In this work, we propose a novel formulation for the solution of partial differential equations using finite element methods on unfitted meshes. The proposed formulation relies on the discrete extension operator proposed in the aggregated finite element method. This formulation is robust with respect to the location of the boundary/interface within the cell. One can prove enhanced stability results, not only on the physical domain, but on the whole active mesh. However, the stability constants grow exponentially with the polynomial order being used, since the underlying extension operators are defined via extrapolation. To address this issue, we introduce a new variant of aggregated finite elements, in which the extension in the physical domain is an interpolation for polynomials of order higher than two. As a result, the stability constants only grow at a polynomial rate with the order of approximation. We demonstrate that this approach enables robust high-order approximations with the aggregated finite element method.
翻译:在这项工作中,我们提出了一个新颖的公式,用于解决部分差异方程,使用关于不适性模贝的有限元素方法解决部分差异方程。提议的公式依赖在综合有限元素方法中提议的离散扩展操作员。这一公式在细胞内的边界/界面位置方面是稳健的。可以证明不仅在物理域内,而且在整个活跃网格上,都具有增强稳定性的结果。但是,由于通过外推法界定了基础扩展操作员,稳定性常数随着使用多面顺序而成倍增长。为了解决这一问题,我们引入了一种新的合并有限元素变体,其中物理域的扩展是多面性定序高于两个的内推法。结果,稳定性常数仅以多面速率增长,以近似为序。我们证明,这一方法能够使综合有限元素方法具有稳健的高端近似值。
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