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Achieving near perfect classification for functional data
Author(s) -
Delaigle Aurore,
Hall Peter
Publication year - 2012
Publication title -
journal of the royal statistical society: series b (statistical methodology)
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 6.523
H-Index - 137
eISSN - 1467-9868
pISSN - 1369-7412
DOI - 10.1111/j.1467-9868.2011.01003.x
Subject(s) - truncation (statistics) , contrast (vision) , mathematics , projection (relational algebra) , dimension (graph theory) , consistency (knowledge bases) , multivariate statistics , functional principal component analysis , principal component analysis , sample size determination , algorithm , computer science , artificial intelligence , statistics , discrete mathematics , pure mathematics
Summary. We show that, in functional data classification problems, perfect asymptotic classification is often possible, making use of the intrinsic very high dimensional nature of functional data. This performance is often achieved by linear methods, which are optimal in important cases. These results point to a marked contrast between classification for functional data and its counterpart in conventional multivariate analysis, where the dimension is kept fixed as the sample size diverges. In the latter setting, linear methods can sometimes be quite inefficient, and there are no prospects for asymptotically perfect classification, except in pathological cases where, for example, a variance vanishes. By way of contrast, in finite samples of functional data, good performance can be achieved by truncated versions of linear methods. Truncation can be implemented by partial least squares or projection onto a finite number of principal components, using, in both cases, cross‐validation to determine the truncation point. We establish consistency of the cross‐validation procedure.