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Optimality of Approximate Quasi-Weakly Efficient Solutions for Vector Equilibrium Problems via Convexificators

Guolin Yu

School of Mathematics and Information Science, North Minzu University, Yinchuan, 750021, Ningxia, P. R. China

E-mail Address: guolin_yu@126.com

Corresponding author.

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Siqi Li

School of Mathematics and Information Science, North Minzu University, Yinchuan, 750021, Ningxia, P. R. China

E-mail Address: 844247124@qq.com

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Xiao Pan

School of Mathematics and Information Science, North Minzu University, Yinchuan, 750021, Ningxia, P. R. China

E-mail Address: 1563474468@qq.com

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, and

Wenyan Han

School of Mathematics and Information Science, North Minzu University, Yinchuan, 750021, Ningxia, P. R. China

E-mail Address: 1965447108@qq.com

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https://doi.org/10.1142/S0217595921500470Cited by:2 (Source: Crossref)

Abstract

This paper is devoted to the investigation of optimality conditions for approximate quasi-weakly efficient solutions to a class of nonsmooth Vector Equilibrium Problem (VEP) via convexificators. First, a necessary optimality condition for approximate quasi-weakly efficient solutions to problem (VEP) is presented by making use of the properties of convexificators. Second, the notion of approximate pseudoconvex function in the form of convexificators is introduced, and its existence is verified by a concrete example. Under the introduced generalized convexity assumption, a sufficient optimality condition for approximate quasi-weakly efficient solutions to problem (VEP) is also established. Finally, a scalar characterization for approximate quasi-weakly efficient solutions to problem (VEP) is obtained by taking advantage of Tammer’s function.

Keywords:

AMSC: 90C46, 90C22, 90C25

References

Clarke, FH (1983). Optimization and Nonsmooth Analysis. New York: John Wiley and Sons. Google Scholar
Chen, GY, XX Huang and XQ Yang (2005). Vector Optimization: Set-Valued and Variational Analysis, Lecture Notes in Economics and Mathematical Systems, 2005. Google Scholar
Capătă, A (2019). Optimality conditions for $𝜖$ -quasi solutions of optimization problems via $𝜖$ -upper convexificators with applications. Optimization Letters, 241(13), 857–873. Crossref, Web of Science, Google Scholar
Das, K and C Nahak (2016). Optimality conditions for approximate quasi efficiency in set-valued equilibrium problems. SeMA Journal, 73(2), 183–199. Crossref, Google Scholar
Dempe, S, N Gadhi and ME Idrissi (2020). Optimality conditions in terms of convexificators for a bilevel multiobjective optimization problem. Optimization, 59(69), 1811–1830. Crossref, Web of Science, Google Scholar
Gong, XH (2010). Scalarization and optimality conditions for vector equilibrium problems. Nonlinear Analysis Theory Methods and Applications, 73(11), 3598–3612. Crossref, Web of Science, Google Scholar
Hejazi, MA and S Nobakhtian (2020). Optimality conditions for multiobjective fractional programming, via convexificators. Journal of Industrial and Management Optimization, 16(2), 623–631. Crossref, Web of Science, Google Scholar
Jahn, J (1986). Mathematical Vector Optimization in Partially Ordered Linear Spaces. Frankfurt: Verlag Peter Lang. Google Scholar
Jeyakumar, V and DT Luc (1999). Nonsmooth calculus, minimality, and monotonicity of convexificators. Journal of Optimization Theory and Applications, 101(3), 599–621. Crossref, Web of Science, Google Scholar
Jayswala, A, K Kummaria and V Singha (2017). Duality for a class of nonsmooth multiobjective programming problems using convexificators. Filomat, 31(2), 489–498. Crossref, Web of Science, Google Scholar
Li, J and NJ Huang (2007). An extension of gap functions for a system of vector equilibrium problems with applications to optimization problems. Journal of Global Optimization, 39(2), 247–260. Crossref, Web of Science, Google Scholar
Luu, VD (2014a). Convexificators and necessary conditions for efficiency. Optimization, 63(3), 321–335. Crossref, Web of Science, Google Scholar
Luu, VD (2014b). Necessary and sufficient conditions for efficiency via convexificators. Journal of Optimization Theory and Applications, 160(2), 510–526. Crossref, Web of Science, Google Scholar
Luu, VD (2015). Optimality condition for local efficient solutions of vector equilibrium problems via convexificators and applications. Journal of Optimization Theory and Applications, 171(2), 1–23. Web of Science, Google Scholar
Luu, VD (2019). Necessary efficiency conditions for vector equilibrium problems with general inequality constraints via convexificators. Bulletin of the Brazilian Mathematical Society, New Series, 50(2), 685–704. Google Scholar
Michel, P and JP Penot (1992). A generalized derivative for calm and stable functions. Differential and Integral Equations, 5(11), 433–454. Google Scholar
Mordukhovich, BS and YH Shao (1995). On nonconvex subdifferential calculus in Banach spaces. Journal of Convex Analysis, 2(1), 211–227. Google Scholar
Pandey, Y and SK Mishra (2018). Optimality conditions and duality for semi-infinite mathematical programming problems with equilibrium constraints, using convexificators. Annals of Operations Research, 269(2), 549–564. Crossref, Web of Science, Google Scholar
Qiu, QS and XM Yang (2013). Scalarization of approximate solution for vector equilibrium problems. Journal of Industrial and Management Optimization, 9(1), 143–151. Crossref, Web of Science, Google Scholar
Suneja, SK and B Kohli (2011). Optimality and duality results for bilevel programming problem using convexifactors. Journal of Optimization Theory and Applications, 150(1), 1–19. Crossref, Web of Science, Google Scholar
Sun, XK, KL Teo and XJ Long (2021). Characterizations of robust-quasi optimal solutions for nonsmooth optimization problems with uncertain data. Optimization, 70(4), 847–870. Crossref, Web of Science, Google Scholar