Abstract:
Surveys are traditionally used for estimating population parameters. These surveys are
mainly focused on estimating parameters for relatively large populations. These estimates are
used for representing not only the whole population but also subpopulations such as sub-areas
or socio-economic groups in the main population. Although the overall sample is representative
of the whole population, there may not be sufficient number of elements in the sample that
represent various subpopulations. A domain or subpopulation is called a small area, if the
domain specific sample is small. There is a huge demand from public and private sectors to
have precise and accurate estimates for small areas in the populations. The requirements of
estimates for small areas may occur once the survey has been conducted. Although a census
can be conducted to get more accurate estimates for any small areas it is costly and time
consuming. Also, it is not possible to conduct surveys every time to get all necessary estimates.
Small Area Estimation (SAE) techniques play the main role to provide more precise estimates
for small areas. SAE uses available auxiliary information to improve the precision of estimates
for small areas.
SAE has two main branches called direct and indirect estimation. Direct estimation uses
design based or domain based approaches while indirect estimation use implicit or explicit
models to get precise estimates. Implicit models commonly use traditional demographic models
or indirect domain estimates. However explicit models use basic area level or basic unit level
models. In this research new methodologies are developed for the basic unit level models. There
are two approaches used in the field of SAE such as frequentist approach and Bayesian
approach. Among them, in this study frequentist approach is used to develop new
methodologies for SAEs. Linear Mixed Models (LMM) is commonly used to get the fixed and
random effects into the model. In the SAE, the effect due to subpopulations or small areas is
considered as the random effect while the effect due to the auxiliary variables is considered as
the fixed effect. A commonly used SAE model which is a special case of LMM known as
components of variance model or nested error regression model is considered in this study.
Researchers have developed various methodologies to obtain parameters of LMM to have
improved SAEs using least squares method, maximum likelihood method, Bayesian methods
and other methods. Constrained estimation techniques are rarely used to obtain the model
parameters. However there may be situations where prior knowledge on model parameters are
available. The prior knowledge may be based on past statistical information or some existing
theory. There is a research gap in the use of prior knowledge in SAEs. This study focuses on
least squares method with constraints to gel model parameters.