heidelberg, Germany, 1970.

    Google Scholar 

Download references

Author information

Authors and Affiliations

  1. Department of Mathematics, Aligarh Muslim University, Aligarh, India

    A. H. Siddiqi (Professor) & Q. H. Ansari (Lecturer)

  2. Department of Mathematics and Statistics, Kashmir University, Srinagar, J&K, India

    A. Khaliq (Lecturer)

Authors
  1. A. H. Siddiqi
    View author publications

    You can also search for this author in PubMed Google Scholar

  2. Q. H. Ansari
    View author publications

    You can also search for this author in PubMed Google Scholar

  3. A. Khaliq
    View author publications

    You can also search for this author in PubMed Google Scholar

Additional information

Communicatedby F. Giannessi

Rights and permissions

Reprints and permissions

About this article

Cite this article

Siddiqi, A.H., Ansari, Q.H. & Khaliq, A. On vector variational inequalities. J Optim Theory Appl 84, 171–180 (1995). https://doi.org/10.1007/BF02191741

Download citation

  • Issue Date:

  • DOI: https://doi.org/10.1007/BF02191741

Key Words

Search

Navigation