Formation matrix

This article is an orphan, as no other articles link to it. Please introduce links to this page from related articles; try the Find link tool for suggestions.

In statistics and information theory, the expected formation matrix of a likelihood function ${\displaystyle L(\theta )}$ is the matrix inverse of the Fisher information matrix of ${\displaystyle L(\theta )}$, while the observed formation matrix of ${\displaystyle L(\theta )}$ is the inverse of the observed information matrix of ${\displaystyle L(\theta )}$.

Currently, no notation for dealing with formation matrices is widely used, but in Ole E. Barndorff-Nielsen and Peter McCullagh books and articles the symbol ${\displaystyle j^{ij}}$ is used to denote the element of the i-th line and j-th column of the observed formation matrix.

These matrices appear naturally in the asymptotic expansion of the distribution of many statistics related to the likelihood ratio.

Barndorff--Nielsen, O. and D.R. Cox, (1989), Asymptotic Techniques for Use in Statistics, Chapman and Hall, London.

Barndorff-Nielsen, O.E. and Cox, D.R., (1994). Inference and Asymptotics. Chapman & Hall, London.

P. McCullagh, "Tensor Methods in Statistics", Monographs on Statistics and Applied Probability, Chapman and Hall, 1987.

Fisher information

Shannon entropy

This statistics-related article is a stub. You can help Wikipedia by expanding it.

• v
• t
• e