Open AccessDetermining the Number of Factors from Empirical Distribution of Eigenvalues
Author(s) -
Alexei Onatski
Publication year - 2010
Publication title -
the review of economics and statistics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 8.999
H-Index - 165
eISSN - 1530-9142
pISSN - 0034-6535
DOI - 10.1162/rest_a_00043
Subject(s) - eigenvalues and eigenvectors , estimator , mathematics , infinity , covariance matrix , covariance , distribution (mathematics) , econometrics , statistics , contrast (vision) , mathematical analysis , computer science , physics , quantum mechanics , artificial intelligence
We develop a new estimator of the number of factors in the approximate factor models. The estimator works well even when the idiosyncratic terms are substantially correlated. It is based on the fact, established in the paper, that any finite number of the largest "idiosyncratic" eigenvalues of the sample covariance matrix cluster around a single point. In contrast, all the "systematic" eigenvalues, the number of which equals the number of factors, diverge to infinity. The estimator consistently separates the diverging eigenvalues from the cluster and counts the number of the separated eigenvalues. We consider a macroeconomic and a financial application. (c) 2010 The President and Fellows of Harvard College and the Massachusetts Institute of Technology.
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