I am a Visiting Assistant Professor of Mathematics at the University of California, Santa Cruz. My research focuses on the geometry and topology of spaces with Ricci curvature bounded from below, as well as their moduli spaces, particularly in singular settings. Much of my work concentrates on RCD spaces — metric measure spaces with Ricci curvature bounded below in a synthetic sense.

I completed my doctorate at the University of Oxford under the supervision of Andrea Mondino and Gérard Besson, where I studied moduli spaces of compact RCD structures. At UCSC, I am collaborating with Jiayin Pan, exploring how Ricci curvature constrains topology in both smooth and singular spaces, and investigating the limits of curvature-dimension conditions in sub-Riemannian geometry.

In addition to research, I am passionate about teaching and mentorship at all levels of education. At UCSC, I have taught courses ranging from introductory calculus to graduate-level differential geometry, and I have supervised independent studies, student seminars, and senior theses. I aim to create inclusive, intellectually engaging classrooms and help students connect mathematics to broader scientific and personal goals.

Originally from France, I studied mathematics and physics at the École normale supérieure de Paris. I remain especially interested in interdisciplinary connections — including the role of geometry in physics, biology, and data science — and in building communities of learners who are excited to explore the richness of mathematics.