Master Memoirs
[1]: Résolution de l’équation des ondes (Master 1).
[2]: Structures de Poisson et systèmes intégrables (Master 2), under the direction of Pol
Vanhaecke.
PhD
[3]: Universal higher Lie algebras of singular spaces and their symmetries, under the direction of Camille Laurent-Gengoux.
Research publications
[4]: (With Camille Laurent-Gengoux) Acyclic Lie ∞-algebroids ≃ Lie-Rinehart algebras,
Journal of Algebra, Vol. 594, (2022), p. 1-53. ORCID: 0000-0002-3582-7994
[5]: On symmetries of singular foliations. Journal of Geometry and Physics, page
104833, 2023.
[6]: A series of Nash resolutions of a singular foliation. J. Noncommut. Geom. 20 (2026), no. 2, pp. 745–785.
[7]: (with Camille Laurent-Gengoux, Leonid Ryvkin) An invitation to singular foliations “Poisson geometry CRM, Barcelona 2022”. In “Advanced Courses in Mathematics – CRM Barcelona. Birkhäuser Cham, 2025. 1st edition. ISBN 978-3-031-86388-2 (softcover), ISBN 978-3-031-86657-9.
Consisting of three chapters, each assigned a DOI:
- C. Laurent-Gengoux, R. Louis, L. Ryvkin, What Is a Singular Foliation ?, in Advances in Poisson Geometry, Advanced Courses in Mathematics — CRM Barcelona, Birkhäuser, Cham, 2025. https://doi.org/10.1007/978-3-031-86657-9_3
- C. Laurent-Gengoux, R. Louis, L. Ryvkin, Canonical Geometric and Algebraic Structures Hidden Behind a Singular Foliation, in Advances in Poisson Geometry, Advanced Courses in Mathematics — CRM Barcelona, Birkhäuser, Cham, 2025.
https://doi.org/10.1007/978-3-031-86657-9_4 - C. Laurent-Gengoux, R. Louis, L. Ryvkin, State of the Art and Open Questions, in Advancesin Poisson Geometry, Advanced Courses in Mathematics — CRM Barcelona, Birkhäuser, Cham, 2025. https://doi.org/10.1007/978-3-031-86657-9_5
[8]: On Nash resolution of (singular) Lie algebroids. Math. Z. 311, 35 (2025). https://doi.org/10.1007/s00209-025-03825-4
[9]: (With Camille Laurent-Gengoux), The holonomy Lie $\infty$-groupoid of a singular foliation I, 2025, Hal-05010954v1.
[10]: On Longitudinal Differential Operators and Nash Blowups, ( 2025). (Submitted).
[11]: With A. Hancharuk, On construction of differential ℤ-graded varieties, arXiv :2512.23148, 2026. (Submitted)