Matthew Romney
Lecturer
Charles V. Schaefer, Jr. School of Engineering and Science
Department of Mathematical Sciences
Education
- PhD (2017) University of Illinois (Mathematics)
- MS (2013) Brigham Young University (Mathematics)
- MS (2012) Brigham Young University (Mathematics)
Research
I am a mathematician working in the areas of geometry and analysis in metric spaces and complex analysis.
General Information
I received my Ph.D. in Mathematics from the University of Illinois in 2017, advised by Jeremy Tyson. Prior to that, I received undergraduate and masters degrees from Brigham Young University.
Experience
Prior to arriving at Stevens, I held postdoctoral positions at Stony Brook University, the University of Cologne (Germany) and the University of Jyvaskyla (Finland).
Professional Service
- Duke Mathematical Journal Peer reviewer
- Annals of Global Analysis and Geometry Peer reviewer
- American Mathematical Society Mathematical Reviews (MathSciNet) Reviewer
- Proceedings of the American Mathematical Society Peer reviewer
- Topology and its Applications Peer reviewer
- Complex Variables and Elliptic Equations Peer reviewer
- Computational Methods and Function Theory Peer reviewer
- Complex Analysis and Operator Theory Peer reviewer
Appointments
Lecturer, Stevens Institute of Technology, 2023-
James H. Simons Instructor, Stony Brook University, 2020-2023
Postdoctoral researcher, University of Cologne, 2020
Postdoctoral research, University of Jyvaskyla, 2018-2019
James H. Simons Instructor, Stony Brook University, 2020-2023
Postdoctoral researcher, University of Cologne, 2020
Postdoctoral research, University of Jyvaskyla, 2018-2019
Honors and Awards
I was awarded the 2017 Wolfgang Haken Prize in Geometry and Topology at the University of Illinois for outstanding graduate student research.
Grants, Contracts and Funds
My research is currently supported by NSF Standard Grant (Analysis Program) DMS-241315: Uniformization of surfaces and mapping problems in metric spaces.
Selected Publications
Journal Article
Courses
MA 221: Differential Equations (Fall 2023, Spring 2024)
MA 117: Calculus for Business and Liberal Arts (Fall 2023)
MA 121: Differential Calculus (Fall 2024)
MA 117: Calculus for Business and Liberal Arts (Fall 2023)
MA 121: Differential Calculus (Fall 2024)