Referenced Items are not available for this document.
Rates of Convergence of the Functional 
-Nearest Neighbor Estimate
Rates of Convergence of the Functional
Let F be a separable Banach space, and let (X, Y) be a random pair taking values in F Ã R. Motivated by a broad range of potential applications, we investigate rates of convergence of the k-nearest neighbor estimate rn (x) of the regression function r(x) = E[Y|X = x], based on n independent copies of the pair (X, Y). Using compact embedding theory, we present explicit and general finite sample bounds on the expected squared difference E[rn(X) - r(X)]2, and particularize our results to classical function spaces such as Sobolev spaces, Besov spaces, and reproducing kernel Hilbert spaces.
Published in:
Information Theory, IEEE Transactions on
(Volume:56
,
Issue:
4
)
Date of Publication: April 2010
- Page(s):
- 2034 - 2040
- ISSN :
- 0018-9448
- INSPEC Accession Number:
- 11204298
- Digital Object Identifier :
- 10.1109/TIT.2010.2040857
- Product Type:
- Journals & Magazines
- Date of Current Version :
- 22 March 2010
- Issue Date :
- April 2010
- Sponsored by :
- IEEE Information Theory Society
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