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Faculty of Mathematics

 

Career

  • 2019-present: Nevile Research Fellow in Mathematics, Magdalene College, University of Cambridge
  • 2015-2019:  PhD at the Cambridge Centre for Analysis (CCA), University of Cambridge
  • 2013-2015:  Master of Science in Mathematics, University of Kaiserslautern (Germany), and National University of Singapore (2013)
  • 2010-2013: Bachelor of Science in Mathematics, University of Kaiserslautern (Germany)

 

Research

Lisa is a research fellow in the Department of Applied Mathematics and Theoretical Physics and the Cantab Capital Institute for Mathematics of Information. She is primarily interested in variational methods and partial differential equations, and their applications in biology, physics, engineering and data science. Her current research interests include nonlinear reaction-diffusion equations, kinetic equations, interacting particle models and PDEs on graphs. For more details about her research, recent publications, invited talks and research visits, see personal website

Publications

Stability Analysis of Line Patterns of an Anisotropic Interaction Model
JA Carrillo, B During, LM Kreusser, CB Schonlieb
– SIAM Journal on Applied Dynamical Systems
(2019)
18,
1798
An anisotropic interaction model for simulating fingerprints
B Düring, C Gottschlich, S Huckemann, LM Kreusser, C-B Schönlieb
– J Math Biol
(2019)
78,
2171
Application of quantitative inline NMR spectroscopy for investigation of a fixed-bed chromatographic reactor process
A Brächer, LM Kreußer, S Qamar, A Seidel-Morgenstern, E von Harbou
– Chemical Engineering Journal
(2018)
336,
518
Pattern formation of a nonlocal, anisotropic interaction model
M Burger, B Düring, LM Kreusser, PA Markowich, CB Schönlieb
– Mathematical Models and Methods in Applied Sciences
(2018)
28,
409
Trend to Equilibrium for a Delay Vlasov--Fokker--Planck Equation and Explicit Decay Estimates
A Klar, L Kreusser, O Tse
– SIAM Journal on Mathematical Analysis
(2017)
49,
3277
Rigorous Continuum Limit for the Discrete Network Formation Problem
J Haskovec, LM Kreusser, P Markowich
ODE and PDE based modeling of biological transportation networks
J Haskovec, LM Kreusser, P Markowich
Auxin transport model for leaf venation
J Haskovec, H Jönsson, LM Kreusser, P Markowich
A Deterministic Approach to Avoid Saddle Points
LM Kreusser, SJ Osher, B Wang

Research Group

Cambridge Image Analysis

Room

F2.07