报 告 题 目:Nonlocal Stefan problem
主 讲 人:李 芳
单 位:中山大学
时 间:4月13日9:00
腾 讯 ID:548-419-372
密 码:123456
摘 要:
Nonlocal diffusion is introduced to describe the movement or interaction of some organisms between non-adjacent spatial locations. In this talk, we study the nonlocal version of the classical Stefan problem. We first demonstrate the wellposedness and the convergence between nonlocal Stefan problem and classical Stefan problem. Next, we construct some examples to demonstrate some new phenomena due to the appearance of nonlocal diffusion, like the discontinuous movement of population range. At the end, the spreading/vanishing phenomena is discussed when reaction term is introduced. This is joint work with Xinfu Chen and Maolin Zhou.
简 介:
李芳,中山大学教授,2008年于美国明尼苏达大学获得博士学位,师从倪维明教授,之后在美国普渡大学工作了3年。主持过国家自然科学基金面上项目以及上海市浦江人才计划基金。主要研究带有应用背景的非线性椭圆型抛物型方程(组),有多篇文章发表在JDE, Indiana Math. J,Journal of Mathematical Biology, Bulletin of Mathematical Biology, European Journal of Applied Mathematics等国际一流学术期刊上。