I obtained my PhD in 2025 at FU Berlin, where I was advised by Pavle Blagojević.
Here is my CV (as of November 2025).
I am interested in Topological Combinatorics, Algebraic Topology, Discrete Geometry, and Topological Data Analysis.
My research consists of developing topological methods for problems arising from discrete geometry and combinatorics, as well as working on problems from algebraic and applied topology. Some of the discrete-geometric and combinatorial problems that I am interested in include mass partition and mass transversal problems, Tverberg-type problems, Hall-type problems, and Helly-type problems. In that context, my work involves proving results on (non)existence of equivariant maps using tools such as equivariant obstruction theory and the Fadell-Husseini index. Beyond this, I am interested in problems coming from algebraic, differential and combinatorial topology, where I work on establishing necessary and sufficient conditions for the existence of complex line fields of manifolds, developing spectral sequences for homotopy colimits, and estimating topological complexity of certain configuration spaces, as well as application-driven problems like homotopy type of Vietoris-Rips anc Čech complexes.