Generic Optimality Conditions for Semialgebraic Convex Programs

Generic Optimality Conditions for Semialgebraic Convex Programs

We consider linear optimization over a nonempty convex semialgebraic feasible region F . Semidefinite programming is an example. If F is compact, then for almost every linear objective there is a unique optimal solution, lying on a unique "active" manifold, around which F is "partly s...

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Veröffentlicht in:Mathematics of operations research 2011-02, Vol.36 (1), p.55-70
Hauptverfasser: Bolte, Jérôme, Daniilidis, Aris, Lewis, Adrian S.
Format: Artikel
Sprache:eng
Schlagworte:
active sets
Algorithms
Analysis
Convex analysis
convex optimization
Convex programming
generic
identifiable surface
Mathematical constants
Mathematical functions
Mathematical manifolds
Mathematical optimization
Mathematical theorems
Mathematical vectors
Mathematics
Nonlinear programming
Optimal solutions
Optimization and Control
partial smoothness
second-order sufficient conditions
semialgebraic
Sensitivity analysis
Studies
Sufficient conditions
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Beschreibung
Zusammenfassung:We consider linear optimization over a nonempty convex semialgebraic feasible region F . Semidefinite programming is an example. If F is compact, then for almost every linear objective there is a unique optimal solution, lying on a unique "active" manifold, around which F is "partly smooth," and the second-order sufficient conditions hold. Perturbing the objective results in smooth variation of the optimal solution. The active manifold consists, locally, of these perturbed optimal solutions; it is independent of the representation of F and is eventually identified by a variety of iterative algorithms such as proximal and projected gradient schemes. These results extend to unbounded sets F .
ISSN:0364-765X
1526-5471
DOI:10.1287/moor.1110.0481