References
- Fan K . Extensions of two fixed point theorems of F.E. Browder. Math Z. 1969;112:234–240.
- Mastroeni G . Gap Functions for Equilibrium Problems. J Global Optim. 2004;27:411–426.
- Konnov IV , Schaible S . Duality for equilibrium problems under generalized monotonicity. J Optim Theory Appl. 2002;104:395–408.
- Martínez-Legaz JE , Sosa W . Duality for equilibrium problems. J Global Optim. 2006;35:311–319.
- Bianchi M , Pini R . A note on equilibrium problems for properly quasimonotone bifunctions. J Global Optim. 2001;20:67–76.
- Li G , Tang CM , Wei ZX . Error bound results for generalized D-gap functions of nonsmooth variational inequality problems. J Comput Appl Math. 2010;233:2795–2806.
- Tan LL . Regularized gap functions for nonsmooth variational inequality problems. J Math Anal Appl. 2007;334:1022–1038.
- Ng KF , Tan LL . Error bounds of regularized gap functions for nonsmooth variational inequality problems. Math Program. 2007;110:405–429.
- Bensousson A , Lions JL . Nouvelle formulation des problèmes de control impulsionnel et applications. C R Acad Sci. 1973;29:1189–1192.
- Bensoussan A , Lions JL . Contrôe Impulsionnel et Inéuations Quasi-Variationnelles. Paris: Dunod; 1982.
- Bigi G , Castellani M , Kassay G . A dual view of equilibrium problems. J Math Anal Appl. 2008;342:17–26.
- Lalitha CS . A note on duality of generalized equilibrium problem. Optim Lett. 2010;4:57–66.
- Ding XP . Existence of solutions for quasiequilibrium problems in noncompact topological spaces. Comput Math Appl. 2000;39:13–21.
- Strodiot JJ , Nguyen TTV , Nguyen VH . A new class of hybrid extragradient algorithms for solving quasi-equilibrium problems. J Global Optim. 2013;56:373–397.
- Castellani G , Giannessi F . Decomposition of mathematical programs by means of theorems of alternative for linear and nonlinear systems. In: Proceedings of Ninth Internatational Mathematical Programming Symposium, Budapest; 1979. p. 423–439. (Survey of mathematical programming; vol. 2).
- Giannessi F . Theorems of the alternative and optimality conditions. J Optim Theory Appl. 1984;42:331–365.
- Giannessi F . On the theory of Lagrangian duality. Optim Lett. 2007;1:9–20.
- Giannessi F , Mastroeni G . Separation of sets and Wolfe duality. J Global Optim. 2008;42:401–412.
- Mastroeni G . Some applications of the image space analysis to the duality theory for constrained extremum problems. J. Global Optim. 2010;46:603–614.
- Zhu SK , Li SJ . Unified duality theory for constrained extremum problems. Part I: image space analysis, J Optim Theory Appl. 2014;161:738–762.
- Zhu SK , Li SJ . Unified duality theory for constrained extremum problems. Part II: special duality schemes, J Optim Theory Appl. 2014;161:763–782.
- Hiriart-Urruty JB . Tangent cone, generalized gradients and mathematical programming in Banach spaces. Math Oper Res. 1979;4:79–97.
- Zaffaroni A . Degrees of efficiency and degrees of minimality. SIAM J Control Optim. 2003;42:1071–1086.
- Gupta R , Mehra A . Gap functions and error bounds for quasi-variational inequalities. J Global Optim. 2012;53:737–748.
- Fukushima M . A class of gap functions for quasi-variational inequality problems. J Ind Manage Optim. 2007;3:165–71.
- Xu YD . Nonlinear separation functions, optimality conditions and error bounds for Ky Fan quasi-inequalities. Optim Lett. 2016;10:527–542.
- Schirotzek W . Nonsmooth analysis. Berlin: Springer; 2007.
- Jahn J . Introduction to the theory of nonlinear optimization. Berlin: Springer; 1996.
- Limber MA , Goodrich RK . Quasi interiors, Lagrange multipliers, and Lp spectral estimation with lattice bounds. J Optim Theory Appl. 1993;78:143–161.
- Borwein JM , Lewis AS . Partially finite convex programming, part I: quasi-relative interiors and duality theory. Math Program. 1992;57:15–48.
- Guu SM , Li J . Vector quasi-equilibrium problems: separation, saddle points and error bounds for the solution set. J Global Optim. 2014;58:751–767.