unitbeta

The unit used for a list which, for each integer b from 1 to B includes the name of parameter $\beta_b$ , the estimated parameter $\hat{\beta}_b$ , the estimated asymptotic standard deviation $\hat{\sigma}(\hat{\beta}_b)$ of $\hat{\beta}_b$ derived from the square root of row b and column b of the estimated asymptotic covariance matrix

$\begin{equation*} \widehat{\Cov}(\hat{\boldsymbol{\beta}})= \mathbf{T}[-\nabla^2\ell_V(\hat{\boldsymbol{\gamma}})]^{-1}[-\nabla^2\ell(\hat{\boldsymbol{\gamma}})] [-\nabla^2\ell_V(\hat{\boldsymbol{\gamma}})]^{-1}\mathbf{T}' \end{equation*}$

of $\hat{\boldsymbol{\beta}}$ , the estimated asymptotic standard deviation $\hat{\sigma}_L(\hat{\beta}_b)$ of $\hat{\beta}_b$ derived from the square root of row b and column b of the Louis (Louis, 1982) estimate

$\begin{equation*} \widehat{\Cov}_L(\hat{\boldsymbol{\beta}})= \mathbf{T}[\boldsymbol{\Phi}_V(\hat{\boldsymbol{\gamma}})]^{-1}\boldsymbol{\Phi}(\hat{\boldsymbol{\gamma}}) [\boldsymbol{\Phi}_V(\hat{\boldsymbol{\gamma}})]^{-1}\mathbf{T}' \end{equation*}$

of the asymptotic covariance matrix of $\hat{\boldsymbol{\beta}}$ , and the estimated asymptotic standard deviation $\hat{\sigma}_S(\hat{\beta}_b)$ of $\hat{\beta}_b$ derived from the square root of row b and column b of the sandwich estimated asymptotic covariance matrix

$\begin{equation*} \widehat{\Cov}_S(\hat{\boldsymbol{\beta}})= \mathbf{T}[-\nabla^2\ell_V(\hat{\boldsymbol{\gamma}})]^{-1}\boldsymbol{\Phi}(\hat{\boldsymbol{\gamma}}) [-\nabla^2\ell_V(\hat{\boldsymbol{\gamma}})]^{-1}\mathbf{T}' \end{equation*}$

obtained without the assumption that the model holds (Huber, 1967; White, 1980; Haberman, 1989). If the Louis approximation is used for the negative Hessian matrix in implementation of the Newton-Raphson algorithm, then these three estimated asymptotic standard deviations are all the same. If complex sampling is used, then the estimated asymptotic standard deviation $\hat{\sigma}_C(\hat{\beta}_b)$ of $\hat{\beta}_b$ derived from the square root of row b and column b of the estimated asymptotic covariance matrix

$\begin{equation*} \widehat{\Cov}_S(\hat{\boldsymbol{\beta}})= \mathbf{T}[-\nabla^2\ell_V(\hat{\boldsymbol{\gamma}})]^{-1}\widehat{\Cov}(\nabla\ell(\boldsymbol{\gamma})) [-\nabla^2\ell_V(\hat{\boldsymbol{\gamma}})]^{-1}\mathbf{T}'. \end{equation*}$

In listening9.txt, unitbeta is 11. An example of output appears in listeningbeta.csv. In this example, all expressions for standard errors yield rather similar results. The third column is $\hat{\sigma}(\hat{\beta}_b)$ , the fourth column is $\hat{\sigma}_L(\hat{\beta}_c)$ , and the fifth column is $\hat{\sigma}_S(\hat{\beta}_b)$ . In listeningp2.txt, an artificial example of complex sampling is provided in which primary sampling units are defined in terms of a sequence number. In this case, unitbeta is 11. The corresponding file is listeningpbeta.csv. Because the example is artificial, the added column for $\hat{\sigma}_C(\hat{\beta}_b)$ is quite similar to the other columns.

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