We present a new algorithm, truncated variance reduction (TruVaR), that
treats Bayesian optimization (BO) and level-set estimation (LSE) with Gaussian
processes in a unified fashion. The algorithm greedily shrinks a sum of
truncated variances within a set of potential maximizers (BO) or unclassified
points (LSE), which is updated based on confidence bounds. TruVaR is effective
in several important settings that are typically non-trivial to incorporate
into myopic algorithms, including pointwise costs and heteroscedastic noise. We
provide a general theoretical guarantee for TruVaR covering these aspects, and
use it to recover and strengthen existing results on BO and LSE. Moreover, we
provide a new result for a setting where one can select from a number of noise
levels having associated costs. We demonstrate the effectiveness of the
algorithm on both synthetic and real-world data sets.Comment: Accepted to NIPS 201