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Box-constrained vector optimization: a steepest descent method without “a priori” scalarization

Author

Listed:
  • Miglierina Enrico

    (Department of Economics, University of Insubria, Italy)

  • Molho Elena

    (Department of Management Sciences, University of Pavia)

  • Recchioni Maria Cristina

    (Dipartimento di Scienze Sociali “D. Serrani”, Università Politecnica delle Marche, Ancona)

Abstract

In this paper a notion of descent direction for a vector function defined on a box is introduced. This concept is based on an appropriate convex combination of the “projected” gradients of the components of the objective functions. The proposed approach does not involve an “apriori” scalarization since the coefficients of the convex combination of the projected gradients are the solutions of a suitable minimization problem depending on the feasible point considered. Subsequently, the descent directions are considered in the formulation of a first order optimality condition for Pareto optimality in a box-constrained multiobjective optimization problem. Moreover, a computational method is proposed to solve box-constrained multiobjective optimization problems. This method determines the critical points of the box constrained multiobjective optimization problem following the trajectories defined through the descent directions mentioned above. The convergence of the method to the critical points is proved. The numerical experience shows that the computational method efficiently determines the whole local Pareto front.

Suggested Citation

  • Miglierina Enrico & Molho Elena & Recchioni Maria Cristina, 2006. "Box-constrained vector optimization: a steepest descent method without “a priori” scalarization," Economics and Quantitative Methods qf0603, Department of Economics, University of Insubria.
    • Handle: RePEc:ins:quaeco:qf0603
    as

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    File URL: https://www.eco.uninsubria.it/RePEc/pdf/QF2006_3.pdf
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    References listed on IDEAS

    as
    1. Jörg Fliege & Benar Fux Svaiter, 2000. "Steepest descent methods for multicriteria optimization," Mathematical Methods of Operations Research, Springer;Gesellschaft für Operations Research (GOR);Nederlands Genootschap voor Besliskunde (NGB), vol. 51(3), pages 479-494, August.
    Full references (including those not matched with items on IDEAS)

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    Keywords

    Multi-objective optimization problems; path following methods; dynamical systems; minimal selection.;
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