Advanced search
Publication Cover
Optimization
A Journal of Mathematical Programming and Operations Research
Volume 72, 2023 - Issue 3
Submit an article Journal homepage
132
Views
2
CrossRef citations to date
0
Altmetric
Articles

Solvability of a regular polynomial vector optimization problem without convexity

Dan-Yang Liua Department of Mathematics, Sichuan University, Chengdu, Sichuan, People's Republic of ChinaView further author information
,
Rong Hub Department of Applied Mathematics, Chengdu University of Information Technology, Chengdu, Sichuan, People's Republic of ChinaView further author information
&
Ya-Ping Fanga Department of Mathematics, Sichuan University, Chengdu, Sichuan, People's Republic of ChinaCorrespondence[email protected]
[email protected]
View further author information
Pages 821-841 | Received 21 Mar 2021, Accepted 22 Sep 2021, Published online: 15 Oct 2021

References

  • Hà HV, Pham TS. Genericity in polynomial optimization. Singapore: World Scientific Publishing; 2017.
  • Benedetti R, Risler JJ. Real algebraic and semi-algebraic sets. Paris: Hermann; 1990.
  • Lee JH, Sisarat N, Jiao LG. Multi-objective convex polynomial optimization and semidefinite programming relaxations, J. Global Optim. 2021;80(1):117–138.
  • Ansari QH, Lalitha CS, Mehta M. Generalized convexity, nonsmooth variational inequalities, and nonsmooth optimization. New York (NY): Chapman and Hall/CRC; 2013.
  • Hieu VT. On the solution existence and stability of polynomial optimization problems; 2020. Available from: https://hal.archives-ouvertes.fr/hal-03002431
  • Hieu VT, Wei YM, Yao JC. Notes on the optimization problems corresponding to polynomial complementarity problems. J Optim Theory Appl. 2020;184(2):687–695.
  • Kim DS, Pham TS, Tuyen NV. On the existence of Pareto solutions for polynomial vector optimization problems. Math Program. 2019;177(1–2):321–341.
  • Hieu VT. Weakly homogeneous optimization problems. Preprint 2020. arXiv:2001.09436v2.
  • López R. Stability results for polyhedral complementarity problems. Comput Math Appl. 2009;58(7):1475–1486.
  • Gowda MS, Sossa D. Weakly homogeneous variational inequalities and solvability of nonlinear equations over cones. Math Program Ser A. 2019;177(1–2):149–171.
  • Ma XX, Zheng MM, Huang ZH. A note on the nonemptiness and compactness of solution sets of weakly homogeneous variational inequalities. SIAM J Optim. 2020;30(1):132–148.
  • Flores-Bazán F, Flores-Bazán F. Vector equilibrium problems under asymptotic analysis. J Global Optim. 2003;26(2):141–166.
  • Flores-Bazán F, López R. Asymptotic analysis, existence and sensitivity results for a class of multivalued complementarity problems. ESAIM Control Optim Calc Var. 2006;12(2):271–293.
  • Flores-Bazán F. Asymptotically bounded multifunctions and the MCP beyond copositivity. J Convex Anal. 2010;17:253–276.
  • Rockafellar RT, Wets RJB. Variational analysis. Berlin: Springer; 2009.
  • Auslender A, Teboulle M. Asymptotic cones and functions in optimization and variational inequalities. New York (NY): Springer; 2003.
  • Bao TQ, Mordukhovich BS. Variational principles for set-valued mappings with applications to multiobjective optimization. Control Cybern. 2007;36:531–562.
  • Bao TQ, Mordukhovich BS. Relative Pareto minimizers for multiobjective problems: existence and optimality conditions. Math Program. 2010;122(2):301–347.
  • Giannessi F, Mastroeni G, Pellegrini L. On the theory of vector optimization and variational inequalities. Image space analysis and separation. In: Giannessi F, editor. Vector variational inequalities and vector equilibria. Boston (MA): Springer; 2000. (Nonconvex optimization and its applications; 38).
  • Huang NJ, Fang YP. The upper semicontinuity of the solution maps in vector implicit quasicomplementarity problems of type R0. Appl Math Lett. 2003;16(7):1151–1156.
  • Fang YP, Huang NJ. On the upper semi-continuity of the solution map to the vertical implicit homogeneous complementarity problem of type R0. Positivity. 2006;10(1):95–104.
  • Oettli W, Yen ND. Quasicomplementarity problems of type R0. J Optim Theory Appl. 1996;89(2):467–474.
  • Yang XQ. Vector complementarity and minimal element problems. J Optim Theory Appl. 1993;77(3):483–495.
  • Chen GY, Yang XQ. The vector complementary problem and its equivalence with weak minimal elements in ordered spaces. J Math Anal Appl. 1990;153(1):136–158.
  • Lee GM, Kim DS, Lee BS, et al. Vector variational inequality as a tool for studying vector optimization problems. In: Giannessi F, editor. Vector variational inequalities and vector equilibria. Boston (MA): Springer; 2000. (Nonconvex optimization and its Applications; 38).

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.