Research Doctoral Education

Doctoral supervisors

Mathematics and applications

  • Yannick BARAUD

    Statistics, Data Science

  • Pieter BELMANS

    Algebraic geometry and representation theory

  • Christophe LEY

    Statistical Modelling, Machine Learning, Directional Statistics, Stein’s Method, Sport analytics, Interdisciplinary research (focus on medicine, biology, engineering, renewable energies, psychology)

  • Jean-Luc MARICHAL

    Functional equations and Aggregation function theory

  • Karin MELNICK

    differential geometry, Lie groups, smooth dynamics

  • Sergei MERKULOV

    Algebra, Geometry, Mathematical Physics

  • Ivan NOURDIN

    Probability theory (fractional Brownian motion; rough paths theory; Stein’s method; Malliavin calculus; Free probability; Logarithmic Sobolev and transport inequalities)

  • Martin OLBRICH

    Analyse harmonique non commutative

  • Hugo PARLIER

    Geometric topology, hyperbolic geometry, differential geometry, combinatorial geometry, moduli spaces

  • Giovanni PECCATI

    Probability Theory and Mathematical Finance

  • Antonella PERUCCA

    Mathematics: Number theory, Didactics

  • Mark PODOLSKIJ

    Inference for semimartingales, asymptotic theory for high-frequency data, Levy processes, multiple stochastic integrals, Malliavin calculus, inference for Gaussian processes, Stein’s method, fractional integration

  • Sarah SCHEROTZKE

    Géométrie algébrique
    Théorie des catégories dérivées

  • Jang SCHILTZ

    Statistics
    Stochastic Analysis

  • Jean-Marc SCHLENKER

    Mathematics: geometry, geometric analysis and related fields.
    Interdisciplinary collaboration (with published papers) with: computer science (computational geometry), sociology of science and scientometrics, theoretical physics.

  • Franck SUEUR

    Differential Equation & Analysis

  • Bruno TEHEUX

    • (co)-algebraic approaches to modal and many-valued logics and their applications to computer science, game theory and social choice,
    • universal algebra and topological dualities (including natural dualities),
    • order and lattice theory,
    • functional equations and inequations arising from decision mathematics,
    • algebraic approach to aggregation function theory and qualitative integrals,

  • Gabor WIESE

    Number Theory, Algebra, Arithmetic Geometry, Computational Number Theory, Cryptography

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