An alternative approach to linearization variance estimators. Demnati and Rao (2004) derive a unified theory for linearization
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An alternative approach to linearization variance estimators. Demnati and Rao (2004) derive a unified theory for linearization variance estimation using weights. Let θ be the population quantity of interest, and define the estimator ˆθ to be a function of the vector of sampling weights and the population values:
θ= g (w, y1, y2. . . yk ),
Where w= (w1. . . wN)T with wi the sampling weight of unit i (wi =0 if i is not in the sample), and yj is the vector of population values for the jth response variable.
Then a linearization variance estimator can be found by taking the partial derivatives of the function with respect to the weights. Let
For example, considering the ratio estimator of the population total,
The partial derivative of ˆθ = g (w, x, y) with respect to wi is
For an SRS, finding the estimated variance of ṫz gives (4.11).
Consider the post stratified estimator in Exercise 17.
- Write the estimator as ṫpost =g (w, y, x1. . . xL), where xli =1 if observation i is in post stratum l and 0 otherwise.
- Find an estimator of V (ṫpost) using the Demnati–Rao (2004) approach.
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