Convex inequalities without constraint qualification nor closedness condition, and their applications in optimization (Q618891)
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scientific article; zbMATH DE number 5837867
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Convex inequalities without constraint qualification nor closedness condition, and their applications in optimization |
scientific article; zbMATH DE number 5837867 |
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Convex inequalities without constraint qualification nor closedness condition, and their applications in optimization (English)
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17 January 2011
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Firstly, the authors indicate a dual approach for the inequalities between two convex lower semicontinuous extended real-valued functions, having immediate applications when one of them is the sum of two convex functions with a convex composite one and to the subdifferential calculus of such as this function, without any constraint qualification. As consequences, one obtains extensions to nonreflexive settings, Farkas-type lemmas and significant results on DC, convex, semi-definite and linear optimization programs.
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convex inequalities
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subdifferential
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constraint qualification
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Farkas-type lemmas
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DC
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convex programming
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semi-definite optimization
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