I mainly study random permutations (longest monotone subsequences, Robinson-Schensted correpondence, permuton theory, pattern occurrences...). I am also interested in many topics of probability theory and scaling limits.
The name of my PhD thesis is "Permutons and algebraic combinatorics": click here for a short summary.

Preprints:

• Binary search trees of permuton samples, with Benoît Corsini and Valentin Féray.
  Submitted. 2024, arXiv.


• A geometric approach to conjugation-invariant random permutations.
  Submitted. 2024, arXiv.

Journal papers:

• Increasing subsequences of linear size in random permutations and the Robinson-Schensted tableaux of permutons.
  Accepted for publication in Random Structures & Algorithms, 2024. ArXiv.


• Locally uniform random permutations with large increasing subsequences.
  Combinatorial Theory, 3 (3), 24 pages, 2023. ArXiv.