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December, 1986 Conditional Association and Unidimensionality in Monotone Latent Variable Models
Paul W. Holland, Paul R. Rosenbaum
Ann. Statist. 14(4): 1523-1543 (December, 1986). DOI: 10.1214/aos/1176350174

Abstract

Latent variable models represent the joint distribution of observable variables in terms of a simple structure involving unobserved or latent variables, usually assuming the conditional independence of the observable variables given the latent variables. These models play an important role in educational measurement and psychometrics, in sociology and in population genetics, and are implicit in some work on systems reliability. We study a broad class of latent variable models, namely the monotone unidimensional models, in which the latent variable is a scalar, the observable variables are conditionally independent given the latent variable and the conditional distribution of the observables given the latent variable is stochastically increasing in the latent variable. All models in this class imply a new strong form of positive dependence among the observable variables, namely conditional (positive) association. This positive dependence condition may be used to test whether any model in this class can provide an adequate fit to observed data. Various applications, generalizations and a numerical example are discussed.

Citation

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Paul W. Holland. Paul R. Rosenbaum. "Conditional Association and Unidimensionality in Monotone Latent Variable Models." Ann. Statist. 14 (4) 1523 - 1543, December, 1986. https://doi.org/10.1214/aos/1176350174

Information

Published: December, 1986
First available in Project Euclid: 12 April 2007

zbMATH: 0625.62102
MathSciNet: MR868316
Digital Object Identifier: 10.1214/aos/1176350174

Subjects:
Primary: 60E15
Secondary: 62H99 , 62P15

Keywords: $MTP_2$ , $TP_2$ , associated random variables , conditional association , factor analysis , item response theory , latent class models , latent variable models , Population genetics , SPOD , systems reliability

Rights: Copyright © 1986 Institute of Mathematical Statistics

Vol.14 • No. 4 • December, 1986
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