Efficient solutions in V-KT-pseudoinvex multiobjective control problems: A characterization (Q732369)
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scientific article; zbMATH DE number 5612820
| Language | Label | Description | Also known as |
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| English | Efficient solutions in V-KT-pseudoinvex multiobjective control problems: A characterization |
scientific article; zbMATH DE number 5612820 |
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Efficient solutions in V-KT-pseudoinvex multiobjective control problems: A characterization (English)
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9 October 2009
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The following multiobjective control problem is considered: \[ \text{Minimize}\quad \int^b_a f(t,x,u)\,dt, \] \[ \text{subject to}\quad x(a)= \alpha,\;x(b)= \beta,\;g(t,x,u)\leq 0,\;h(t,x,u)=\dot x,\quad t\in I. \] For this problem, the authors introduce V-KT-pseudoinvexity and prove that V-KT-pseudoinvexity is a necessary and sufficient condition for a Kuhn-Tucker point to be an efficient solution of the multiobjective control problem. An example is presented.
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continuous optimization
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multiobjective control problem
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pseudoinvexity
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Kuhn-Tucker optimality conditions
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numerical example
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