A. Y. 2025/2026
Hilbert Spaces and Fourier Series
Introduction to Integrable PDEs: the Korteweg-de Vries equation
Analysis and Geometry seminar (semester I) and (semester II)
A. Y. 2024/2025
Hilbert Spaces and Fourier Series (Part One)
Exam Solutions: (first session)
Introduction to Integrable PDEs: the Korteweg-de Vries equation
Analysis and Geometry seminar (semester I) and (semester II)
A. Y. 2023/2024
Hilbert Spaces and Fourier Series (Part One)
Exam Solutions: (first session) - (second session)
Introduction to Integrable PDEs: the Korteweg-de Vries equation (lecture notes)
A. Y. 2021/2022
A. Y. 2020/2021
A. Y. 2019/2020
A. Y. 2018/2019
Please feel free to contact me if you are interested in topics at the intersection of mathematics and physics. A general list of topics:
Numerical Methods for classical mechanics and statistical mechanics
Geometrical perspective on systems with dissipation
Hamiltonian mechanics (both Symplectic and Contact)
(2025) L. Verbeken: The Plykin attractor
(2025) B. Lens: Numerical Splitting Schemes forODEs with a View Towards PDEs