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An Efficient Descent Method for Locally Lipschitz Multiobjective Optimization Problems

Bennet Gebken, Sebastian Peitz

2021Journal of Optimization Theory and Applications22 citationsDOIOpen Access PDF

Abstract

Abstract We present an efficient descent method for unconstrained, locally Lipschitz multiobjective optimization problems. The method is realized by combining a theoretical result regarding the computation of descent directions for nonsmooth multiobjective optimization problems with a practical method to approximate the subdifferentials of the objective functions. We show convergence to points which satisfy a necessary condition for Pareto optimality. Using a set of test problems, we compare our method with the multiobjective proximal bundle method by Mäkelä. The results indicate that our method is competitive while being easier to implement. Although the number of objective function evaluations is larger, the overall number of subgradient evaluations is smaller. Our method can be combined with a subdivision algorithm to compute entire Pareto sets of nonsmooth problems. Finally, we demonstrate how our method can be used for solving sparse optimization problems, which are present in many real-life applications.

Topics & Concepts

Subgradient methodMathematicsMathematical optimizationLipschitz continuityTheory of computationDescent directionMulti-objective optimizationConvergence (economics)Descent (aeronautics)Pareto principleComputationOptimization problemSet (abstract data type)Vector optimizationFeasible regionFunction (biology)Convex optimizationGradient descentPareto optimalBenchmark (surveying)Penalty methodLine searchSolution setEmbeddingConvex functionStochastic gradient descentMethod of steepest descentApplied mathematicsAlgorithmMultiobjective programmingAdvanced Multi-Objective Optimization AlgorithmsOptimization and Variational AnalysisAdvanced Optimization Algorithms Research
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