In this talk we present a very recent results on the return to the equilibrium for inhomogeneous linearized kinetic equations when the collision kernel has 5 conserved moments (mass, momentum and energy). We study the case when there is an external potential acting on the system of particles. When there is no axisymetry of harmonicity of the potentiel, there is a unique equilibrium state (for a given initial mass and energy), and the return to the equilibrium is the result of a cascade of hypocoercive and damping effects. When there are some axisymmetries or harmonicity of the potential, special solutions appear. We shall try to explain the general scheme of the proof and the main mathematical and physical ideas behind. This a joint work with K. Carrapatoso, J. Dolbeault, S. Mischler, C. Schmeiser and C. Mouhot.
Date and time
Conference - Multiscale problems in mathematical physics