Abstract
The purpose of this paper is to study the extended well-posedness in the sense of Bednarczuk for set-valued vector optimization. This notion of well-posedness can be interpreted as some sort of well-posedness under perturbation in terms of Hausdorff set-convergence. To investigate the extended B-well-posedness, we generalize property (H) due to Miglierina and Molho to the set-valued and perturbed case. Under a convexity assumption, we show that the extended B-well-posedness is closely related to property (H).
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References
Zolezzi, T.: Well-posedness criteria in optimization with application to the calculus of variations. Nonlinear Anal. 25, 437–453 (1995)
Dontchev, A.L., Zolezzi, T.: Well-Posed Optimization Problems. Lecture Notes in Mathematics, vol. 1548. Springer, Berlin (1993)
Zolezzi, T.: Extended well-posedness of optimization problems. J. Optim. Theory. Appl. 91, 257–266 (1996)
Zolezzi, T.: Well-Posedness and optimization under perturbations. Optimization with data perturbations. Ann. Oper. Res. 101, 351–361 (2001)
Zolezzi, T.: On well-posedness and conditioning in optimization. Z. Angew. Math. Mech. 84, 435–443 (2004)
Bednarczuk, E.M.: Well posedness of vector optimization problem. In: Jahn, J., Krabs, W. (eds.) Recent Advances and Historical Development of Vector Optimization Problems. Lecture Notes in Economics and Mathematical Systems, vol. 294, pp. 51–61. Springer, Berlin (1987)
Lucchetti, R.: Well posedness, towards vector optimization. In: Jahn, J., Krabs, W. (eds.) Recent Advances and Historical Development of Vector Optimization Problems. Lecture Notes in Economics and Mathematical Systems, vol. 294, pp. 194–207. Springer, Berlin (1987)
Dentcheva, D., Helbig, S.: On variational principles, level sets, well-posedness, and ε-solutions in vector optimization. J. Optim. Theory. Appl. 89, 325–349 (1996)
Huang, X.X.: Pointwise well-posedness of perturbed vector optimization problems in a vector-valued variational principle. J. Optim. Theory. Appl. 108, 671–684 (2001)
Loridan, P.: Well-posedness in vector optimization. In: Lucchetti, R., Revalski, J. (eds.) Recent Developments in Variational Well-Posedness Problems. Mathematics and Its Applications, vol. 331, pp. 171–192. Kluwer Academic, Dordrecht (1995)
Bednarczuk, E.M.: An approach to well-posedness in vector optimization: consequences to stability and parametric optimization. Control Cybern. 23, 107–122 (1994)
Huang, X.X.: Extended well-posedness properties of vector optimization problems. J. Optim. Theory. Appl. 106, 165–182 (2000)
Huang, X.X.: Extended and strongly extended well-posedness of set-valued optimization problems. Math. Method. Oper. Res. 53, 101–116 (2001)
Miglierina, E., Molho, E.: Well-posedness and convexity in vector optimization. Math. Method. Oper. Res. 58, 375–385 (2003)
Klein, E., Thompson, A.C.: Theory of Correspondences. Wiley, New York (1984)
Aubin, J.P., Frankowska, H.: Set-valued Analysis. Systems and Control: Foundations and Applications, vol. 2. Birkhäser, Basel (1990)
Nikodem, K.: Continuity of K-convex set-valued functions. Bull. Pol. Acad. Sci. Math. 34, 393–400 (1986)
Bianchi, M., Hadjisavvas, N., Schaible, S.: Vector equilibrium problems with generalized monotone bifunctions. J. Optim. Theory. Appl. 92, 527–542 (1997)
Luc, D.T.: Theory of Vector Optimization. Lecture Notes in Economics and Mathematical Systems, vol. 319. Springer, Berlin (1989)
Tanaka, T.: Generalized semicontinuity and existence theorems for cone saddle points. Appl. Math. Optim. 36, 313–322 (1997)
Bednarczuk, E.M.: Some stability results for vector optimization problems in partially ordered topological vector sapces. In: Lakshmikantham, V., de Gruyter, W. (eds.) Proceedings of the 1st World Congress of Nonlinear Analysis, pp. 2371–2382. Berlin, Germany (1996)
Bednarczuk, E.M.: Upper Hölder continuity of minimal points. J. Convex Anal. 9, 327–335 (2002)
Bednarczuk, E.M.: Continuity of Minimal Points with Applications to Parametric Multiple Objective Optimization. Eur. J. Oper. Res. 157, 59–67 (2004)
Göpfert, A., Tammer, C., Riahi, H., Zǎlinescu, C.: Variational Methods in Partially Ordered Spaces. Springer, New York (2003)
Miglierina, E., Molho, E., Rocca, M.: Well-posedness and scalarization in vector optimization. J. Optim. Theory Appl. 126, 391–409 (2005)
Nadler, S.B. Jr.: Multivalued contraction mappings. Pac. J. Math. 30, 475–488 (1969)
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Communicated by F. Giannessi.
This work was supported by the Scientific Research Foundation of CUIT (CRF200704), the National Natural Science Foundation of China (10671135) and Specialized Research Fund for the Doctoral Program of Higher Education (20060610005).
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Fang, Y.P., Hu, R. & Huang, N.J. Extended B-Well-Posedness and Property (H) for Set-Valued Vector Optimization with Convexity. J Optim Theory Appl 135, 445–458 (2007). https://doi.org/10.1007/s10957-007-9272-3
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DOI: https://doi.org/10.1007/s10957-007-9272-3