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Optimization
A Journal of Mathematical Programming and Operations Research
Volume 64, 2015 - Issue 4
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Articles

A modified combined relaxation method for non-linear convex variational inequalities

I.V. KonnovDepartment of System Analysis and Information Technologies, Kazan Federal University, Kazan, Russia.Correspondence[email protected]
Pages 753-760 | Received 19 Oct 2012, Accepted 12 Jun 2013, Published online: 16 Aug 2013

References

  • Baiocchi C, Capelo A. Variational and quasivariational inequalities: applications to free boundary problems. New York: John Wiley and Sons; 1984. p. .
  • Konnov IV. Combined relaxation methods for variational inequalities. Berlin: Springer-Verlag; 2001.
  • Facchinei F, Pang J-S. Finite-dimensional variational inequalities and complementarity problems. Berlin: Springer-Verlag; 2003. p. .
  • Handbook of generalized convexity and generalized monotonicity Hadjisavvas N Komlósi S Schaible S Springer New York 2005
  • Konnov IV. Application of the proximal point method to nonmonotone equilibrium problems. J. Optim. Theory Appl. 2003;119:317–333.
  • Variational inequalities and network equilibrium problems Giannessi F Maugeri A Plenum Press New York 1995
  • Raciti F, Falsaperla P. Improved non iterative algorithm for solving of the traffic equilibrium problem. J. Optim. Theory Appl. 2007;133:401–411.
  • Nonlinear Anal. Theory Methods Appl. Nonlinear extended variational inequalities withoutdifferentiability: applications and solution methods. 2008;69:1–13.
  • Konnov IV. Combined relaxation methods for finding equilibrium points and solving related problems. Russian Math. (Iz. VUZ). 1993;37:44–51.
  • Konnov IV. Combined relaxation methods for generalized monotone variational inequalities. In: Konnov IV, Luc DT, Rubinov AM, editors. Generalized convexity and related topics. Berlin: Springer; 2007. p. 3–31.

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