报告人简介:
王治安,香港理工大学副教授。研究方向:偏微分方程、生物数学。已发表期刊论文50余篇,MR引用800余次。
报告摘要:
In this talk, we shall report some progress made on global well-posedness and asymptotic behavior of solutions to the singular Keller-Segel model for which very few results are known up to date due to the logarithmic singularity. Recently we find an idea to resolve this singularity and make the problem tractable. By imposing Zero-flux and Dirichlet mixedboundary conditions based on some real experiment, we find the unique boundary aggregation and layer steady state and prove its nonlinear stability.
报告主持:楼元 教授
