Hi all,
I am doing an analysis of the effect of sovereign ESG scores on total factor productivity. Originally, I wanted to use a fixed effects model as the Hausman test indicated I should. however, after reading Bell, A., & Jones, K. (2015). Explaining Fixed Effects: Random Effects Modeling of Time-Series Cross-Sectional and Panel Data. Political Science Research And Methods, 3(1), 133–153. https://doi.org/10.1017/psrm.2014.7 I decided to go for the adjusted Mundlak's approach (within-between) which should the same as a fixed effects model and more. What I am now wondering is: should I cluster my standard errors? I cannot seem to find literature on clustering standard errors in random effects models, and most of the literature is on fixed effects models. A Breusch Pagan LM test indicated the rejection of homoskedastic standard errors. I used Drukker's (2003) test for serial correlation and confirmed the presence of it. and in general, when there is serial correlation, clustering standard errors will help.
Looking forward to your insights.
Kind regards,
Maarten
I am doing an analysis of the effect of sovereign ESG scores on total factor productivity. Originally, I wanted to use a fixed effects model as the Hausman test indicated I should. however, after reading Bell, A., & Jones, K. (2015). Explaining Fixed Effects: Random Effects Modeling of Time-Series Cross-Sectional and Panel Data. Political Science Research And Methods, 3(1), 133–153. https://doi.org/10.1017/psrm.2014.7 I decided to go for the adjusted Mundlak's approach (within-between) which should the same as a fixed effects model and more. What I am now wondering is: should I cluster my standard errors? I cannot seem to find literature on clustering standard errors in random effects models, and most of the literature is on fixed effects models. A Breusch Pagan LM test indicated the rejection of homoskedastic standard errors. I used Drukker's (2003) test for serial correlation and confirmed the presence of it. and in general, when there is serial correlation, clustering standard errors will help.
Looking forward to your insights.
Kind regards,
Maarten
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