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1. OPTIMAL ALLOCATION IN STRATIFIED AND MULTISTAGE SAMPLES USING PRIOR INFORMATION.

Author

Ericson, W. A.

Subjects

*GAUSSIAN distribution, *ALGORITHMS, *BUDGET, *OVERHEAD costs, *STATISTICAL sampling, *DISTRIBUTION (Probability theory)

Abstract

The author [1], [2] has given an algorithm for finding that stratified allocation which minimizes the posterior variance of the overall population mean subject to a budget constraint under a model in which a normal prior distribution and independent normal sampling distributions were assumed. The budget constraint assumed a variable per unit cost of observation. In the present paper these results are extended to cover the case where there are fixed costs, as well as variable costs, associated with sampling in the ith stratum. The resulting algorithm is noted to be applicable in finding the optimal allocation of sampling effort (with fixed and variable sampling costs) under a variety of distributional assumptions. An interpretation is also given to two and higher stage design questions when there is differential prior information regarding the first stage units. [ABSTRACT FROM AUTHOR]

Published

1968