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Probability Distribution of Hypervolume Improvement in Bi-objective Bayesian Optimization

Machine Learning 2024-05-07 v3 Machine Learning

Abstract

Hypervolume improvement (HVI) is commonly employed in multi-objective Bayesian optimization algorithms to define acquisition functions due to its Pareto-compliant property. Rather than focusing on specific statistical moments of HVI, this work aims to provide the exact expression of HVI's probability distribution for bi-objective problems. Considering a bi-variate Gaussian random variable resulting from Gaussian process (GP) modeling, we derive the probability distribution of its hypervolume improvement via a cell partition-based method. Our exact expression is superior in numerical accuracy and computation efficiency compared to the Monte Carlo approximation of HVI's distribution. Utilizing this distribution, we propose a novel acquisition function - ε\varepsilon-probability of hypervolume improvement (ε\varepsilon-PoHVI). Experimentally, we show that on many widely-applied bi-objective test problems, ε\varepsilon-PoHVI significantly outperforms other related acquisition functions, e.g., ε\varepsilon-PoI, and expected hypervolume improvement, when the GP model exhibits a large the prediction uncertainty.

Cite

@article{arxiv.2205.05505,
  title  = {Probability Distribution of Hypervolume Improvement in Bi-objective Bayesian Optimization},
  author = {Hao Wang and Kaifeng Yang and Michael Affenzeller},
  journal= {arXiv preprint arXiv:2205.05505},
  year   = {2024}
}
R2 v1 2026-06-24T11:14:18.307Z