Scalarizing vector optimization problems
Copyright policy )Scalarizing vector optimization problems
A scalarization of vector optimization problems is proposed, where optimality is defined through convex cones. By varying the parameters of the scalar problem, it is possible to find all vector optima from the scalar ones. Moreover, it is shown that, under mild assumptions, the dependence is differentiable for smooth objective maps defined over reflexive Banach spaces. A sufficiency condition of optimality for a general mathematical programming problem is also given in the Appendix.
- University of Udine Italy
scalarization of vector optimization problems, Sensitivity, stability, parametric optimization, reflexive Banach spaces, sufficiency condition of optimality, convex cones
scalarization of vector optimization problems, Sensitivity, stability, parametric optimization, reflexive Banach spaces, sufficiency condition of optimality, convex cones
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