Education

• Since October 2021
  Thesis in applied mathematics at Inria.
  "Numerical analysis and adaptation for flows in rotating machines",
  under the supervision of Alain Dervieux and Boniface Nkonga.
  
• 2020-2021
  Master's degree in Mathematics, speciality "Analysis, Modelling, Simulation", Université Paris-Saclay.
  Master's thesis : "Lattice Boltzmann method applied to the compressible Euler system",
  under the supervision of Benjamin Graille and François Dubois.
  
• 2019-2020
  Master's degree in Mathematics, speciality "Mathematics of Modeling", Sorbonne Université.
  Master's thesis : "Convergence speed study of the Leray solutions of the Navier-Stokes-Coriolis system",
  under the supervision of Frédéric Charve.
  

Master's thesis

• Convergence speed study of the Leray solutions of the Navier-Stokes-Coriolis system

  In this work I studied the convergence of the solutions of the following incompressible Navier-Stokes-Coriolis system :

  

  In particular I worked on two methods to obtain Strichartz estimates, and I obtained that one of these methods allows a better convergence speed of Leray solutions and permits larger data.

• Lattice Boltzmann method applied to the compressible Euler system

  The aim of this study was mainly to analyse the numerical diffusion term of the "vector" scheme D1Q3Q3Q3 for the compressible Euler system. After writing the equivalent equations of our scheme, the study of our diffusion term is reduced to the symmetrization of a PDE system of the following form :