References
- Arrow KJ, Barankin EW, Blackwell D. Admissible points of convex sets. In: Kuhn HW, Tucker AW, editors. Contribution to the theory of games. Princeton (NJ): Princeton University Press; 1953.
- Borwein JM. Proper efficient points for maximization with respect to cones. SIAM J. Control Optim. 1977;15:57–63.
- Borwein JM. On the existence of pareto efficient points. Math. Oper. Res. 1980;8:64–73.
- Hartley R. On cone efficiency, cone conexity, and cone compactness. SIAM J. Appl. Math. 1978;34:211–222.
- Bitran GR, Magnanti TL. The structure of admissible points with respect to cone dominance. J. Optim. Theory Appl. 1979;29:573–614.
- Henig MI. Proper efficiency with respect to cones. J. Optim. Theory Appl. 1982;36:387–407.
- Radner R. A note on maximal points of convex sets in l∞. In: Le Cam LM, Neyman J, editors. Proceedings of the Fifth Berkeley Symposium on Mathematical Statistics and Probability. Berkeley (CA): University of California Press; 1967.
- Majumdar M. Some approximation theorems on efficiency prices for infinite programs. J. Econ. Theory. 1970;2:399–410.
- Majumdar M. Some general theorems on efficiency prices with an infinite-dimensional commodity space. J. Econ. Theory. 1972;5:1–13.
- Salz W. Eine topologische eigenschaft der effizienten punkte konvexer mengen. Oper. Res. Verfahren. 1976;XXIII:197–202.
- Borwein JM. The geometry of Pareto efficiency over cones. Math. Operationsforschung Statistik. Ser. Optim. 1980;11:235–248.
- Jahn J. A generalizationof a theorem of Arrow, Barankin, and Blackwell. SIAM J. Control Optim. 1988;26:999–1005.
- Zheng XY. Generalizations of a theorem of Arrow, Barankin, and Blackwell in topological vector spaces. J. Optim. Theory Appl. 1998;96:221–233.
- Woo LW, Goodrich RK. Maximal points of convex sets in locally convex topological vector spaces: generalization of the Arrow-Barankin-Blackwell theorem. J. Optim. Theory Appl. 2003;116:647–658.
- Ng KF, Zheng XY. On the density of positive proper efficient points in a normed space. J. Optim. Theory Appl. 2003;119:105–122.
- Ferro F. A new ABB theorem in Banach spaces. Optimization. 1999;46:353–362.
- Bednarczuk EM, Song W. Some more density results for proper efficiency. J. Math. Anal. Appl. 1999;231:345–354.
- Fu WT. On the density of proper efficient points. Proc. Am. Math. Soc. 1996;124:1213–1217.
- Gopfert A, Tammer C, Zalinescu C. A new ABB theorem in normed vector spaces. Optimization. 2004;53:369–376.
- Makarov EK, Rachkovski NN. Density theorem for generalized Henigs proper efficiency. J. Optim. Theory Appl. 1996;91:419–437.
- Borwein JM, Zhuang D. Super efficiency in vector optimization. Trans. Am. Math. Soc. 1993;338:105–122.
- Zheng XY. Proper efficiency in locally convex topological vector spaces. J. Optim. Theory Appl. 1997;94:469–486.
- Zheng XY. The domination property for efficiency in locally convex topological vector spaces. J. Math. Anal. Appl. 1997;213:455–467.
- Zhuang D. Density results for proper efficiency. SIAM J. Control Optim. 1994;32:51–58.
- Gallagher RJ, Saleh OA. Two generalizations of a theorem of Arrow, Barankin, and Blackwell. SIAM J. Control Optim. 1993;31:247–256.
- Kasimbeyli R. A nonlinear cone separation theorem and scalarization in nonconvex vector optimization. SIAM J. Optim. 2010;20:1591–1619.
- Benson HP. An improved definition of proper efficiency for vector maximization with respect to cones. J. Math. Anal. Appl. 1979;71:232–241.
- Gasimov RN. Characterization of the Benson proper efficiency and scalarization in nonconvex vector optimization. Koksalan M, Zionts S, editors. Multiple criteria decision making in the New Millennium. Vol. 507, Lecture Notes in Economic and Mathematical Systems. 2001. pp. 189–198.
- Kasimbeyli R. A conic scalarization method in multi-objective optimization. J. Global Optim. 2013;56:279–297.
- Kasimbeyli N. Existence and characterization theorems in nonconvex vector optimization. J. Global Optim. 2015;62:155–165.
- Kasimbeyli R. Radial epiderivatives and set-valued optimization. Optimization. 2009;58:521–534.
- Kasimbeyli R, Mammadov M. On weak subdifferentials, directional derivatives and radial epiderivatives for nonconvex functions. SIAM J. Optim. 2009;20:841–855.
- Kasimbeyli R, Mammadov M. Optimality conditions in nonconvex optimization via weak subdifferentials. Nonlinear Anal. Theory Methods Appl. 2011;74:2534–2547.
- Eichfelder E, Kasimbeyli R. Properly optimal elements in vector optimization with variable ordering structures. J. Global Optim. 2014;60:689–712.
- Gopfert A, Riahi A, Tammer C, et al. Variational methods in partially ordered spaces. New York (NY): Springer-Verlag; 2003.