On Certain Characteristics of the Distribution of the Latent Roots of a Symmetric Random Matrix Under General Conditions

On Certain Characteristics of the Distribution of the Latent Roots of a Symmetric Random Matrix Under General Conditions

Under certain conditions, to be specified in Theorems 2 and 4, the latent roots of the symmetric random matrix F with ε F = Φ are biased estimators of the latent roots of Φ; the smallest (largest) root is negatively (positively) biased. Here bias includes both expectation-bias and median-bias. Furth...

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Bibliographic Details
Published in:The Annals of mathematical statistics Vol. 32; no. 3; pp. 864 - 873
Main Author: van der Vaart, H. R.
Format: Journal Article
Language:English
Published: Institute of Mathematical Statistics 01-01-1961
The Institute of Mathematical Statistics
Subjects:
Eigenvalues
Estimation bias
Estimation theory
Estimators
Lebesgue measures
Mathematical independent variables
Matrices
Probabilities
Random variables
Sufficient conditions
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Summary:Under certain conditions, to be specified in Theorems 2 and 4, the latent roots of the symmetric random matrix F with ε F = Φ are biased estimators of the latent roots of Φ; the smallest (largest) root is negatively (positively) biased. Here bias includes both expectation-bias and median-bias. Further properties of the distribution of the latent roots are given, among them some relations between covariances of the latent roots, covariances of elements of F, and the amounts of expectation-bias of the latent roots. Also, a sufficient condition is given for a certain type of symmetry in the joint distribution of the latent roots. For applications of the theory presented in this paper to the theory of response surface estimation see van der Vaart [9].
ISSN:0003-4851
2168-8990
DOI:10.1214/aoms/1177704979