TY - JOUR
T1 - Bayesian bandwidth estimation for a semi-functional partial linear regression model with unknown error density
AU - Shang, Han Lin
PY - 2014/6
Y1 - 2014/6
N2 - In the context of semi-functional partial linear regression model, we study the problem of error density estimation. The unknown error density is approximated by a mixture of Gaussian densities with means being the individual residuals, and variance a constant parameter. This mixture error density has a form of a kernel density estimator of residuals, where the regression function, consisting of parametric and nonparametric components, is estimated by the ordinary least squares and functional Nadaraya-Watson estimators. The estimation accuracy of the ordinary least squares and functional Nadaraya-Watson estimators jointly depends on the same bandwidth parameter. A Bayesian approach is proposed to simultaneously estimate the bandwidths in the kernel-form error density and in the regression function. Under the kernel-form error density, we derive a kernel likelihood and posterior for the bandwidth parameters. For estimating the regression function and error density, a series of simulation studies show that the Bayesian approach yields better accuracy than the benchmark functional cross validation. Illustrated by a spectroscopy data set, we found that the Bayesian approach gives better point forecast accuracy of the regression function than the functional cross validation, and it is capable of producing prediction intervals nonparametrically.
AB - In the context of semi-functional partial linear regression model, we study the problem of error density estimation. The unknown error density is approximated by a mixture of Gaussian densities with means being the individual residuals, and variance a constant parameter. This mixture error density has a form of a kernel density estimator of residuals, where the regression function, consisting of parametric and nonparametric components, is estimated by the ordinary least squares and functional Nadaraya-Watson estimators. The estimation accuracy of the ordinary least squares and functional Nadaraya-Watson estimators jointly depends on the same bandwidth parameter. A Bayesian approach is proposed to simultaneously estimate the bandwidths in the kernel-form error density and in the regression function. Under the kernel-form error density, we derive a kernel likelihood and posterior for the bandwidth parameters. For estimating the regression function and error density, a series of simulation studies show that the Bayesian approach yields better accuracy than the benchmark functional cross validation. Illustrated by a spectroscopy data set, we found that the Bayesian approach gives better point forecast accuracy of the regression function than the functional cross validation, and it is capable of producing prediction intervals nonparametrically.
KW - Error density estimation
KW - Functional Nadaraya-Watson estimator
KW - Functional regression
KW - Gaussian kernel mixture
KW - Markov chain Monte Carlo
UR - http://www.scopus.com/inward/record.url?scp=84901849233&partnerID=8YFLogxK
U2 - 10.1007/s00180-013-0463-0
DO - 10.1007/s00180-013-0463-0
M3 - Article
SN - 0943-4062
VL - 29
SP - 829
EP - 848
JO - Computational Statistics
JF - Computational Statistics
IS - 3-4
ER -