A note on the prediction error of principal component regression in high dimensions
Publication type: Journal Article
Publication date: 2023-10-03
scimago Q4
wos Q4
SJR: 0.238
CiteScore: 0.9
Impact factor: 0.6
ISSN: 00949000, 15477363
Statistics and Probability
Statistics, Probability and Uncertainty
Abstract
We analyze the prediction error of principal component regression (PCR) and prove high probability bounds for the corresponding squared risk conditional on the design. Our first main result shows that PCR performs comparably to the oracle method obtained by replacing empirical principal components by their population counterparts, provided that an effective rank condition holds. On the other hand, if the latter condition is violated, then empirical eigenvalues start to have a significant upward bias, resulting in a self-induced regularization of PCR. Our approach relies on the behavior of empirical eigenvalues, empirical eigenvectors and the excess risk of principal component analysis in high-dimensional regimes.
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Hucker L., Wahl M. A note on the prediction error of principal component regression in high dimensions // Theory of Probability and Mathematical Statistics. 2023. Vol. 109. pp. 37-53.
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Hucker L., Wahl M. A note on the prediction error of principal component regression in high dimensions // Theory of Probability and Mathematical Statistics. 2023. Vol. 109. pp. 37-53.
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TY - JOUR
DO - 10.1090/tpms/1196
UR - https://www.ams.org/tpms/2023-109-00/S0094-9000-2023-01196-7/
TI - A note on the prediction error of principal component regression in high dimensions
T2 - Theory of Probability and Mathematical Statistics
AU - Hucker, Laura
AU - Wahl, Martin
PY - 2023
DA - 2023/10/03
PB - American Mathematical Society
SP - 37-53
VL - 109
SN - 0094-9000
SN - 1547-7363
ER -
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@article{2023_Hucker,
author = {Laura Hucker and Martin Wahl},
title = {A note on the prediction error of principal component regression in high dimensions},
journal = {Theory of Probability and Mathematical Statistics},
year = {2023},
volume = {109},
publisher = {American Mathematical Society},
month = {oct},
url = {https://www.ams.org/tpms/2023-109-00/S0094-9000-2023-01196-7/},
pages = {37--53},
doi = {10.1090/tpms/1196}
}