数学学院学术报告
报告题目:
报告时间:2017年7月17日(周一)上午9:30-10:30
报告地点:创新园大厦A1101
报告人:赵雁翔 乔治华盛顿大学
校内报告联系人:王磊 联系电话:84708351-8137
报告摘要:
We extend a model for the morphology and dynamics of a crawling eukaryotic cell to describe cells on micro patterned substrates. This model couples cell morphology, adhesion, and cytoskeletal flow in response to active stresses induced by actin and myosin. We propose that protrusive stresses are only generated where the cells adheres, leading to the cell’s effective confinement to the pattern. Simulated cells exhibit a broad range of behaviors, including steady motion, turning, bipedal motion and periodic migration. We further extensively study the turning instability by simplifying the full PDE model into a minimal one. By using the minimal model, we also study the persistent rotational motion (PRM) of small numbers of mammalian cells crawling on micropatterned substrates.
报告人简介:
赵雁翔,乔治华盛顿大学助理教授。2002年于大连理工大学应用数学系获得理学学士,2005年于大连理工大学应用数学系获得理学硕士专业,2011年于宾州州立大学获得数学博士学位。2011-2014年于加州大学圣地亚哥分校从事博士后工作。2014年至今于乔治华盛顿大学数学系工作。赵雁翔主要从事生物数学建模和计算数学的研究,发表论文10余篇。其中有论文发表在PRL, PNAS, SIAM Applied Math, JCP等顶级期刊上。
