Research

Research interests

• Complex geometry
• Toric geometry
• Semi-algebraic geometry
• Moduli spaces
• Geometric stacks

Publication

1. Non-simplicial quantum toric varieties (arXiv,HAL, published in Advances in Mathematics) : In this paper, we define quantum toric varieties associated to an arbitrary fan in a finitely generated subgroup of some \R^d generalizing the article arXiv:2002.03876 of Katzarkov, Lupercio, Meersseman and Verjovsky.

Preprints

1. Moduli spaces of quantum toric stacks and their compactification (arXiv,HAL): A toric variety is a normal complex variety which is completely described by combinatorial data, namely by a fan of strongly convex rational (with respect to a lattice) cones. Due to this rationality condition, toric varieties are (equivariantly) rigid since a deformation of the lattice can make it dense. A solution to this problem consists in considering quantum toric stacks. The latter is a stacky generalization of toric varieties where the "lattice" is replaced by a finitely generated subgroup of \R^d (in the simplicial case as introduced by L. Katzarkov, E. Lupercio, L. Meersseman and A. Verjovsky). The goal of this paper is to explain the moduli spaces of quantum toric stacks and their compactification.
2. with François Bernard, Seminormal toric varieties (arXiv,HAL):In this paper, we provide a combinatorial description of seminormal toric varieties. The corresponding combinatorial object is a fan equipped with a collection of groups assigned to each cone. This framework introduces a more general class of toric varieties than classical normal toric varieties, while having simpler combinatorial data compared to general non-normal toric varieties.
3. Gluing moduli spaces of quantum toric stacks via secondary fan (arXiv,HAL) The extension from toric varieties to quantum toric stacks allows for the study of moduli spaces of toric objects with fixed combinatorial structures, as we now consider general finitely generated subgroups of \R^n as "lattices." This paper aims to construct a moduli space that encompasses all such moduli spaces for a given dimension of the ambient space. To achieve this, we adapt the construction of the secondary fan within the quantum framework. This approach provides a description of wall-crossings between different moduli spaces, analogous to those observed in LVMB manifolds.
4. Birational structure of quantum toric stacks (upcoming)
5. Representability of differentiable mapping stacks (upcoming)

Thesis

1. Compactification des espaces de modules en géométrie torique quantique (HAL, slides of the defense) : PhD thesis
2. Compacité de l'espace des cycles de Barlet : applications aux automorphismes et déformations des variétés de Kähler (manuscript, slides of the defense) : Master 2 thesis
3. Les douze surfaces de Darboux et la trialité (manuscript) : Master 1 thesis
4. Les bases de Gröbner (manuscript) : Licence 3 thesis