Hansen-Hurwitz estimator

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The Hansen-Hurwitz estimator

The Hansen-Hurwitz estimator gives the framework for all unequal probability sampling with replacement (Hansen and Hurwitz, 1943[1]). “With replacement” means that the selection probabilities are the same for all draws; if selected elements would not be replaced (put back to the population), the selection probabilities would change after each draw for the remaining elements.

Suppose that a sample of size n is drawn with replacement and that on each draw the probability of selecting the i-th unit of the population is \(p_i\).

Then the Hansen-Hurwitz estimator of the population total is


\[\hat \tau = \frac {1}{n} \sum_{i=1}^n \frac {y_i}{p_i}\]


Here, each observation \(y_i\) is weighted by the inverse of its selection probability \(p_i\).


The parametric variance of the total is


\[var (\hat \tau) = \frac {1}{n} \sum_{i=1}^N p_i \left (\frac {y_i}{p_i} - \tau \right )^2\]


which is unbiasedly estimated from a sample size n from


\[v\hat ar (\hat \tau) = \frac {1}{n} \frac {\sum_{i=1}^n \left (\frac {y_i}{p_i} - \tau \right )^2}{n-1}\]



Exercise.png Hansen-Hurwitz estimator examples: 4 application examples



References

  1. Hansen MM and WN Hurwitz. 1943. On the theory of sampling from finite populations. Annals of Mathematical Statistics 14:333-362.
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