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Abadie's Constraint Qualification, Hoffman's Error Bounds, and Hausdorff Strong Unicity
Abstract
AbstractThe main goal of this paper is to show the connection between optimization and best approximation when studying vector-valued functions defined on a finite set. For example, Hausdorff strong unicity for best approximation is shown to be equivalent to Abadie's constraint qualification for the associated convex quadratic feasibility problemSimilar works
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Last time updated on 05/05/2017
This paper was published in Elsevier - Publisher Connector .
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