Anisotropic function estimation using multi-bandwidth Gaussian processes
Publication
, Journal Article
Bhattacharya, A; Pati, D; Dunson, D
Published in: Annals of Statistics
January 1, 2014
In nonparametric regression problems involving multiple predictors, there is typically interest in estimating an anisotropic multivariate regression surface in the important predictors while discarding the unimportant ones. Our focus is on defining a Bayesian procedure that leads to the minimax optimal rate of posterior contraction (up to a log factor) adapting to the unknown dimension and anisotropic smoothness of the true surface. We propose such an approach based on a Gaussian process prior with dimension-specific scalings, which are assigned carefully-chosen hyperpriors. We additionally show that using a homogenous Gaussian process with a single bandwidth leads to a sub-optimal rate in anisotropic cases.
Duke Scholars
Published In
Annals of Statistics
DOI
ISSN
0090-5364
Publication Date
January 1, 2014
Volume
42
Issue
1
Start / End Page
352 / 381
Related Subject Headings
- Statistics & Probability
- 1403 Econometrics
- 0104 Statistics
- 0102 Applied Mathematics
Citation
APA
Chicago
ICMJE
MLA
NLM
Bhattacharya, A., Pati, D., & Dunson, D. (2014). Anisotropic function estimation using multi-bandwidth Gaussian processes. Annals of Statistics, 42(1), 352–381. https://doi.org/10.1214/13-AOS1192
Bhattacharya, A., D. Pati, and D. Dunson. “Anisotropic function estimation using multi-bandwidth Gaussian processes.” Annals of Statistics 42, no. 1 (January 1, 2014): 352–81. https://doi.org/10.1214/13-AOS1192.
Bhattacharya A, Pati D, Dunson D. Anisotropic function estimation using multi-bandwidth Gaussian processes. Annals of Statistics. 2014 Jan 1;42(1):352–81.
Bhattacharya, A., et al. “Anisotropic function estimation using multi-bandwidth Gaussian processes.” Annals of Statistics, vol. 42, no. 1, Jan. 2014, pp. 352–81. Scopus, doi:10.1214/13-AOS1192.
Bhattacharya A, Pati D, Dunson D. Anisotropic function estimation using multi-bandwidth Gaussian processes. Annals of Statistics. 2014 Jan 1;42(1):352–381.
Published In
Annals of Statistics
DOI
ISSN
0090-5364
Publication Date
January 1, 2014
Volume
42
Issue
1
Start / End Page
352 / 381
Related Subject Headings
- Statistics & Probability
- 1403 Econometrics
- 0104 Statistics
- 0102 Applied Mathematics