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Main Authors: Auger, Anne, Brockhoff, Dimo, Opravš, Luka, Tušar, Tea
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.09131
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author Auger, Anne
Brockhoff, Dimo
Opravš, Luka
Tušar, Tea
author_facet Auger, Anne
Brockhoff, Dimo
Opravš, Luka
Tušar, Tea
contents Benchmark problems play a central role in assessing the performance of numerical optimization algorithms. However, many existing constrained multiobjective optimization benchmark problems rely on overly restricted constructions or lack formal analysis of their optimal solution sets, limiting their relevance for systematic algorithm evaluation. In this work, we introduce a class of analytically tractable constrained multiobjective optimization problems whose Pareto sets can be formally characterized. The construction is based on convex-quadratic functions with positive definite Hessians, combined through multipeak formulations in which each objective is defined as the minimum over several convex-quadratic components. This approach preserves analytical structure while enabling multimodality (non-convexity), ill-conditioning and non-separability. The constraints are built as sublevel sets of multipeak functions giving rise to problems with potentially disconnected feasible regions. Building on these results, we propose COBI, a scalable generator of constrained bi-objective test problems designed for benchmarking derivative-free optimization algorithms. We provide a reference Python implementation that enables straightforward integration of COBI instances into benchmarking workflows.
format Preprint
id arxiv_https___arxiv_org_abs_2604_09131
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Pareto Set Characterization in Constrained Multiobjective Optimization and the COBI Problem Generator *
Auger, Anne
Brockhoff, Dimo
Opravš, Luka
Tušar, Tea
Optimization and Control
Benchmark problems play a central role in assessing the performance of numerical optimization algorithms. However, many existing constrained multiobjective optimization benchmark problems rely on overly restricted constructions or lack formal analysis of their optimal solution sets, limiting their relevance for systematic algorithm evaluation. In this work, we introduce a class of analytically tractable constrained multiobjective optimization problems whose Pareto sets can be formally characterized. The construction is based on convex-quadratic functions with positive definite Hessians, combined through multipeak formulations in which each objective is defined as the minimum over several convex-quadratic components. This approach preserves analytical structure while enabling multimodality (non-convexity), ill-conditioning and non-separability. The constraints are built as sublevel sets of multipeak functions giving rise to problems with potentially disconnected feasible regions. Building on these results, we propose COBI, a scalable generator of constrained bi-objective test problems designed for benchmarking derivative-free optimization algorithms. We provide a reference Python implementation that enables straightforward integration of COBI instances into benchmarking workflows.
title Pareto Set Characterization in Constrained Multiobjective Optimization and the COBI Problem Generator *
topic Optimization and Control
url https://arxiv.org/abs/2604.09131