Effects of Misspecifying the First-Level Error Structure in Two-Level Models of Change

Computer simulation methods were used to examine the sensitivity of model fit criteria to misspecification of the first-level error structure in two-level models of change, and then to examine the impact of misspecification on estimates of the variance parameters, estimates of the fixed effects, and tests of the fixed effects. Fit criteria frequently failed to identify the correct model when series lengths were short. Misspecification led to substantially biased estimates of variance parameters. The estimates of the fixed effects, however, remained unbiased for most conditions, and the tests of fixed effects were robust to misspecification for most conditions. The problems in the fixed effects occurred when nonlinear growth trajectories were coupled with data that were unequally spaced by different amounts for different individuals.

[1]  Russell D. Wolfinger,et al.  A comparison of two approaches for selecting covariance structures in the analysis of repeated measurements , 1998 .

[2]  R. Wolfinger Covariance structure selection in general mixed models , 1993 .

[3]  Anthony S. Bryk,et al.  Hierarchical Linear Models: Applications and Data Analysis Methods , 1992 .

[4]  Nicholas T. Longford Regression analysis of multilevel data with measurement error , 1993 .

[5]  R. Mclean,et al.  A Unified Approach to Mixed Linear Models , 1991 .

[6]  Nan M. Laird,et al.  The Effect of Covariance Structure on Variance Estimation in Balanced Growth-Curve Models with Random Parameters , 1989 .

[7]  B Krause,et al.  On problems in measuring change. , 1982, Zeitschrift fur Psychologie mit Zeitschrift fur angewandte Psychologie.

[8]  John M. Ferron Teacher’s Corner: Moving Between Hierarchical Modeling Notations , 1997 .

[9]  John M. Ferron,et al.  Moving between Hierarchical Modeling Notations , 1997 .

[10]  R. Jennrich,et al.  Unbalanced repeated-measures models with structured covariance matrices. , 1986, Biometrics.

[11]  C. R. Henderson,et al.  Best linear unbiased estimation and prediction under a selection model. , 1975, Biometrics.

[12]  R. Littell SAS System for Mixed Models , 1996 .

[13]  J. Ware Linear Models for the Analysis of Longitudinal Studies , 1985 .

[14]  Christopher H. Morrell,et al.  Linear Transformations of Linear Mixed-Effects Models , 1997 .

[15]  Harvey Goldstein,et al.  Adjusting for Measurement Error in Multilevel Analysis , 1996 .

[16]  D. VanLeeuwen,et al.  A note on the covariance structure in a linear model , 1997 .

[17]  H. Goldstein Multilevel Statistical Models , 2006 .

[18]  S. Raudenbush,et al.  Application of Hierarchical Linear Models to Assessing Change , 1987 .

[19]  D. Heitjan,et al.  Modelling repeated-series longitudinal data. , 1997, Statistics in medicine.

[20]  R. N. Kackar,et al.  Approximations for Standard Errors of Estimators of Fixed and Random Effects in Mixed Linear Models , 1984 .

[21]  Raghu N. Kackar,et al.  Unbiasedness of two-stage estimation and prediction procedures for mixed linear models , 1981 .

[22]  R. Blair,et al.  A Maximum Test for Scale: Type I Error Rates and Power , 1995 .

[23]  Richard L. Tate,et al.  Random Versus Nonrandom Coefficient Models for Multilevel Analysis , 1983 .

[24]  H. Keselman,et al.  A comparison of recent approaches to the analysis of repeated measurements , 1999 .

[25]  Michael W. Browne,et al.  Best methods for the analysis of change: Recent advances, unanswered questions, future directions. , 1991 .

[26]  G. Robinson That BLUP is a Good Thing: The Estimation of Random Effects , 1991 .

[27]  David Rogosa,et al.  A growth curve approach to the measurement of change. , 1982 .

[28]  H Goldstein,et al.  Multilevel time series models with applications to repeated measures data. , 1994, Statistics in medicine.

[29]  R. Bosker Boekbespreking van "A.S. Bryk & S.W. Raudenbusch - Hierarchical linear models: Applications and data analysis methods" : Sage Publications, Newbury Parki, London/New Delhi 1992 , 1995 .

[30]  Judith D. Singer,et al.  Using SAS PROC MIXED to Fit Multilevel Models, Hierarchical Models, and Individual Growth Models , 1998 .

[31]  Gregory Camilli,et al.  Application of a Method of Estimating DIF for Polytomous Test Items , 1999 .