Bulletin of Experimental Biology and Medicine.
New York Consultants BureauSpringer / Автономная некоммерческая организация Издательство Российской академии медицинских наук.
Vol. 142.
2006.
P. 470-473
Directional stability theorem and directional metric regularity
We develop a new regularity concept, unifying metric regularity, Robinson's constraint qualification, and directional regularity. We present the directional stability theorem and the related concept of directional metric regularity. On one hand, our directional stability theorem immediately implies Robinson's stability theorem [Arutyunov, A. V. 2005. Covering of nonlinear maps on cone in neighborhood of abnormal point. Math. Notes 77 447-460.] as a particular case, while on the other hand, our theorem easily implies various stability results under the directional regularity condition, widely used in sensitivity analysis. Some applications of this kind are also presented. © 2006 INFORMS.
Authors
Arutyunov A.V.
1
,
Izmailov A.F.2
Number of issue
3
Language
English
Pages
526-543
Status
Published
Link
Volume
31
Year
2006
Organizations
- 1 Peoples Friendship University, Miklukho-Maklaya Str. 6, 117198 Moscow, Russian Federation
- 2 Faculty of Computational Mathematics and Cybernetics, Department of Operations Research, Moscow State University, Leninskiye Gori, 119992 Moscow, Russian Federation
Keywords
Directional metric regularity; Directional regularity; Feasible arc; Metric regularity; Robinson's constraint qualification; Sensitivity
Date of creation
19.10.2018
Date of change
19.10.2018
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Other records
Russian Journal of General Chemistry.
Vol. 76.
2006.
P. 1431-1440