Regular estimator

Regular estimators are a class of statistical estimators that satisfy certain regularity conditions which make them amenable to asymptotic analysis. The convergence of a regular estimator's distribution is, in a sense, locally uniform. This is often considered desirable and leads to the convenient property that a small change in the parameter does not dramatically change the distribution of the estimator.^[1]

Definition

An estimator ${\displaystyle {\hat {\theta }}_{n}}$  of ${\displaystyle \psi (\theta )}$  based on a sample of size ${\displaystyle n}$  is said to be regular if for every ${\displaystyle h}$ :^[1]

$${\displaystyle {\sqrt {n}}\left(\theta _{n}-\psi (\theta +h/{\sqrt {n}})\right){\stackrel {\theta +h/{\sqrt {n}}}{\rightarrow }}L_{\theta }}$$

 

where the convergence is in distribution under the law of ${\displaystyle \theta +h/{\sqrt {n}}}$ .

Examples of non-regular estimators

Both the Hodges' estimator^[1] and the James-Stein estimator^[2] are non-regular estimators when the population parameter ${\displaystyle \theta }$  is exactly 0.

See also

• Estimator
• Cramér-Rao bound
• Hodges' estimator
• James-Stein estimator

References

1. Vaart AW van der. Asymptotic Statistics. Cambridge University Press; 1998.
2. Beran, R. (1995). THE ROLE OF HAJEK'S CONVOLUTION THEOREM IN STATISTICAL THEORY