Numerical procedures in multiobjective optimization with variable ordering structures

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DOI10.1007/s10957-013-0267-yzbMath1316.90042OpenAlexW2165986841MaRDI QIDQ467448

Gabriele Eichfelder

Publication date: 3 November 2014

Published in: Journal of Optimization Theory and Applications (Search for Journal in Brave)

Full work available at URL: https://www.db-thueringen.de/servlets/MCRFileNodeServlet/dbt_derivate_00025541/IfM_Preprint_M_12_05.pdf

zbMATH Keywords

multiobjective optimization variable domination structure variable ordering structure

Mathematics Subject Classification ID

Multi-objective and goal programming (90C29)

Related Items (14)

Continuity of a scalarization in vector optimization with variable ordering structures and application to convergence of minimal solutions ⋮ A first bibliography on set and vector optimization problems with respect to variable domination structures ⋮ Lagrange multiplier rules for weak approximate Pareto solutions to constrained vector optimization problems with variable ordering structures ⋮ Vector optimization with domination structures: variational principles and applications ⋮ A variable and a fixed ordering of intervals and their application in optimization with interval-valued functions ⋮ Twenty years of continuous multiobjective optimization in the twenty-first century ⋮ Approximate properly solutions of constrained vector optimization with variable coradiant sets ⋮ Properly optimal elements in vector optimization with variable ordering structures ⋮ Concepts for approximate solutions of vector optimization problems with variable order structures ⋮ Coradiant-valued maps and approximate solutions in variable ordering structures ⋮ Set approach for set optimization with variable ordering structures. II: Scalarization approaches ⋮ Characterization of properly optimal elements with variable ordering structures ⋮ Two Set Scalarizations Based on the Oriented Distance with Variable Ordering Structures: Properties and Application to Set Optimization ⋮ Methods for Multiobjective Bilevel Optimization

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