• D. Dereudre, D. Flimmel: Non-hyperuniformity of Gibbs point processes with short range interaction. To appear. ArXiv version.
  • D. Flimmel, L. Heinrich: Variance asymptotics for the area of planar cylinder processes generated by Brillinger-mixing point processes. Lithuanian Mathematical Journal 63 (2023), 58-80. Available here. break...


  • D. Flimmel, Z. Pawlas, J. E. Yukich: Limit theory for unbiased and consistent estimators of statistics of random tessellations. Journal of Applied Probability 57 (2020), no.2, 679-702. ArXiv version.


  • D. Flimmel, V. Beneš: Gaussian Approximation for Functionals of Gibbs Particle Processes. Kybernetika 54 (2018), no.4, 765-777. DOI: 10.14736/kyb-2018-4-0765


  • PhD thesis (2021): Asymptotic inference for stochastic geometry models. Supervised by Z. Pawlas. Available here.
  • Master thesis (2017): Consequences and applications of the Fock space representation theorem. Supervised by V. Beneš. Available here.