会议名称： One Day Workshop on Applied PDEs 会议全部组织者： Zhen Lei, Yi Zhou 主办单位： 数学科学学院 举办地点： 光华东主楼1501 会议开始日期： 2018年3月26日 会议结束日期： 2018年3月26日 会议网站链接： 会议摘要： 报告1：Some Properties of Solutions for the Heat Equation with sources 报 告 人：尹景学 教授 报告人所在单位：华南师范大学 报告时间：9:00-10:00 报告摘要：In this talk, we discuss the heat eqution with nonlinear sources. Some properties, such as the life span and periodic soltions, will be presented. 个人简介：尹景学，教育部长江学者奖励计划特聘教授，国家杰出青年基金获得者、国家级教学名师，华南师范大学教授、博士生导师。曾获国家教育部科学技术进步一等奖，香港求是科技基金会“杰出青年学者奖”。   报告2：Lipschitz Continuous Subsonic-sonic Flows in General Nozzles 报告人：王春朋 教授 报告人所在单位：吉林大学 报告时间：10:00-10:45 报告摘要：This talk concerns subsonic-sonic potential flows in two dimensional nozzles. For a finitely long symmetric nozzle which is suitably flat near the throat (where the cross section is smallest) and whose wall is parallel to the symmetric axis at its two endpoints, we formulate the subsonic-sonic flow problem by prescribing the flow angle at the inlet and the outlet. It is shown that there is a unique subsonic-sonic flow whose acceleration is bounded for such a problem. Moreover, its sonic points must occur at the wall or the throat. More precisely, there exists a critical value such that the flow is sonic on the whole throat if the height of the nozzle is not greater than this critical value, while the sonic points must be located at the wall if the height is greater than this value. There are similar results for infinitely long symmetric nozzles and the asymptotic behavior at the infinity of subsonic-sonic flows are shown.    报告3：Global Classical Solution and Boundedness to a Chemotaxis-Haptotaxis Model with Re-modelling Mechanism 报告人：金春花 教授 报告人所在单位：华南师范大学 报告时间：10:45-11:30 报告摘要：We deal with a chemotaxis-haptotaxis model with re-establishment effect. We consider this problem in a bounded domain with zero-flux boundary conditions. Although the $L^\infty$-norm of the ECM density is easy to be obtained, the re-establishment mechanism still cause essential difficulty due to the deficiency of regularity for ECM. We use some iterative techniques to establish the $W^{1,\infty}$ bound of  uPA protease concentration, and further obtained the $L^\infty$ estimate of the cancer cell density. Using these a prior estimates, we finally established the existence of  global-in-time classical solution, which is bounded uniformly. The result of this paper fills the gap  of Tao，Winkler [JDE，2014] and Pang, Wang [JDE, 2017] in dimension 2 with logistic source, in the work of Tao，Winkler [JDE，2014] , the boundedness of the solution is left open; and in the work of Pang, Wang [JDE, 2017], the global existence and boundedness is established only for large proliferation rate. In particular,  the  global  solvability and boundedness of smooth solutions in dimension 3 has never been touched before, this work is the first attempt to solve this problem.   下午：Free Discussions 本年度学院会议总序号： 4