Paper Info
Title
Metric Subregularity and Constraint Qualifications for Convex Generalized Equations in Banach Spaces
Abstract
Several notions of constraint qualifications are generalized from the setting of convex inequality systems to that of convex generalized equations. This is done and investigated in terms of the coderivatives and the normal cones, and thereby we provide some characterizations for convex generalized equations to have the metric subregularity. As applications, we establish formulas of the modulus of calmness and provide several characterizations of the calmness. Extending the classical concept of extreme boundary, we introduce a notion of recession cores of closed convex sets. Using this concept, we establish global metric subregularity (i.e., error bound) results for generalized equations.
Year
DOI
Venue
2007
10.1137/050648079
SIAM Journal on Optimization
Keywords
Field
DocType
metric subregularity,constraint qualification,convex generalized equations,closed convex set,generalized equation,banach spaces,classical concept,constraint qualifications,global metric subregularity,convex generalized equation,normal cone,convex inequality system,extreme boundary,convex set,banach space
Mathematical optimization,Convex metric space,Banach space,Regular polygon,Calmness,Convex analysis,Mathematics,Convex cone
Journal
Volume
Issue
ISSN
18
2
1052-6234
Citations 
PageRank 
References 
23
1.16
9
Authors
2
Name
Order
Citations
PageRank
Xi Yin Zheng123624.17
Kung Fu Ng231127.85