Saved in:
Bibliographic Details
Main Authors: Kikkawa, Nobuaki, Ohno, Hiroshi
Format: Preprint
Published: 2022
Subjects:
Online Access:https://arxiv.org/abs/2212.08225
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866916686704148480
author Kikkawa, Nobuaki
Ohno, Hiroshi
author_facet Kikkawa, Nobuaki
Ohno, Hiroshi
contents Search algorithms for the bandit problems are applicable in materials discovery. However, the objectives of the conventional bandit problem are different from those of materials discovery. The conventional bandit problem aims to maximize the total rewards, whereas materials discovery aims to achieve breakthroughs in material properties. The max K-armed bandit (MKB) problem, which aims to acquire the single best reward, matches with the discovery tasks better than the conventional bandit. Thus, here, we propose a search algorithm for materials discovery based on the MKB problem using a pseudo-value of the upper confidence bound of expected improvement of the best reward. This approach is pseudo-guaranteed to be asymptotic oracles that do not depends on the time horizon. In addition, compared with other MKB algorithms, the proposed algorithm has only one hyperparameter, which is advantageous in materials discovery. We applied the proposed algorithm to synthetic problems and molecular-design demonstrations using a Monte Carlo tree search. According to the results, the proposed algorithm stably outperformed other bandit algorithms in the late stage of the search process when the optimal arm of the MKB could not be determined based on its expectation reward.
format Preprint
id arxiv_https___arxiv_org_abs_2212_08225
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Materials Discovery using Max K-Armed Bandit
Kikkawa, Nobuaki
Ohno, Hiroshi
Machine Learning
Chemical Physics
Search algorithms for the bandit problems are applicable in materials discovery. However, the objectives of the conventional bandit problem are different from those of materials discovery. The conventional bandit problem aims to maximize the total rewards, whereas materials discovery aims to achieve breakthroughs in material properties. The max K-armed bandit (MKB) problem, which aims to acquire the single best reward, matches with the discovery tasks better than the conventional bandit. Thus, here, we propose a search algorithm for materials discovery based on the MKB problem using a pseudo-value of the upper confidence bound of expected improvement of the best reward. This approach is pseudo-guaranteed to be asymptotic oracles that do not depends on the time horizon. In addition, compared with other MKB algorithms, the proposed algorithm has only one hyperparameter, which is advantageous in materials discovery. We applied the proposed algorithm to synthetic problems and molecular-design demonstrations using a Monte Carlo tree search. According to the results, the proposed algorithm stably outperformed other bandit algorithms in the late stage of the search process when the optimal arm of the MKB could not be determined based on its expectation reward.
title Materials Discovery using Max K-Armed Bandit
topic Machine Learning
Chemical Physics
url https://arxiv.org/abs/2212.08225