Some problems of inference in two-dimensional distributions
Abstract
This thesis is concerned with problems of, and associated with,
inference in some particular two-dimensional distributions. This includes
obtaining properties of parameter estimators in multiparametrie and multidimensional
distributions which is generally a very messy procedure. Since
the theory of how to obtain maximum likelihood estimators and their
asymptotic properties is well developed, and because these asymptotic
properties are deemed desirable for inferential procedures, maximum likelihood
estimators should be examined, if only to enable comparisons to be made with
estimators that are easier to calculate. Although the theory of maximum
likelihood estimation is fairly well developed, the practical difficulties
this can entail tend to be glossed over. Obtaining properties of other
estimators can be even more difficult. Often only asymptotic moments, if
that, can be obtained and no distributional properties. Here a variety of
methods are used to extract as much information as possible about the
parameter estimators.
Problems associated with inference are not confined to obtaining
properties of parameter estimators. It may be necessary to verify that a
particular estimation scheme, such as maximum likelihood, can be used for a
particular problem. In addition if such an estimation scheme is inappropriate
or unwieldy, some other approach may have to be considered. As an exploratory
step it may be desirable to establish distributional or probabilistic
properties of the distribution involved, and some work of this kind is done
in this thesis.
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