1. THE USE OF A STRATIFICATION VARIABLE IN ESTIMATION BY PROPORTIONAL STRATIFIED SAMPLING.
- Author
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Särndal, Carl-Erik
- Subjects
- *
STATISTICAL sampling , *ESTIMATION theory , *MATHEMATICAL variables , *GAUSSIAN distribution , *EQUATIONS , *DISTRIBUTION (Probability theory) , *MATHEMATICAL statistics - Abstract
This paper deals with proportional stratified sampling in the situation where the estimation variable X is difficult and expensive to observe, while the possibly erroneous stratification variable Y is easy and inexpensive to get at. The usually biased estimate [Multiple line equation(s) cannot be represented in ASCII text] is compared with the unbiased estimate [Multiple line equation(s) cannot be represented in ASCII text] where the P[sub I] are stratum weights and y[sub I] and x[sub I] are means of the units sampled from the I:th stratum. The two estimates are similar in that they utilize information from only those population units that make up the sample. While mu[sub a] is the more inexpensive estimate, mu[sub b] is usually preferable if one judges by the size of the mean square error, which, among other things, depends on the number of strata and the location of the stratum boundaries. In particular, the properties of mu[sub a] and mu[sub b] are discussed in connection with an example involving the bivariate normal distribution. [ABSTRACT FROM AUTHOR]
- Published
- 1968
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