Deadline: 9 feb 2025
Ph.D course in Mathematical Analysis, Modeling, and Applications
Research lines: • Conservation Laws • Transport Problems • Geometric PDEs • Numerical Analysis of PDEs • Nonlinear Analysis • Dynamical Systems • Hamiltonian and dispersive PDEs • Calculus of Variations • Gamma-Convergence and Multiscale Analysis • Rate independent evolution problems • Geometric Control Theory • Sub-Riemannian Geometry • Inelastic behavior of solids: plasticity, damage, fracture • Mechanobiology of the cell and cell motility • Mechanics of soft and active materials • Reduced basis methods • Boundary integral methods and isogeometric analysis • Fluid-structure interaction problems • Computational Fluid and Solid Mechanics • Uncertainty quantification • Shape optimization • Flow control • Machine Learning