Optimal Auxiliary Variable Assisted Two-Phase Sampling Designs.
Abstract
Two-phase sampling is a procedure in which sampling and data collection is conducted
in two phases, aiming at achieving increased precision in estimation at reduced cost. The
rst phase typically involves sampling a large number of elements and collecting data on
variables that are easy to measure. In the second phase, a subset is sampled for which
all variables of interest are observed. Utilization of the information provided by the data
observed in the rst phase may increase precision in estimation by optimal selection of
sampling design the second phase.
This thesis deals with two-phase sampling when a random sample following some general
parametric statistical model is drawn in the rst phase, followed by subsampling with
unequal probabilities in the second phase. The method of maximum pseudo-likelihood
estimation, yielding consistent estimators under general two-phase sampling procedures,
is presented. The design in
uence on the variance of the maximum pseudo-likelihood
estimator is studied. Optimal subsampling designs under various optimality criteria are
derived analytically and numerically using auxiliary variables observed in the rst sampling
phase.
Degree
Student essay
Collections
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Date
2016-06-22Author
Imberg, Henrik
Keywords
Anticipated variance
Auxiliary information in design
Maximum pseudolikelihood
Optimal designs
Poisson sampling
Two-phase sampling
Language
eng