@misc{Kotarski_Wiesław_On,
 author={Kotarski, Wiesław},
 howpublished={online},
 publisher={Zielona Góra: Uniwersytet Zielonogórski},
 language={eng},
 abstract={In the paper, some problems of vector optimization are considered. Vector optimality is understood in the Pareto sense. Using the notion of Ponstein convexity, we formulate a ?scalarization? theorem. Two examples (vector optimization in R2 and an optimal-control problem for a parabolic equation with a vector performance index) are discussed. A Pareto boundary and a Salukwadze optimum are obtained for each of them. Additionally, for some vector optimization problems in R2, a criterion space is found. All calculations are performed with the use of Maple V. In the Appendix, a sketch of the proof of the main theorem on ?scalarization? is given.},
 type={artykuł},
 title={On Pareto and Salukwadze optimization problems},
 keywords={Pareto and Salukwadze optima, Pareto boundary, criterion space, scalarizarion},
}