Directional regularity and metric regularity

For general constraint systems in Banach spaces, we present the directional stability theorem based on the appropriate generalization of the directional regularity condition, suggested earlier in [A. V. Arutyunov and A. F. Izmailov, Math. Oper. Res., 31 (2006), pp. 526-543]. This theorem contains Robinson's stability theorem but does not reduce to it. Furthermore, we develop the related concept of directional metric regularity which is stable subject to small Lipschitzian perturbations of the constraint mapping, and which is equivalent to directional regularity for sufficiently smooth mappings. Finally, we discuss some applications in sensitivity theory. © 2007 Society for Industrial and Applied Mathematics.

Authors
Arutyunov A.V. 1 , Avakov E.R.2 , Izmailov A.F.3
Number of issue
3
Language
English
Pages
810-833
Status
Published
Volume
18
Year
2007
Organizations
  • 1 Peoples' Friendship University, Miklukho-Maklaya Str. 6, 117198 Moscow, Russian Federation
  • 2 Institute for Control Problems RAS, Profsoyuznaya Str. 65, 117806 Moscow, Russian Federation
  • 3 Faculty of Computational Mathematics and Cybernetics, Department of Operations Research, Moscow State University, Leninskiye Gori, GSP-2, 119992 Moscow, Russian Federation
Keywords
Directional metric regularity; Directional regularity; Feasible arc; Metric regularity; Robinson's constraint qualification; Sensitivity
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