Synthesizing regression results: a factored likelihood method

Regression methods are widely used by researchers in many fields, yet methods for synthesizing regression results are scarce. This study proposes using a factored likelihood method, originally developed to handle missing data, to appropriately synthesize regression models involving different predictors. This method uses the correlations reported in the regression studies to calculate synthesized standardized slopes. It uses available correlations to estimate missing ones through a series of regressions, allowing us to synthesize correlations among variables as if each included study contained all the same variables. Great accuracy and stability of this method under fixed-effects models were found through Monte Carlo simulation. An example was provided to demonstrate the steps for calculating the synthesized slopes through sweep operators. By rearranging the predictors in the included regression models or omitting a relatively small number of correlations from those models, we can easily apply the factored likelihood method to many situations involving synthesis of linear models. Limitations and other possible methods for synthesizing more complicated models are discussed. Copyright © 2012 John Wiley & Sons, Ltd.

[1]  T. W. Anderson Maximum Likelihood Estimates for a Multivariate Normal Distribution when Some Observations are Missing , 1957 .

[2]  Roderick J. A. Little,et al.  Statistical Analysis with Missing Data: Little/Statistical Analysis with Missing Data , 2002 .

[3]  A. Dempster Elements of Continuous Multivariate Analysis , 1969 .

[4]  Jacob Cohen,et al.  Applied multiple regression/correlation analysis for the behavioral sciences , 1979 .

[5]  Betsy Jane Becker,et al.  Using Results From Replicated Studies to Estimate Linear Models , 1992 .

[6]  S Natasha Beretvas,et al.  Meta-analytic methods of pooling correlation matrices for structural equation modeling under different patterns of missing data. , 2005, Psychological methods.

[7]  Betsy Jane Becker,et al.  The Synthesis of Regression Slopes in Meta-Analysis. , 2007, 0801.4442.

[8]  Mark W. Lipsey,et al.  Practical Meta-Analysis , 2000 .

[9]  D. Rubin INFERENCE AND MISSING DATA , 1975 .

[10]  R. Kim,et al.  Standardized Regression Coefficients as Indices of Effect Sizes in Meta-Analysis. , 2011 .

[11]  A. Boomsma,et al.  Robustness Studies in Covariance Structure Modeling , 1998 .

[12]  L. Hedges,et al.  Statistical Methods for Meta-Analysis , 1987 .

[13]  Larry V. Hedges,et al.  The Effect of School Resources on Student Achievement , 1996 .

[14]  Mike W-L Cheung,et al.  Meta-analytic structural equation modeling: a two-stage approach. , 2005, Psychological methods.

[15]  G. Casella,et al.  Explaining the Gibbs Sampler , 1992 .

[16]  S. Kullback,et al.  On Testing Correlation Matrices , 1967 .

[17]  Steven P. Brown,et al.  On the use of beta coefficients in meta-analysis. , 2005, The Journal of applied psychology.

[18]  Steven J. Ingels,et al.  National Education Longitudinal Study of 1988. Field Test Report. , 1987 .

[19]  Søren Feodor Nielsen,et al.  Inference and Missing Data: Asymptotic Results , 1997 .

[20]  Xianggui Qu,et al.  Multivariate Data Analysis , 2007, Technometrics.

[21]  Adrian F. M. Smith,et al.  Sampling-Based Approaches to Calculating Marginal Densities , 1990 .

[22]  S. Green How Many Subjects Does It Take To Do A Regression Analysis. , 1991, Multivariate behavioral research.