Adaptive estimator

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In statistics, an adaptive estimator is an estimator in a parametric or semiparametric model with nuisance parameters such that the presence of these nuisance parameters does not affect efficiency of estimation.

Formally, let parameter θ in a parametric model consists of two parts: the parameter of interest ν∈N⊆ℝ^k, and the nuisance parameter η∈H⊆ℝ^m. Thus θ = (ν,η)∈N×H⊆ℝ^k+m. Then we will say that ${\displaystyle \scriptstyle {\hat {\nu }}_{n}}$ is an adaptive estimator of ν in the presence of η if this estimator is regular on ${\displaystyle \scriptstyle {\mathcal {P}}}$ and efficient for each of the submodels ^[1]

${\displaystyle {\mathcal {P}}_{\nu }(\eta _{0})={\big \{}P_{\theta }:\nu \in N,\eta =\eta _{0}{\big \}}}$

Adaptive estimator estimates the parameter of interest equally well regardless whether the value of the nuisance parameter is known or not.

The necessary condition for a regular parametric model to have an adaptive estimator is that

${\displaystyle I_{\nu \eta }(\theta )=\int z_{\nu }z_{\eta }'d\mu =0\quad {\text{for all }}\theta ,}$

where z_ν and z_η are components of the score function corresponding to parameters ν and η respectively, and I_νη is the top-right k×m block of the Fisher information matrix I(θ).

Suppose ${\displaystyle \scriptstyle {\mathcal {P}}}$ is the normal location-scale family:

${\displaystyle {\mathcal {P}}={\Big \{}\ f_{\theta }(x)={\tfrac {1}{{\sqrt {2\pi }}\sigma }}e^{-{\frac {1}{2\sigma ^{2}}}(x-\mu )^{2}}\ {\Big |}\ \mu \in \mathbb {R} ,\sigma >0\ {\Big \}}.}$

Then the usual estimator ${\displaystyle {\hat {\mu }}\,=\,{\bar {x}}}$ is adaptive: we can estimate the mean equally well whether we know the variance or not.