The Hausman test for random effects

Summary

Setup

\[y_{i,t}=β_1+β_2x_{i,t}+ε_{i,t} , i=1,…,n , t=1,…,T\]

\[ε_{i,t}=α_i+μ_{i,t}, i=1,…,n , t=1,…,T\]

The explanatory variable is exogenous with respect to the error terms \(μ_{i,t}\) , \(E\left( μ_{i,t}|x_i \right)=0\)
The error terms \(μ_{i,t}\) are homoscedastic and not autocorrelated.
There is some individual specific variation over time in the explanatory variable

The Hausman test

If the individual specific effects are fixed, then the RE estimator and the FE estimator of \(β_2\) will converge to different values .
If the individual specific effects are random, then the RE estimator and the FE estimator of \(β_2\) will converge to the same value . The RE estimator is more efficient .
The null-hypothesis is \(H_0\) : the individual specific effects are random. If the difference between the RE-estimator and the FE estimator is significantly different from zero then \(H_0\) is rejected.