Christiane Tammer scite author profile

In this paper, we discuss the connection between concepts of robustness for multi-objective optimization problems and set order relations. We extend some of the existing concepts to general spaces and cones using set relations. Furthermore, we derive new concepts of robustness for multi-objective optimization problems. We point out that robust multi-objective optimization can be interpreted as an application of set-valued optimization. Furthermore, we develop new algorithms for solving uncertain multi-objective optimization problems. These algorithms can be used in order to solve a special class of set-valued optimization problems.

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Lipschitz properties of the scalarization function and applications

Tammer¹,

Zălinescu²

2010

Optimization

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The scalarization functions were used in vector optimization for a long period. Similar functions were introduced and used in economics under the name of shortage function or in mathematical finance under the name of (convex or coherent) measures of risk. The main aim of this article is to study Lipschitz continuity properties of such functions and to give some applications for deriving necessary optimality conditions for vector optimization problems using the Mordukhovich subdifferential.

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Christiane Tammer

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Set-valued Optimization

Fuzzy necessary optimality conditions for vector optimization problems

The relationship between multi-objective robustness concepts and set-valued optimization

Lipschitz properties of the scalarization function and applications

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