References
- Levinson N. Linear programming in complex space. J. Math. Anal. Appl. 1966;14:44–62.
- Abrams RA, Ben-Israel A. Complex mathematical programming. In: Avi-Itzhak B, editor. Developments in operations research. New York (NY): Gordon and Breach; 1971. p. 3–20.
- Duca DI. On vectorial programming problem in complex space. Studia Univ. Babes-Bolyai, Math. 1979;24:51–56.
- Duca DI. The vectorial programming problem in complex space. In: Proceeding of the Third Colloquim on Operations Research; 1978 Oct; Cluj-Napoca: Babes-Bolyai University of Cluj-Napoca; 1979. p. 82–89.
- Duca DI. Efficiency criteria in vectorial programming in complex space. Itinerant Seminar on Functional Equations. Approximation and Convexity. Babes-Bolyai University of Cluj-Napoca. 1983;83:51–54.
- De Oliveira VA, Rojas-Medar MA. Proper efficiency in vector infinite programming problems. Optim. Lett. 2009;3:319–328.
- Hu X, Fang Z, Xiong Y. Strict efficiency in vector optimization with nearly convexlike set-valued maps. Abst. Appl. Anal. 2013;2013. Hindawi Publishing Corporation; 9p. ID 570918.
- Li SH, Wang Q, Xu S, et al. Sharp efficiency for vector equilibrium problems on Banach spaces. Abst. Appl. Anal. 2013;2013: Hindawi Publishing Corporation; 6p. ID 128178.
- Postolica V. Efficiency and extensions in infinite dimensional ordered vector spaces. Theore. Math. Appl. 2012;2:35–79.
- Duca DI. Multicriteria optimization in complex space. Cluj-Napoca: Casa Cartii de Stiinta; 2005.
- Elbrolosy ME. Semi-E-convexity in complex programming. Jokull J. 2014;64:148–158.
- Youness EA, Elbrolosy ME. Extension to necessary optimality conditions in complex programming. J. Appl. Math. Comput. 2004;154:229–237.
- Youness EA, Elbrolosy ME. Extension to sufficient optimality conditions in complex programming. J. Math. Stat. 2005;1:40–48.
- Duca DI. On some types of optimization problems in complex space. L’Analyse Numérique Et la Théorie de L’approximation. 1981;10:11–16. ISRN Math. Anal. 2012, Article ID 376832 (2012).
- Ferrero O. On nonlinear programming in complex spaces. J. Math. Anal. Appl. 1992;164:399–416.
- Swaragi Y, Nakayama H, Tanino T. Theory of multiobjective optimization. New York (NY): Academic Press; 1985.