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Global Existence and Uniqueness analysis of Reaction-Cross-Diffusion Systems

2018-09-07 10:00

报告人: 陈秀卿 【北京邮电大学】

报告人单位:

时间: 2018-09-07 10:00-11:00

地点: 卫津路校区6号楼111教室

开始时间: 2018-09-07 10:00-11:00

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报告人简介

北京邮电大学教授

报告内容介绍

    The global-in-time existence of weak and renormalized solutions to reaction-cross-diffusion systems for an arbitrary number of variables in bounded domains with no-flux boundary conditions are proved. The cross-diffusion part describes the segregation of population species and is a generalization of the Shigesada-Kawasaki-Teramoto model. The diffusion matrix is not diagonal and generally neither symmetric nor positive semi-definite, but the system possesses a formal gradient-flow or entropy structure. The reaction part is of Lotka-Volterra type for weak solutions or includes reversible reactions of mass-action kinetics and does not obey any growth condition for renormalized solutions. Furthermore, we prove the uniqueness of bounded weak solutions to a special class of cross-diffusion systems, and the weak-strong uniqueness of renormalized solutions to the general reaction-cross-diffusion cases.


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