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An accurate front capturing scheme for tumor growth models with a free boundary limit
2018-05-07 00:00:00

报告题目:

An accurate front capturing scheme for tumor growth models with a free boundary limit

报 告 人:

周珍楠 教授(北京大学)

报告时间:

2018年05月11日 10:00--11:00

报告地点:

2021欧洲杯买球平台官网东北楼四楼报告厅(404)

报告摘要:

In this talk, I will present some recent work on the tumor growth equation along with various models for the nutrient component, including the in vitro model and the in vivo model. At the cell density level, the spatial availability of the tumor density n is governed by the Darcy law via the pressure p(n) = nm. As m goes to infi

nity, the cell density models formally converge to Hele-Shaw ow models, which determine the free boundary dynamics of the tumor tissue in the incompressible limit. We derive several analytical solutions to the Hele-Shaw ow models, which serve as benchmark solutions to the geometric motion of tumor front propagation. Also, we develop a numerical scheme based on a novel prediction-correction reformulation that can accurately approximate the front propagation even when the nonlinearity is extremely strong. We show that the semi-discrete scheme naturally connects to the free boundary limit equation as m goes to in

finity, and with proper spacial discretization, the fully discrete scheme has improved stability, preserves positivity, and implements without nonlinear solvers. This is a joint work with Jian-Guo Liu, Min Tang and Li Wang.