Bayesian Optimization of Risk Measures
Abstract
We consider Bayesian optimization of objective functions of the form , where is a black-box expensive-to-evaluate function and denotes either the VaR or CVaR risk measure, computed with respect to the randomness induced by the environmental random variable . Such problems arise in decision making under uncertainty, such as in portfolio optimization and robust systems design. We propose a family of novel Bayesian optimization algorithms that exploit the structure of the objective function to substantially improve sampling efficiency. Instead of modeling the objective function directly as is typical in Bayesian optimization, these algorithms model as a Gaussian process, and use the implied posterior on the objective function to decide which points to evaluate. We demonstrate the effectiveness of our approach in a variety of numerical experiments.
Cite
@article{arxiv.2007.05554,
title = {Bayesian Optimization of Risk Measures},
author = {Sait Cakmak and Raul Astudillo and Peter Frazier and Enlu Zhou},
journal= {arXiv preprint arXiv:2007.05554},
year = {2020}
}
Comments
Main paper: 15 pages with 2 figures. Supplement: 14 pages with 3 figures. To appear in NeurIPS 2020