Franziska Weber

Research Bio

Franziska Weber is an applied mathematician interested in the analysis and numerical approximation of nonlinear partial differential equations emerging in fluid dynamics, multi-phase flows, complex fluids and mathematical biology. Her goal is the development of efficient and convergent numerical methods for these applications. Besides that, she have worked on uncertainty quantification using multilevel Monte Carlo methods for nonlinear evolution equations. More recently, she has started working on problems related to turbulence and statistical descriptions of nonlinear conservation laws.

Research Expertise and Interest

applied mathematics, mathematical analysis, numerical analysis, nonlinear partial differential equations

Teaching

Courses taught during the three most recent terms
2026 Spring

  • Seminars  [MATH 290]  

  • Reading Course for Graduate Students  [MATH 299]  

2025 Fall

  • Numerical Analysis  [MATH 128A]  

  • Supervised Independent Study and Research  [MATH 199]  

  • Seminars  [MATH 290]  

  • Seminars  [MATH 290]  

  • Individual Research  [MATH 295]  

2025 Summer

  • General Academic Internship  [MATH N297]  

2025 Spring

  • Honors Thesis  [MATH 196]  

  • Numerical Solution of Differential Equations  [MATH 228B]  

  • Seminars  [MATH 290]  

  • Reading Course for Graduate Students  [MATH 299]