We use the energy method to study the well-posedness of initial-boundary value problems approximated by overset mesh methods in one and two space dimensions for linear constant-coefficient hyperbolic systems. We show that in one space dimension, for both scalar equations and systems of equations, the problem where one domain partially oversets another is well-posed when characteristic coupling conditions are used. If a system cannot be diagonalized, as is ususally the case in multiple space dimensions, then the energy method does not give proper bounds in terms of initial and boundary data. For those problems, we propose a novel penalty approach. We show, by using a global energy that accounts for the energy in the overlap region of the domains, that under well-defined conditions on the coupling matrices the penalized overset domain problems are energy bounded, conservative, well-posed and have solutions equivalent to the original single domain problem.
翻译:我们用能源方法来研究一个和两个空间维度中由高置网格方法所近似于的初始界限值问题。我们用一个空间维度来研究线性常数和高效益双曲系统。我们显示,在一个空间维度方面,对于斜方方程和方程系统,当使用典型的组合条件时,一个领域部分超载另一个领域的问题就是一个充分保障的问题。如果一个系统不能被分解,就像在多个空间维度中的情况那样,那么能源方法在初始和边界数据方面没有给出适当的界限。对于这些问题,我们提出了一种新的惩罚方法。我们通过使用一种全球能源来计算域重叠区域的能源,表明在明确界定的组合矩阵条件下,受处罚的超重域问题是能源捆绑的、保守的、周密的和具有相当于原始单一域问题的解决方案。