dc.description.abstract | Unreplicated two level fractional factorial designs are a common type of experimental
design used in the early stages of industrial experimentation. They allow considerable
information about the e ects of several factors on the response to be obtained with
a relatively small number of runs.
The aim of this thesis is to improve the guidance available to experimenters in choosing
a good design and analysing data. This is particularly important when there is
commercial pressure to minimise the size of the experiment.
A design is usually chosen based on optimality, either in terms of a variance criterion
or estimability criteria such as resolution. This is given the number of factors, number
of levels of each factor and number of runs available. A decision theory approach is
explored, which allows a more informed choice of design to be made. Prior distributions
on the sizes of e ects are taken into consideration, and then a design chosen
from a candidate set of designs using a utility function relevant to the objectives of
the experiment. Comparisons of the decision theoretic methods with simple rules of
thumb are made to determine when the more complex approach is necessary.
Fully Bayesian methods are rarely used in multifactor experiments. However there
is virtually always some prior knowledge about the sizes of e ects and so using this
in a Bayesian data analysis seems natural. Vague and more informative priors are
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explored.
The analysis of this type of experiment can be impacted in a disastrous way in the
presence of outliers. An analysis that is robust to outliers is sought by applying di erent
model distributions of the data and prior assumptions on the parameters. Results
obtained are compared with those from standard analyses to assess the bene ts of
the Bayesian analysis. | en_US |