学术报告:Global existence and asymptotic behavior for the classical solutions to a non-conservative compressible two-phase fluid model in a bounded domain
发布时间:2021-07-06 浏览次数:381
报告人:吴国春
报告时间:2021年7月9日上午10:00-11:30
报告地点:育才理科综合楼103
报告题目:Global existence and asymptotic behavior for the classical solutions to a non-conservative compressible two-phase fluid model in a bounded domain
报告人简介:吴国春,华侨大学副教授,硕士生导师,主持国家自然科学基金青年项目1项,主要研究方向为流体力学中的非线性偏微分方程,近年来研究论文主要发表在JLMS、SIAM、JFA、JDE、P ROY SOC EDINB A等。
报告摘要:In this topic, we investigate the global existence and uniqueness of classical solutions to the initial boundary value problem for a non-conservative compressible two-phase fluid model in a bounded domain with slip boundary. The global existence and uniqueness of classical solution are obtained when the initial data is near its equilibrium in $H^4(\Omega)$ by delicate energy methods. By a product, we also show the exponential convergence rates of the pressure and velocity in $H^3(\Omega)$. The key part of the paper is to capture the dissipative feature of solutions.