DocumentCode
1258215
Title
Consistent Nonparametric Regression for Functional Data Under the Stone–Besicovitch Conditions
Author
Forzani, Liliana ; Fraiman, Ricardo ; Llop, Pamela
Author_Institution
Fac. de Ing. Quim. & Inst. de Mat. Aplic. del Litoral, Univ. Nac. del Litoral, Santa Fe, Argentina
Volume
58
Issue
11
fYear
2012
Firstpage
6697
Lastpage
6708
Abstract
In this paper, we address the problem of nonparametric regression estimation in the infinite-dimensional setting. We start by extending the Stone´s seminal result to the case of metric spaces when the probability measure of the explanatory variables is tight. Then, under slight variations on the hypotheses, we state and prove the theorem for general metric measure spaces. From this result, we derive the mean square consistency of the k-NN and kernel estimators if the regression function is bounded and the Besicovitch condition holds. We also prove that, for the uniform kernel estimate, the Besicovitch condition is also necessary in order to attain L1 consistency for almost every x.
Keywords
estimation theory; pattern classification; probability; regression analysis; Stone-Besicovitch conditions; consistent nonparametric regression; functional data; general metric measure spaces; k-NN estimator; kernel estimator; mean square consistency; probability measure; uniform kernel estimate; Context; Convergence; Extraterrestrial measurements; Hilbert space; Kernel; Random variables; Functional data; nonparametric regression; separable metric spaces;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/TIT.2012.2209628
Filename
6259857
Link To Document