RESEARCH GROUP

Feel free to contact me if you have an interest in numerical methods for partial differential equations (finite element methods or preconditioning) and are considering to pursue a PhD or Master degree in Applied Mathematics.

Current Graduate Students and Postdoctoral Researchers

Keegan KirkKeegan Kirk
PhD student

 

Greg WangGreg Wang
PhD student

 

Paulo ZunigaPaulo Zúñiga
Postdoctoral Researcher
 


Aaron Baier-ReinioAaron Baier-Reinio
Researcher

 

Nicholas OlsenNicholas Olson
Master student
 

 

Former Graduate Students and Postdoctoral Researchers

Abdullah SivasAbdullah Ali Sivas PhD (2021)
Preconditioning of Hybridizable Discontinuous Galerkin Discretizations of the Navier-Stokes Equations

 

Giselle Sosa JonesGiselle Sosa Jones PhD (2020)
Space-time hybridizable discontinuous Galerkin methods for free-surface wave problems

 

Aaron Baier-ReinioAaron Baier-Reinio MMath (2022)
Numerical analysis of divergence-free discontinuous Galerkin methods for incompressible flow problems

 

Kyle BookerKyle Booker MMath (2021)
H(div)-conforming Discontinuous Galerkin Methods for Multiphase Flow


Tim DockhornTim Dockhorn MMath (2019)
Generative Modeling with Neural Ordinary Differential Equations

 

Greg Wang

Greg Wang MMath (2019)
An abstract framework of pressure robustness for saddle point problems in Hilbert spaces

 

Keegan KirkKeegan Kirk (2018)
Transferred from Master program into the PhD program

 

Yunhui HeYunhui He 
Postdoctoral Researcher (2019-2021)
Now postdoc at the University of British Columbia


Tamas HorvathTamás L.Horváth 
Postdoctoral Researcher (2016-2018)
Now Assistant Professor at Oakland University