报告题目:Propagation of moments and sharp convergence rates for the non-cutoff Boltzmann equation with soft potentials
报告人:何凌冰教授(清华大学数学系)
时间:7月24日10:00-11:00(北京时间)
地点:数学学院425
摘要:We consider the well-posedness for the non-cutoff Boltzmann equation with soft potentials when the initial datum is close to the Maxwellian and has only polynomial decay at the large velocities in $L^2$ space. As a result, we get the propagation of the exponential moments and the sharp rates of the convergence to the Maxwellian which seems the first results for the original equation with soft potentials. The new ingredients of the proof lie in localized techniques, the semigroup method as well as the propagation of the polynomial and exponential moments in $L^2$ space.
报告人简介:何凌冰,清华大学数学系教授。主要研究方向为流体力学中的Navier-Stokes,MHD等方程组以及统计物理中的Boltzmann方程。近年来先后在Ann. Sci. Éc. Norm. Supér.、Archive for Rational Mechanics and Analysis、Communications in Mathematical Physics、SIAM Journal on Mathematical Analysis、Journal of Functioal Analysis、Journal of Differential Equations、J. Stat. Phys.等国际主流数学杂志发表论文30余篇。
