# Recent Theses

## 2018

**Melinda Kleczynski**Master of Science in Mathematical Sciences

Advisor: Allan Struthers

Thesis Title: Pseudo-Companion Matrices for Polynomial Systems

**Fadhila Yosof**Master of Science in Mathematical Sciences

Advisor: Qiuying Sha

Thesis Title: CUR Matrix Decomposition Method for Joint Analysis of Multiple Phenotypes

## 2017

**Joshua Davies**Master of Science in Mathematical Sciences

Advisor: William Keith

Thesis Title: Distribution of Permutation Statistics Across Pattern Avoidance Classes, and the Search for a Denert-Associated Condition Equivalent to Pattern Avoidance

**Qiuchen Hai**Master of Science in Mathematical Sciences

Advisor: Jianping Dong

Thesis Title: On the Equivalence Between Bayesian and Frequentist Nonparametric Hypothesis Testing

**Mitchell Tahtinen**Master of Science in Mathematical Sciences

Advisor: Kui Zhang

Thesis Title: Analysis of Data from a Study to Identify Potential Biomarkers to Indicate Renal Injury

**Teresa Woods**Master of Science in Mathematical Sciences

Advisors: Shari Stockero/Yeonwoo Rho

Thesis Title: Analysis of Aleks Mathematics Placement Test Data

## 2016

**Anna Pascoe**Master of Science in Mathematical Sciences

Advisor: Shari Stockero

Thesis Title: Learning to Notice and Use Student Thinking in Undergraduate Mathematics Courses

**Dilek Erkmen**Master of Science in Mathematical Sciences

Advisor: Alexander Labovsky

Thesis Title: Defect-Deferred Correction Method for the Two-Domain Convection-Dominated Convection-Diffusion Problem

**Henriette Groenvik**Master of Science in Mathematical Sciences

Advisor: Yeonwoo Rho

Thesis Title: A Self-Normalizing Approach to the Specification Test of Mixed-Frequency Models

**Mustafa Aggul**

Master of Science in Mathematical Sciences

Advisor: Alexander Labovsky

Thesis Title: A High Accuracy Minimally Invasive Regularization Technique for Navier-Stokes
Equations at High Reynolds Number

**Shengnan Li**

Master of Science in Mathematical Sciences

Advisor: Min Wang

Thesis Title: Objective Bayesian Analysis of a Generalized Lognormal Distribution

*Note: Search the J. R. Van Pelt and Opie Library Catalog for online availability of recent theses.*