学术报告报告题目:Asymptotic stability of shock wave for the outflow problem governed by the one-dimensional radiative Euler equations
报 告人:范丽丽 副教授 (武汉轻工大学)
报告时间:2021 年12月 14日(星期二) 下午15:00-16:00
报告地点:腾讯会议ID:871860534
邀 请人:金海洋教授
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数学学院
2021年12月13日
报告摘要:This talk is devoted to the study of the asymptotic stability of the shock wave of the outflow problem for the radiative full Euler equations, which are a fundamental system in the radiative hydrodynamics with many practical applications in astrophysical and nuclear phenomena. The outflow problem means that the flow velocity on the boundary is negative and subsonic domain is considered. Different from our previous works, boundary condition on velocity is considered instead of boundary condition on temperature, which induce a perfect boundary condition on anti-derivative perturbations, so that boundary estimates on perturbated unknowns are trickily and smoothly established.