Bayesian bandwidth estimation and semi-metric selection for a functional partial linear model with unknown error density
Abstract
This study examines the optimal selections of bandwidth and semi-metric for a functional partial linear model. Our proposed method begins by estimating the unknown error density using a kernel density estimator of residuals, where the regression function, consisting of parametric and nonparametric components, can be estimated by functional principal component and functional Nadayara-Watson estimators. The estimation accuracy of the regression function and error density crucially depends on the optimal estimations of bandwidth and semi-metric. A Bayesian method is utilized to simultaneously estimate the bandwidths in the regression function and kernel error density by minimizing the Kullback-Leibler divergence. For estimating the regression function and error density, a series of simulation studies demonstrate that the functional partial linear model gives improved estimation and forecast accuracies compared with the functional principal component regression and functional nonparametric regression. Using a spectroscopy dataset, the functional partial linear model yields better forecast accuracy than some commonly used functional regression models. As a by-product of the Bayesian method, a pointwise prediction interval can be obtained, and marginal likelihood can be used to select the optimal semi-metric.
Cite
@article{arxiv.2002.10038,
title = {Bayesian bandwidth estimation and semi-metric selection for a functional partial linear model with unknown error density},
author = {Han Lin Shang},
journal= {arXiv preprint arXiv:2002.10038},
year = {2020}
}
Comments
27 pages, 10 figures, to appear in Journal of Applied Statistics