# | Participant | Project Name |
1 | Nils Amend (Bochum) | Arrangements of complex reflection groups: Geometry and combinatorics |
2 | Michel Börner (Ulm) | L-functions and other arithmetic invariants of curves of genus greater than or equal to 3 |
3 | Julia Bartsch (Göttingen) | Algorithmic aspects of branch groups |
4 | Lorenz Benjamin (TU Berlin) | Polyhedral Fan Structures in Toric and Tropical Geometry |
5 | Inga Benner (Stuttgart) | Experiments with cellular structures |
6 | Tommaso Centeleghe (Heidelberg) | Computational aspects of modular forms and p-adic Galois representations |
7 | Timo de Wolff (Saarbrücken) | Algorithmic tropical intersection theory on moduli spaces |
8 | Nuno B. Freitas (Bayreuth) | The Generalized Fermat Equation with exponents 2, 3, n |
9 | Felix Gora (Duisburg-Essen) | Semistable resolutions of local models |
10 | Simon Hampe (TU Berlin) | Polyhedral Fan Structures in Toric and Tropical Geometry |
11 | Torsten Hoge (Bochum) | Arrangements of complex reflection groups: Geometry and combinatorics |
12 | Lars Kastner (FU Berlin) | Exploiting torus actions in algebraic geometry |
13 | Martin Lee (TU Kaiserslautern) | Fundamental Algorithms in Singular |
14 | Frederik Marks (Stuttgart) | Experiments with cellular structures |
15 | Tobias Moede (TU Braunschweig) | Classification of nilpotent associative algebras and coclass theory |
16 | Mohamed Saied Emam Mohamed (TU Darmstadt) | Improving and Combining Gröbner bases and SAT solving techniques for algebraic cryptanalysis |
17 | Oleksandr Motsak (TU Kaiserslautern) | Fundamental Algorithms in Singular |
18 | Dung Tien Nguyen (Stuttgart) | Experiments with cellular structures |
19 | Marta Pieropan (LMU München) | Symmetries of singular del Pezzo surfaces in algebraic and arithmetic geometry |
20 | Irem Portakal (FU Berlin) | Exploiting torus actions in algebraic geometry |
21 | Tobias Rossmann (Bielefeld) | Toroidal methods for computing zeta functions of groups and rings |
22 | Ute Valeska Spreckels (Oldenburg) | Computational methods for abelian varieties over number fields with complex multiplication |
23 | Andreas Steenpass (TU Kaiserslautern) | Coordinator Project |
24 | Panagiotis Tsaknias (Luxembourg) | Computational aspects of modular forms and p-adic Galois representations |