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The Nonsingularity of Γ in Covariance Structure Analysis of Nonnormal Data

Published online by Cambridge University Press:  01 January 2025

Robert Jennrich  and
Albert Satorra
Robert Jennrich*
Affiliation:
University of California, Los Angeles
Albert Satorra
Affiliation:
Universitat Pompeu Fabra, Barcelona
*
Requests for reprints should be sent to Robert Jennrich, University of California, Los Angeles, 3400 Purdue Avenue, Los Angeles, CA, USA. E-mail: rij@stat.ucla.edu
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Abstract

Covariance structure analysis of nonnormal data is important because in practice all data are nonnormal. When applying covariance structure analysis to nonnormal data, it is generally assumed that the asymptotic covariance matrix Γ for the nonredundant terms in the sample covariance matrix S is nonsingular. It is shown this need not be the case, which raises a question of how restrictive this assumption may be and how difficult it may be to verify it. It is shown that Γ is nonsingular whenever sampling is from a nonsingular distribution, including any distribution defined by a density function. In the discrete case necessary and sufficient conditions are given for the nonsingularity of Γ, and it is shown how to demonstrate Γ is nonsingular with high probability. Thus, the nonsingularity of Γ assumption is mild and one should feel comfortable about making it. These observations also apply to the asymptotic covariance matrix Γ that arises in structural equation modeling.

Keywords

covariance structure analysisnonredundant componentsnon-singularity of Gammanonsingular distributiondiscrete distributionmultivariate polynomialssmooth manifolds
Type
Original Paper
Information
Psychometrika , Volume 79 , Issue 1 , January 2014 , pp. 51 - 59
Copyright
Copyright © 2013 The Psychometric Society

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Footnotes

The research of the second author is supported by grant EC02011-28875 from the Spanish Ministry of Science and Innovation.

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