Approximate optimality conditions
Approximate optimality conditions
We propose in this paper a systematic study which is a variational approach of approximate optimality conditions in terms of Ekeland’s variational principle and some of its applications. Using a generalised differentiation(sub-differentiability) theory for non-smooth functions, new properties are then identified and approximate optimality conditions are established in the cases: convex, locally Lipschitz and finally lower semi-continuous. Publisher's Version
- ISIK UNIVERSITY Turkey
Convex analysis, Variational principal, Sub-differential;QualiŞcation condition;Convex analysis;Normal compacity;Variational principal, Qualification condition, Normal compacity, Sub-differential
Convex analysis, Variational principal, Sub-differential;QualiŞcation condition;Convex analysis;Normal compacity;Variational principal, Qualification condition, Normal compacity, Sub-differential
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