深度马蹄高斯过程

Deep horseshoe Gaussian processes

Annals of Statistics · 2025
被引 2
ABS 4★

中文导读

提出一种基于平方指数核的深度高斯过程新先验Deep-HGP,能自适应选择长度尺度参数,在非参数回归中实现最优收敛速度,并同时适应回归函数的平滑性和组合结构。

Abstract

Deep Gaussian processes have recently been proposed as natural objects to fit, similarly to deep neural networks, possibly complex features present in modern data samples, such as compositional structures. Adopting a Bayesian nonparametric approach, it is natural to use deep Gaussian processes as prior distributions, and use the corresponding posterior distributions for statistical inference. We introduce the deep Horseshoe Gaussian process Deep–HGP, a new simple prior based on deep Gaussian processes with a squared-exponential kernel, that in particular enables data-driven choices of the key lengthscale parameters. For nonparametric regression with random design, we show that the associated posterior distribution recovers the unknown true regression curve optimally in terms of quadratic loss, up to a logarithmic factor, in an adaptive way. The convergence rates are simultaneously adaptive to both the smoothness of the regression function and to its structure in terms of compositions. The dependence of the rates in terms of dimension are explicit, allowing in particular for input spaces of dimension increasing with the number of observations.

高斯过程非参数回归贝叶斯非参数自适应收敛速度深度模型