My research interests are in Real Algebraic Geometry and Tropical Geometry. Currently I am working in Enumerative Geometry using tropical methods in A1-homotopy theory.
Since 2020, I am a postdoctoral fellow at the Universität Duisburg-Essen working under the supervision of Marc Levine.
During the academic years 2018/20 I was a postdoctoral fellow at the Laboratoire de Mathématiques Jean Leray in the Univeristé de Nantes working on polynomials properties of Refined Tropical Invariants under the supervision of Erwan Brugallé.
I was a postdoctoral fellow at the School of Mathematical Sciences at the Tel-Aviv University working in Real Singularity Theory under the supervision of Eugenii Shustin. I classified morsifications of trigonal quasihomogeneous singularities, giving a complete classification of morsifications of a singularity family that is not mild.
I defended my PhD thesis at the Institut de Mathématiques de Jussieu - Paris Rive Gauche of the Sorbonne Université, under the supervision of Ilia Itenberg. I worked on an instance of a modern version of the 16th Hilbert problem. Namely, I found a complete classification of the main strata of the moduli space of real rational plane quintics.
Articles
Uniformización de curvas algebraicas reales. Lecturas Matemáticas Vol 33 [2] (2012). 107-131.
Preprints
A Wall Crossing Formula for Motivic Enumerative Invariants arXiv:2403.17681
Joint with Sabrina Pauli: A Quadratically Enriched Correspondence Theorem. arXiv:2309.11706
Joint with Sabrina Pauli: Quadratically Enriched Tropical Intersections. arXiv:2208.00240
Trigonal Morsifications on Hirzebruch Surfaces with an appendix by E. Shustin. arXiv:1810.02206.