My research interests lie in algebraic number theory and arithmetic statistics, with a particular focus on the Cohen–Lenstra heuristics.

In my PhD Thesis I developed a statistical model for ray class groups of number fields, and in doing so proposed a conjecture for their distribution, which amongst other things also leads to a prediction for the average torsion of ray class groups in certain families of number fields.

During my Master’s studies, I specialised in the representation theory of linear algebraic groups. In my Master’s Thesis, I developed and implemented an algorithm that allows to compute the Jordan blocks of the images of the unipotent elements of the spin groups under the spin and half-spin representations.