主持人:郑海标
报告摘要:
The first-order hyperbolic relaxation system is a class of time-dependent partial differential equations which model various non-equilibrium phenomena. For such systems, the main interest is to understand the zero relaxation limit. The initial-value problem for the relaxation system has been well-developed and a systematical framework has been built. However, the initial-boundary value problem of the relaxation system is still in the developing stage. In this talk, I will first introduce the theory of boundary conditions for general relaxation systems. Then I will present the recent results for the initial-boundary-value problem with characteristic boundaries. Specifically, we redefine a characteristic Generalized Kreiss condition (GKC) which is essentially necessary to have a well-behaved relaxation limit. Under this characteristic GKC and a Shizuta-Kawashima-like condition, we derive reduced boundary conditions for the relaxation limit solving the corresponding equilibrium systems and justify the validity.
报告人简介:
周一舟,清华大学博士,师从雍稳安;北京大学博雅博士后,合作导师:李若;亚琛工业大学(RWTH Aachen University),洪堡学者,博士后,合作导师:Prof. Dr. Michael Herty。主要黑料吃瓜网方向:双曲松弛系统的理论、计算与建模;基于机器学习的数学模型;微分方程约束的最优控制问题。
