Measurement Error Models With Uncertainty About the Error Variance

It is well known that measurement error in observable variables induces bias in estimates in standard regression analysis and that structural equation models are a typical solution to this problem. Often, multiple indicator equations are subsumed as part of the structural equation model, allowing for consistent estimation of the relevant regression parameters. In many instances, however, embedding the measurement model into structural equation models is not possible because the model would not be identified. To correct for measurement error one has no other recourse than to provide the exact values of the variances of the measurement error terms of the model, although in practice such variances cannot be ascertained exactly, but only estimated from an independent study. The usual approach so far has been to treat the estimated values of error variances as if they were known exact population values in the subsequent structural equation modeling (SEM) analysis. In this article we show that fixing measurement error variance estimates as if they were true values can make the reported standard errors of the structural parameters of the model smaller than they should be. Inferences about the parameters of interest will be incorrect if the estimated nature of the variances is not taken into account. For general SEM, we derive an explicit expression that provides the terms to be added to the standard errors provided by the standard SEM software that treats the estimated variances as exact population values. Interestingly, we find there is a differential impact of the corrections to be added to the standard errors depending on which parameter of the model is estimated. The theoretical results are illustrated with simulations and also with empirical data on a typical SEM model.

[1]  Richard G. Lomax,et al.  A Beginner's Guide to Structural Equation Modeling , 2022 .

[2]  Theresa M. Beckie,et al.  Measuring Quality of Life , 1997 .

[3]  Albert Satorra,et al.  Linear structural relations: Gradient and Hessian of the fitting function , 1991 .

[4]  Leslie A. Hayduk Structural equation modeling with LISREL: essentials and advances , 1987 .

[5]  J. Ware,et al.  Conceptualization and Measurement of Health for Adults in the Health Insurance Study , 1979 .

[6]  B. Muthén BEYOND SEM: GENERAL LATENT VARIABLE MODELING , 2002 .

[7]  Heather A McKay,et al.  Predicting physical activity intention and behaviour among children in a longitudinal sample. , 2006, Social science & medicine.

[8]  K. Manderbacka,et al.  Assessing reliability of a measure of self-rated health , 1996, Scandinavian journal of social medicine.

[9]  Dianne M. Finkelstein,et al.  A Beginner's Guide to Structural Equation Modeling , 2005, Technometrics.

[10]  Robert D. Putnam,et al.  Bowling alone: the collapse and revival of American community , 2000, CSCW '00.

[11]  Willem E. Saris,et al.  Design, Evaluation, and Analysis of Questionnaires for Survey Research: Saris/Design , 2007 .

[12]  Patrick E. Shrout,et al.  Reliability of Scales With General Structure: Point and Interval Estimation Using a Structural Equation Modeling Approach , 2002 .

[13]  R Core Team,et al.  R: A language and environment for statistical computing. , 2014 .

[14]  Karl G. Jöreskog,et al.  Lisrel 8: User's Reference Guide , 1997 .

[15]  Albert Satorra,et al.  Model Conditions for Asymptotic Robustness in the Analysis of Linear Relations , 1990 .

[16]  Alexander Kukush,et al.  Measurement Error Models , 2011, International Encyclopedia of Statistical Science.

[17]  R. Dixon,et al.  Stability and change in adult personality over 6 years: findings from the Victoria Longitudinal Study. , 2003, The journals of gerontology. Series B, Psychological sciences and social sciences.

[18]  A. Satorra Alternative test criteria in covariance structure analysis: A unified approach , 1989 .

[19]  Christine Eiser,et al.  Measuring quality of life , 1997, Archives of disease in childhood.

[20]  A. Satorra,et al.  Complex Sample Data in Structural Equation Modeling , 1995 .

[21]  Duane F. Alwin Margins of Error: A Study of Reliability in Survey Measurement , 2007 .

[22]  Willem E. Saris,et al.  Design, Evaluation, and Analysis of Questionnaires for Survey Research , 2007 .

[23]  Sajeev Varki,et al.  The Role of Price Perceptions in an Integrated Model of Behavioral Intentions , 2001 .

[24]  Yasuo Amemiya,et al.  Estimation for the Multivariate Errors-in-Variables Model with Estimated Error Covariance Matrix , 1984 .