Improved Algorithm for Regret Ratio Minimization in Multi-Objective Submodular Maximization
DOI:
https://doi.org/10.1609/aaai.v37i10.26472Keywords:
SO: Other Foundations of Search & Optimization, ML: Optimization, ML: Other Foundations of Machine LearningAbstract
Submodular maximization has attracted extensive attention due to its numerous applications in machine learning and artificial intelligence. Many real-world problems require maximizing multiple submodular objective functions at the same time. In such cases, a common approach is to select a representative subset of Pareto optimal solutions with different trade-offs among multiple objectives. To this end, in this paper, we investigate the regret ratio minimization (RRM) problem in multi-objective submodular maximization, which aims to find at most k solutions to best approximate all Pareto optimal solutions w.r.t. any linear combination of objective functions. We propose a novel HS-RRM algorithm by transforming RRM into HittingSet problems based on the notions of ε-kernel and δ-net, where any α-approximation algorithm for single-objective submodular maximization is used as an oracle. We improve upon the previous best-known bound on the maximum regret ratio (MRR) of the output of HS-RRM and show that the new bound is nearly asymptotically optimal for any fixed number d of objective functions. Experiments on real-world and synthetic data confirm that HS-RRM achieves lower MRRs than existing algorithms.
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Published
2023-06-26
How to Cite
Wang, Y., Zheng, J., & Meng, F. (2023). Improved Algorithm for Regret Ratio Minimization in Multi-Objective Submodular Maximization. Proceedings of the AAAI Conference on Artificial Intelligence, 37(10), 12500-12508. https://doi.org/10.1609/aaai.v37i10.26472
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Section
AAAI Technical Track on Search and Optimization
