独特性
非线性系统
超临界流体
边界(拓扑)
数学分析
边值问题
弱解
流量(数学)
空格(标点符号)
波动方程
班级(哲学)
数学
物理
Neumann边界条件
计算机科学
机械
热力学
操作系统
量子力学
人工智能
作者
Lorena Bociu,Irena Lasiecka
标识
DOI:10.3934/dcds.2008.22.835
摘要
We consider finite energy solutions of a wave equation with supercritical nonlinear sources and nonlinear damping. A distinct feature of the model under consideration is the presence of nonlinear sources on the boundary driven by Neumann boundary conditions. Since Lopatinski condition fails to hold (unless the $\text{dim} (\Omega) = 1$), the analysis of the nonlinearities supported on the boundary, within the framework of weak solutions, is a rather subtle issue and involves the strong interaction between the source and the damping. Thus, it is not surprising that existence theory for this class of problems has been established only recently. However, the uniqueness of weak solutions was declared an open problem. The main result in this work is uniqueness of weak solutions. This result is proved for the same (even larger) class of data for which existence theory holds. In addition, we prove that weak solutions are continuously depending on initial data and that the flow corresponding to weak and global solutions is a dynamical system on the finite energy space.
科研通智能强力驱动
Strongly Powered by AbleSci AI