Sequential- and Parallel- Constrained Max-value Entropy Search via Information Lower Bound
Takeno, Shion, Tamura, Tomoyuki, Shitara, Kazuki, Karasuyama, Masayuki
–arXiv.org Artificial Intelligence
Max-value entropy search (MES) is one of the state-of-the-art approaches in Bayesian optimization (BO). In this paper, we propose a novel variant of MES for constrained problems, called Constrained MES via Information lower BOund (CMES-IBO), that is based on a Monte Carlo (MC) estimator of a lower bound of a mutual information (MI). Unlike existing studies, our MI is defined so that uncertainty with respect to feasibility can be incorporated. We derive a lower bound of the MI that guarantees non-negativity, while a constrained counterpart of conventional MES can be negative. We further provide theoretical analysis that assures the low-variability of our estimator which has never been investigated for any existing information-theoretic BO. Moreover, using the conditional MI, we extend CMES-IBO to the parallel setting while maintaining the desirable properties. We demonstrate the effectiveness of CMES-IBO by several benchmark functions and real-world problems.
arXiv.org Artificial Intelligence
Feb-2-2022
- Country:
- North America > Canada
- Europe > United Kingdom
- England > Cambridgeshire > Cambridge (0.04)
- Asia > Japan
- Kyūshū & Okinawa > Kyūshū
- Fukuoka Prefecture > Fukuoka (0.04)
- Honshū > Kansai
- Osaka Prefecture > Osaka (0.04)
- Kyūshū & Okinawa > Kyūshū
- Genre:
- Research Report (1.00)
- Technology: