cv
Basics
Name | Jörg Weber |
Title | Dr. rer. nat. |
Date of birth | 2nd April 1993 |
Gender | male |
Nationality | German |
Address | Oskar-Morgenstern-Platz 1, 1090 Vienna, Austria |
joerg.weber@univie.ac.at | |
Phone | +43 1 4277 50478 |
Website | joerg-weber.github.io |
Work
-
01/2025– -
10/2023–12/2024 -
09/2023–10/2023 -
09/2022–08/2023 -
09/2020–08/2022 -
10/2016–08/2020
Education
-
01/2017–07/2020 Dr. rer. nat.
University of Bayreuth
Supervisor: Prof. Dr. Gerhard Rein
Thesis: The Relativistic Vlasov–Maxwell System with External Electromagnetic Fields
-
10/2014–12/2016 Master of Science
University of Bayreuth
Mathematics, secondary subject Physics
Thesis: Optimal Control of the Two-Dimensional Vlasov-Maxwell-System
-
10/2011–09/2014 Bachelor of Science
University of Bayreuth
Mathematics, secondary subject Physics
Thesis: Perronsche Methode und Greensche Funktionen
Grants
-
2025–2027 -
2023 Localised pure-gravity water waves
The Fund of the Walter Gyllenberg Foundation
Royal Physiographic Society of Lund
46,000 SEK
-
2022 Various travel fundings
Workshop on spatial dynamics and related approaches, University of Stuttgart; When Kinetic Theory meets Fluid Mechanics, ETH Zürich; Conference on Mathematics of Wave Phenomena, Karlsruhe Institute of Technology
ca. 2,000 EUR
Awards
- 2023
- 2023
Seal of Excellence
European Commission
for a high-quality project proposal submitted under the call for Marie Skłodowska-Curie Actions Postdoctoral Fellowships 2022
- 2017
Nominated for the Teaching Award of the Faculty of Mathematics, Physics & Computer Sciences
Faculty of Mathematics, Physics & Computer Sciences, University of Bayreuth
Skills
Mathematical skills | |
nonlinear PDEs | |
kinetic theory | |
fluid mechanics | |
solution theory of PDEs | |
optimal control of PDEs | |
bifurcation methods |
Computer skills | |
C++ | |
HTML | |
LaTeX | |
Maple | |
Mathematica | |
Matlab | |
Office |
Languages
German | |
native |
English | |
fluent |
Swedish | |
intermediate |
Interests
Oceanic fluid mechanics | |
steady water waves modelled by full Euler equations | |
two-dimensional and axisymmetric waves with general vorticity | |
structural properties of water waves | |
geophysical water waves |
Atmospheric fluid mechanics | |
mountain waves | |
structures like the polar vortex |
Kinetic theory | |
analysis of Vlasov–Poisson, Vlasov–Maxwell | |
optimal control problems in plasma physics | |
construction and stability of confined stationary plasmas |