Decentralized High-Dimensional Bayesian Optimization with Factor Graphs
Abstract
This paper presents a novel decentralized high-dimensional Bayesian optimization (DEC-HBO) algorithm that, in contrast to existing HBO algorithms, can exploit the interdependent effects of various input components on the output of the unknown objective function f for boosting the BO performance and still preserve scalability in the number of input dimensions without requiring prior knowledge or the existence of a low (effective) dimension of the input space. To realize this, we propose a sparse yet rich factor graph representation of f to be exploited for designing an acquisition function that can be similarly represented by a sparse factor graph and hence be efficiently optimized in a decentralized manner using distributed message passing. Despite richly characterizing the interdependent effects of the input components on the output of f with a factor graph, DEC-HBO can still guarantee no-regret performance asymptotically. Empirical evaluation on synthetic and real-world experiments (e.g., sparse Gaussian process model with 1811 hyperparameters) shows that DEC-HBO outperforms the state-of-the-art HBO algorithms.
Keywords
Cite
@article{arxiv.1711.07033,
title = {Decentralized High-Dimensional Bayesian Optimization with Factor Graphs},
author = {Trong Nghia Hoang and Quang Minh Hoang and Ruofei Ouyang and Kian Hsiang Low},
journal= {arXiv preprint arXiv:1711.07033},
year = {2018}
}
Comments
32nd AAAI Conference on Artificial Intelligence (AAAI 2018), Extended version with proofs, 13 pages