Locally Adaptive Bayes Nonparametric Regression via Nested Gaussian Processes
Abstract
We propose a nested Gaussian process (nGP) as a locally adaptive prior for Bayesian nonparametric regression. Specified through a set of stochastic differential equations (SDEs), the nGP imposes a Gaussian process prior for the function's th-order derivative. The nesting comes in through including a local instantaneous mean function, which is drawn from another Gaussian process inducing adaptivity to locally-varying smoothness. We discuss the support of the nGP prior in terms of the closure of a reproducing kernel Hilbert space, and consider theoretical properties of the posterior. The posterior mean under the nGP prior is shown to be equivalent to the minimizer of a nested penalized sum-of-squares involving penalties for both the global and local roughness of the function. Using highly-efficient Markov chain Monte Carlo for posterior inference, the proposed method performs well in simulation studies compared to several alternatives, and is scalable to massive data, illustrated through a proteomics application.
Cite
@article{arxiv.1201.4403,
title = {Locally Adaptive Bayes Nonparametric Regression via Nested Gaussian Processes},
author = {Bin Zhu and David B. Dunson},
journal= {arXiv preprint arXiv:1201.4403},
year = {2012}
}