I work in the field of Combinatorial Probability.
My research focuses on random discrete structures, such as random permutations and random trees.
My Ph.D. thesis is titled ''On some models of non-uniform random permutations'' and is available here.
Preprints
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Large deviation principles for pattern-avoiding permutations,
and limit shapes for constrained Mallows permutations,
with Thomas Budzinski, Valentin Féray, Slim Kammoun, and Mylene Maida.
Submitted, 2026. HAL.
This short version is an extended abstract. The full version will appear soon.
Journal papers
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Classical patterns in Mallows permutations.
Electronic Journal of Probability, 2026. ArXiv. -
A geometric approach to conjugation-invariant random permutations.
Probability Theory and Related Fields, 2026. ArXiv. -
Binary search trees of permuton samples,
with Benoît Corsini and Valentin Féray.
LIPIcs, AofA 2024 (extended abstract). Advances in Applied Mathematics, 2025 (full version). ArXiv. -
Increasing subsequences of linear size in random permutations and the Robinson-Schensted tableaux of permutons.
Random Structures and Algorithms, 2024. ArXiv. -
Locally uniform random permutations with large increasing subsequences.
Combinatorial Theory, 2023. ArXiv.