报告人:向昭银 教授(成都电子科技大学)
报告题目:Global Existence to a Chemotaxis-Navier-Stokes System with Mixed Boundary Condition
报告时间:2018年8月11日下午16:30-17:30
报告地点:数理大楼661
报告摘要:In this talk, we investigate the large time behavior of strong solutions to a chemotaxis-Navier-Stokes system in an unbounded domain with finite depth and mixed boundary conditions. Based on some uniform a priori estimates obtained by using the anisotropic $L^p$ technique and the subtle elliptic estimates, we first establish the global existence of strong solution around the equilibrium state $(0,c_{\mathrm{air}}, {\bf 0})$ with the help of the continuity arguments, where $c_{\mathrm{air}}$ is the saturation value of oxygen inside the fluid. Then we use De Giorgi's technique and cutoff method to show that such a solution will converge to $(0,c_{\mathrm{air}}, {\bf 0})$ with an explicit convergence rate in the chemotaxis-free case. Our assumptions and results are consistent with the experimental descriptions and the numerical analysis. This is a joint work with Yingping Peng.
联系人:张剑文教授