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عنوان
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A New Weak Slater Constraint Qualification for Non-Smooth Multi�Objective Semi-Infinite Programming Problems
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نوع پژوهش
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مقاله چاپشده
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کلیدواژهها
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Semi-infinite programming, Multi-objective optimization, Constraint qualification, Optimality conditions.
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چکیده
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per addresses a non-smooth multi-objective semi�infinite programming problem that involves a feasible set defined by inequality constraints. Our focus is on introducing a new weak Slater constraint qualification and deriving the necessary and sufficient conditions for (weakly, properly) efficient solutions to the problem using (weak and strong) Karush-Kuhn-Tucker types. Additionally, we present two duals of the Mond-Weir type for the problem and provide (weak and strong) duality results for them. All of the results are given in terms of Clarke subdifferential.
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پژوهشگران
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حامد سروش (نفر اول)
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