*** Due to a system change this page is currently under construction. ***

Office hour

My office hour is on Fridays between 10 and 11 am.

Research interests
In recent years a focus of my research has been the development of a general '''theory of approximate lattices''' (together with Michael Björklund), which allows to construct ordered aperiodic structures in very general homogeneous metric spaces (e.g. symmetric spaces) and to study them with tools from group theory, geometry and dynamics. methods. 

PhD theses in our group

• P. Kaiser, Complexity of Model Sets in Two-Step Nilpotent Lie Groups and Hyperbolic Space (2022)
• M. Wackenhuth, Linear Programming Bounds for non-Euclidean Sphere Packings (2025)
• D. Roca Gonzalez, Hyperuniformity and Diffraction of Substitution Tilings (2025)
• C. Zürcher, Irreducibility of Boundary Representations of Cocompactly Cubulated Groups (2025)