https://orcid.org/0000-0002-6634-3482
References
- Eichfelder G. Variable ordering structures in vector optimization. Berlin: Springer-Verlag; 2014 (Series in vector optimization).
- Bao TQ, Mordukhovich BS. Necessary nondomination conditions in set and vector optimization with variable ordering structures. J Optim Theory Appl. 2014;162(2):350–370.
- Bello JY, Bouza G. A steepest descent-like method for variable order vector optimization problems. J Optim Theory Appl. 2014;162:371–391.
- Chen GY, Huang XX, Yang XQ. Vector optimization. Set-valued and variational analysis. Berlin: Springer; 2005 (Lecture notes in econom. and math. systems; vol. 541).
- Chen GY, Yang SQ. Characterizations of variable domination structures via nonlinear scalarization. J Optim Theory Appl. 2002;112(1):97–110.
- Chen GY, Yang XQ, Yu H. A nonlinear scalarization function and generalized quasi-vector equilibrium problems. J Global Optim. 2005;32(4):451–466.
- Eichfelder G. Optimal elements in vector optimization with a variable ordering structure. J Optim Theory Appl. 2011;151(2):217–240.
- Eichfelder G. Numerical procedures in multiobjective optimization with variable ordering structures. J Optim Theory Appl. 2014;162(2):489–514.
- Eichfelder G, Gerlach T. Characterization of proper optimal elements with variable ordering structures. Optimization. 2016;65:571–588.
- Eichfelder G, Ha TXD. Optimality conditions for vector optimization problems with variable ordering structures. Optimization. 2013;62(4):597–627.
- Eichfelder G, Kasimbeyli R. Properly optimal elements in vector optimization with variable ordering structures. J Global Optim. 2014;60(4):689–712.
- Engau A. Variable preference modeling with ideal-symmetric convex cones. J Global Optim. 2008;42(2):295–311.
- Luc DT, Soubeyran A. Variable preference relations: existence of maximal elements. J Math Econ. 2013;49(4):251–262.
- Sayadi-bander A, Kasimbeyli R, Pourkarimi L. A coradiant based scalarization to characterize approximate solutions of vector optimization problems with variable ordering structures. Oper Res Lett. 2017;45(1):93–97.
- Soleimani B. Characterization of approximate solutions of vector optimization problems with a variable order structure. J Optim Theory Appl. 2014;162(2):605–632.
- Jahn J. Vector optimization. Theory, applications, and extensions. Berlin: Springer-Verlag; 2004 [2nd ed.; 2011].
- Luc DT. Theory of vector optimization. Berlin: Springer Verlag; 1989 (Lecture notes in econom. and math. systems; vol. 319).
- Yu PL. Cone convexity, cone extreme points, and nondominated solutions in decision problems with multiobjectives. J Optim Theory Appl. 1974;14(3):319–376.
- Bergstresser K, Charnes A, Yu PL. Generalization of domination structures and nondominated solutions in multicriteria decision making. J Optim Theory Appl. 1976;18(1):3–13.
- Mastroeni G. On the image space analysis for vector quasi-equilibrium problems with a variable ordering relation. J Global Optim. 2012;53(2):203–214.
- Gerth C, Weidner P. Nonconvex separation theorems and some applications in vector optimization. J Optim Theory Appl. 1990;67(2):297–320.
- Hiriart-Urruty JB. Tangent cones, generalized gradients and mathematical programming in Banach spaces. Math Oper Res. 1979;4(1):79–97.
- Zaffaroni A. Degrees of efficiency and degrees of minimality. SIAM J Control Optim. 2003;42(3):1071–1086.
- Ansari QH, Köbis E, Sharma PK. Characterizations of set relations with respect to variable domination structures via oriented distance function. Optimization. 2018;67(9):1389–1407.
- Jiménez B, Novo V, Vílchez A. Two set scalarizations based on the oriented distance with variable ordering structures: properties and application to set optimization. Numer Funct Anal Optim. 2021;42(12):1367–1392.
- Göpfert A, Riahi H, Tammer C, et al. Variational methods in partially ordered spaces. New York: Springer; 2003 (CMS books in mathematics).
- Luc DT, Penot JP. Convergence of asymptotic directions. Trans Am Math Soc. 2001;353(10):4095–4121.
- Bednarczuk EM. A note on lower semicontinuity of minimal points. Nonlinear Anal. 2002;50(3):285–297.
- Lalitha CS, Chatterjee P. Stability and scalarization in vector optimization using improvement sets. J Optim Theory Appl. 2015;166(3):825–843.
- Wang Y, Li XB, Liou YC. Set convergence of non-convex vector optimization problem with variable ordering structure. Optimization. 2020;69(2):329–344.
- Li XB, Lin Z, Peng ZY. Convergence for vector optimization problems with variable ordering structure. Optimization. 2016;65(8):1615–1627.
- Jiménez B, Novo V, Vílchez A. A set scalarization function based on the oriented distance and relations with other set scalarizations. Optimization. 2018;67(12):2091–2116.
- Bao TQ, Huerga L, Jiménez B, et al. Necessary conditions for nondominated solutions in vector optimization. J Optim Theory Appl. 2020;186(3):826–842.
- Zhang CL, Zhou LW, Huang NJ. Stability of minimal solution mappings for parametric set optimization problems with pre-order relations. Pacific J Optim. 2019;15:491–504.
- Radström H. An embedding theorem for spaces of convex sets. Proc Am Math Soc. 1952;3(1):165–169.
- Han Y. Some characterizations of a nonlinear scalarizing function via oriented distance function. Optimization; 2021, online. doi:10.1080/02331934.2021.1969392