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Multivariate one-sided tests for multivariate normal and mixed effects regression models with missing data, semi-continuous data and censored data Zhou, Guohai
Abstract
In many applications, statistical models for real data often have natural constraints or restrictions on some model parameters. For example, the growth rate of a child is expected to be positive, and patients receiving anti-HIV treatments are expected to exhibit a decline in their viral loads. Hypothesis testing for certain model parameters incorporating the natural constraints is expected to be more powerful than testing ignoring the constraints. Although constrained statistical inference, especially multi-parameter order-restricted hypothesis testing, has been studied in the literature for several decades, methods for models for complex longitudinal data are still very limited. In this thesis, we develop innovative multi-parameter orderrestricted (or one-sided) hypothesis testing methods for modelling the following complex data: (1) multivariate normal data with non-ignorable missing values; (2) semi-continuous longitudinal data; and (3) left censored or truncated longitudinal data due to detection limits. We focus on testing mean parameters in the models, and the approaches are based on the likelihood methods. Some asymptotic results are obtained, and some computational challenges are discussed. Simulation studies are conducted to evaluate the proposed methods. Several real datasets are analyzed to illustrate the power advantages of proposed new tests.
Item Metadata
Title |
Multivariate one-sided tests for multivariate normal and mixed effects regression models with missing data, semi-continuous data and censored data
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Creator | |
Publisher |
University of British Columbia
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Date Issued |
2017
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Description |
In many applications, statistical models for real data often have natural constraints or restrictions on some model parameters. For example, the growth rate of a child is expected to be positive, and patients receiving anti-HIV treatments are expected to exhibit a decline in their viral loads. Hypothesis testing for certain model parameters incorporating the natural constraints is expected to be more powerful than testing ignoring the constraints. Although constrained statistical inference, especially multi-parameter order-restricted hypothesis testing, has been studied in the literature for several decades, methods for models for complex longitudinal data are still very limited. In this thesis, we develop innovative multi-parameter orderrestricted (or one-sided) hypothesis testing methods for modelling the following complex data: (1) multivariate normal data with non-ignorable missing values; (2) semi-continuous longitudinal data; and (3) left censored or truncated longitudinal data due to detection limits. We focus on testing mean parameters in the models, and the approaches are based on the likelihood methods. Some asymptotic results are obtained, and some computational challenges are discussed. Simulation studies are conducted to evaluate the proposed methods. Several real datasets are analyzed to illustrate the power advantages of proposed new tests.
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Genre | |
Type | |
Language |
eng
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Date Available |
2017-12-20
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Provider |
Vancouver : University of British Columbia Library
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Rights |
Attribution-NonCommercial-NoDerivatives 4.0 International
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DOI |
10.14288/1.0362236
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URI | |
Degree | |
Program | |
Affiliation | |
Degree Grantor |
University of British Columbia
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Graduation Date |
2018-02
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Campus | |
Scholarly Level |
Graduate
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Rights URI | |
Aggregated Source Repository |
DSpace
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Rights
Attribution-NonCommercial-NoDerivatives 4.0 International