MPCC: on necessary conditions for the strong stability of C-stationary points
DOI10.1080/02331934.2019.1584800zbMath1462.90134OpenAlexW2923000459WikidataQ128170923 ScholiaQ128170923MaRDI QIDQ4634167
Daniel Hernández Escobar, Jan-Joachim Rückmann
Publication date: 7 May 2019
Published in: Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02331934.2019.1584800
strong stabilitynecessary conditionmathematical programs with complementarity constraintsC-stationary pointMangasarian-Fromovitz-type constraint qualification
Nonlinear programming (90C30) Sensitivity, stability, parametric optimization (90C31) Complementarity and equilibrium problems and variational inequalities (finite dimensions) (aspects of mathematical programming) (90C33)
Related Items (4)
Cites Work
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- Topological aspects of nonsmooth optimization.
- On inertia and Schur complement in optimization
- Nonlinear optimization in finite dimensions. Morse theory, Chebyshev approximation, transversality, flows, parametric aspects
- Strong stability of stationary solutions and Karush-Kuhn-Tucker points in nonlinear optimization
- On existence and uniqueness of stationary points in semi-infinite optimization
- Characterization of strong stability for C-stationary points in MPCC
- Mathematical Programs with Complementarity Constraints: Stationarity, Optimality, and Sensitivity
- Strong stability implies Mangasarian–Fromovitz Constraint Qualification
- On Stability of the Feasible Set of a Mathematical Problem with Complementarity Problems
- Differential Topology
- MPCC: strongly stable C-stationary points when the number of active constraints is n + 1
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