On Average-Case Error Bounds for Kernel-Based Bayesian Quadrature
Cai, Xu, Lam, Chi Thanh, Scarlett, Jonathan
–arXiv.org Artificial Intelligence
In this paper, we study error bounds for {\em Bayesian quadrature} (BQ), with an emphasis on noisy settings, randomized algorithms, and average-case performance measures. We seek to approximate the integral of functions in a {\em Reproducing Kernel Hilbert Space} (RKHS), particularly focusing on the Mat\'ern-$\nu$ and squared exponential (SE) kernels, with samples from the function potentially being corrupted by Gaussian noise. We provide a two-step meta-algorithm that serves as a general tool for relating the average-case quadrature error with the $L^2$-function approximation error. When specialized to the Mat\'ern kernel, we recover an existing near-optimal error rate while avoiding the existing method of repeatedly sampling points. When specialized to other settings, we obtain new average-case results for settings including the SE kernel with noise and the Mat\'ern kernel with misspecification. Finally, we present algorithm-independent lower bounds that have greater generality and/or give distinct proofs compared to existing ones.
arXiv.org Artificial Intelligence
Feb-10-2023
- Country:
- Europe > United Kingdom
- England > Cambridgeshire > Cambridge (0.04)
- Asia
- Singapore (0.04)
- Japan > Honshū
- Kantō > Kanagawa Prefecture (0.04)
- Europe > United Kingdom
- Genre:
- Research Report > New Finding (0.67)
- Technology: