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Line 1: In [[econometrics]], the '''information matrix test''' is used to determine whether a [[regression model]] is [[Statistical model specification\|misspecified]]. The test was developed by [[Halbert White]],<ref>{{Cite journal \|last1=White\|first1=Halbert\|title=Maximum Likelihood Estimation of Misspecified Models \|journal=[[Econometrica]] \|date=1982 \|volume=50 \|issue=1 \|pages=1–25 \|doi=10.2307/1912526 \|jstor=1912526 }}</ref> who observed that in a correctly specified model and under standard regularity assumptions, the [[Fisher information matrix]] can be expressed in either of two ways: as the [[outer product]] of the [[gradient]] of the log-likelihood function, or as a function of ~~the~~its [[Hessian matrix]] ~~of the log-likelihood function~~. Consider a linear model <math>\mathbf{y} = \mathbf{X} \mathbf{\beta} + \mathbf{u}</math>, where the errors <math>\mathbf{u}</math> are assumed to be distributed <math>\mathrm{N}(0, \sigma^2 \mathbf{I})</math>. If the parameters <math>\beta</math> and <math>\sigma^2</math> are stacked in the vector <math>\mathbf{\theta}^{\mathsf{T}} = \begin{bmatrix} \beta & \sigma^2 \end{bmatrix}</math>, the resulting [[Likelihood function\|log-likelihood function]] is Line 16: : <math>\mathbf{\Delta}(\mathbf{\theta}) = \sum_{i=1}^n \left[ \frac{\partial^2 \ell(\mathbf{\theta}) }{ \partial \mathbf{\theta} \, \partial \mathbf{\theta}^{\mathsf{T}} } + \frac{\partial \ell(\mathbf{\theta}) }{ \partial \mathbf{\theta} } \frac{\partial \ell (\mathbf{\theta}) }{ \partial \mathbf{\theta} } \right]</math> where <math>\mathbf{\Delta} (\mathbf{\theta})</math> is an <math>(r \times r) </math> [[random matrix]], where <math>r</math> is the number of parameters. White showed that the elements of <math>n^{-1/2} \mathbf{\Delta} ( \mathbf{\hat{\theta}} )</math>, where <math>\mathbf{\hat{\theta}}</math> is the MLE, are asymptotically [[Normal distribution\|normally distributed]] with zero means when the model is correctly specified.<ref>{{cite book \|first=L. G. \|last=Godfrey \|~~authorlink~~author-link=Leslie G. Godfrey \|title=Misspecification Tests in Econometrics \|publisher= [[Cambridge University Press]] \|year=1988 \|isbn=0-521-26616-5 \|pages=35–37 \|url=https://~~www~~books.google.com/books~~/edition/Misspecification_Tests_in_Econometrics/apXgcgoy7OgC~~?hlid=~~en&gbpv=1~~apXgcgoy7OgC&pg=PA35 }}</ref> In small samples, however, the test generally performs poorly.<ref>{{cite journal \|first=Chris \|last=Orme \|title=The Small-Sample Performance of the Information-Matrix Test \|journal=[[Journal of Econometrics]] \|volume=46 \|issue=3 \|year=1990 \|pages=309–331 \|doi=10.1016/0304-4076(90)90012-I }}</ref> == References == Line 22: == Further reading == * {{cite book \|~~first~~first1=W. \|~~last~~last1=Krämer \|first2=H. \|last2=Sonnberger \|title=The Linear Regression Model Under Test \|___location=Heidelberg \|publisher=Physica-Verlag \|year=1986 \|isbn=3-7908-0356-1 \|pages=105–110 \|url=https://~~www~~books.google.com/books~~/edition/_/NSvqCAAAQBAJ~~?hlid=~~en&gbpv=1~~NSvqCAAAQBAJ&pg=PA105 }} * {{cite book \|first=Halbert \|last=White \|chapter=Information Matrix Testing \|title=Estimation, Inference and Specification Analysis \|___location=New York \|publisher=Cambridge University Press \|year=1994 \|isbn=0-521-25280-6 \|pages=300–344 \|~~chapterurl~~chapter-url=https://~~www~~books.google.com/books~~/edition/_/hnNpQSf7ZlAC~~?hlid=~~en&gbpv=1~~hnNpQSf7ZlAC&pg=PA300 }} [[Category:Statistical tests]]