In this work, we investigate (energy) stability of global radial basis function (RBF) methods for linear advection problems. Classically, boundary conditions (BC) are enforced strongly in RBF methods. By now it is well-known that this can lead to stability problems, however. Here, we follow a different path and propose two novel RBF approaches which are based on a weak enforcement of BCs. By using the concept of flux reconstruction and simultaneous approximation terms (SATs), respectively, we are able to prove that both new RBF schemes are strongly (energy) stable. Numerical results in one and two spatial dimensions for both scalar equations and systems are presented, supporting our theoretical analysis.
翻译:在这项工作中,我们调查全球辐射基函数(能源)稳定性(RBF)的线性平流问题的方法。典型地说,边界条件(BC)在RBF方法中得到了强有力的执行。现在众所周知,这可能导致稳定问题。在这里,我们走一条不同的道路,提出两种基于不力执行BC的新颖的RBF方法。通过分别使用通量重建概念和同步近似术语(SATs),我们能够证明两个新的RBF方案都非常稳定(能源)。提出了一个和两个空间层面的Salaral方程式和系统的数字结果,支持我们的理论分析。
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