Date of Award

December 2020

Document Type

Dissertation

Degree Name

Doctor of Philosophy (PhD)

Department

Mathematical Sciences

Committee Member

Christopher McMahan

Committee Member

Andrew Brown

Committee Member

Sez Atamturktur

Committee Member

Yu-Bo Wang

Abstract

This dissertation focuses on developing statistical models to analyze complex data. The motivating applications in this work include infectious disease screening, engineering, and public health problems. Chapters 2 and 3 take a frequentist approach to modeling and parameter estimation while Chapters 4 and 5 proceed with Bayesian methods. Maximum likelihood estimation is implemented in a case of missing data through latent variables (Chapter 2) as well as by embedding a finite element model within the likelihood framework (Chapter 3). Two Markov Chain Monte Carlo (MCMC) algorithms are applied to estimate parameters and fit regression models using data obtained from a coupled system (Chapter 4) and data depending on spatial random effects (Chapter 5). In particular, spike and slab prior distributions, Gibbs steps, and Metropolis-Hastings steps are used to complete estimation. The finite sample performance of our techniques are investigated using extensive numerical simulation studies that are based on the motivating data sets. The methods are then applied to data sets on the Heptatits B infection, spring and mass systems, acceleration data from vehicle-bridge coupled systems, and opioid overdoses in South Carolina.

Download

Share

COinS
 
 

To view the content in your browser, please download Adobe Reader or, alternately,
you may Download the file to your hard drive.

NOTE: The latest versions of Adobe Reader do not support viewing PDF files within Firefox on Mac OS and if you are using a modern (Intel) Mac, there is no official plugin for viewing PDF files within the browser window.