statistics Statistics (from German language, German: ', "description of a State (polity), state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In applying statistics to a s ...

, the Hájek–Le Cam convolution theorem states that any regular estimator in a

parametric model In statistics, a parametric model or parametric family or finite-dimensional model is a particular class of statistical models. Specifically, a parametric model is a family of probability distributions that has a finite number of parameters. Defi ...

is asymptotically equivalent to a sum of two

independent Independent or Independents may refer to: Arts, entertainment, and media Artist groups * Independents (artist group), a group of modernist painters based in Pennsylvania, United States * Independentes (English: Independents), a Portuguese artist ...

random variables, one of which is normal with asymptotic variance equal to the inverse of

Fisher information In mathematical statistics, the Fisher information is a way of measuring the amount of information that an observable random variable ''X'' carries about an unknown parameter ''θ'' of a distribution that models ''X''. Formally, it is the variance ...

, and the other having arbitrary distribution. The obvious corollary from this theorem is that the "best" among regular estimators are those with the second component identically equal to zero. Such estimators are called efficient and are known to always exist for regular parametric models. The theorem is named after

Jaroslav Hájek Jaroslav Hájek (; 1926–1974) was a Czech people, Czech mathematician who worked in theoretical statistics, theoretical and nonparametric statistics, nonparametric statistics. The Hajek projection and Hájek–Le Cam convolution theorem are name ...

and Lucien Le Cam.

Statement

Let ℘ = be a regular parametric model, and ''q''(''θ''): Θ → ℝ^''m'' be a parameter in this model (typically a parameter is just one of the components of vector ''θ''). Assume that function ''q'' is differentiable on Θ, with the ''m × k'' matrix of derivatives denoted as ''q̇_θ''. Define :

I_^ = \dot(\theta)I^(\theta)\dot(\theta)'

— the ''information bound'' for ''q'', :

\psi_ = \dot(\theta)I^(\theta)\dot\ell(\theta)

— the ''efficient influence function'' for ''q'', where ''I''(''θ'') is the

matrix for model ℘,

\scriptstyle\dot\ell(\theta)

is the score function, and ′ denotes

matrix transpose In linear algebra, the transpose of a matrix is an operator which flips a matrix over its diagonal; that is, it switches the row and column indices of the matrix by producing another matrix, often denoted by (among other notations). The tr ...

.
Theorem . Suppose ''T_n'' is a uniformly (locally) regular estimator of the parameter ''q''. Then

There exist independent random ''m''-vectors $\scriptstyle Z_\theta\,\sim\,\mathcal(0,\,I^_)$ and ''Δ_θ'' such that : $\sqrt(T_n - q(\theta)) \ \xrightarrow\ Z_\theta + \Delta_\theta,$ where ^''d'' denotes
convergence in distribution In probability theory, there exist several different notions of convergence of sequences of random variables, including ''convergence in probability'', ''convergence in distribution'', and ''almost sure convergence''. The different notions of conve ...
. More specifically, : $\begin
\sqrt(T_n - q(\theta)) - \tfrac \sum_^n \psi_(x_i) \\
\tfrac \sum_^n \psi_(x_i)
\end
\ \xrightarrow\
\begin
\Delta_\theta \\
Z_\theta
\end.$
If the map ''θ'' → ''q̇_θ'' is continuous, then the convergence in (A) holds uniformly on compact subsets of Θ. Moreover, in that case Δ_''θ'' = 0 for all ''θ'' if and only if ''T_n'' is uniformly (locally) asymptotically linear with influence function ''ψ''_{''q''(''θ'')}

References

* {{DEFAULTSORT:Hajek-Le Cam Convolution Theorem Theorems in statistics