We present and analyze a cut finite element method for the weak imposition of the Neumann boundary conditions of the Darcy problem. The Raviart-Thomas mixed element on both triangular and quadrilateral meshes is considered. Our method is based on the Nitsche formulation studied in [10.1515/jnma-2021-0042] and can be considered as a first attempt at extension in the unfitted case. The key feature is to add two ghost penalty operators to stabilize both the velocity and pressure fields. We rigorously prove our stabilized formulation to be well-posed and derive a priori error estimates for the velocity and pressure fields. We show that an upper bound for the condition number of the stiffness matrix holds as well. Numerical examples corroborating the theory are included.
翻译:我们提出并分析对达西问题的Neumann边界条件实施不力的削减有限要素方法。 考虑了三角和四边间贝的Raviart- Thomas混合要素。 我们的方法基于在[10.1515/jnma-2021-0042]中研究的Nitsche 配方,可被视为不适案件的第一个延伸尝试。 关键特征是增加两个幽灵惩罚操作员以稳定速度和压力场。 我们严格证明我们稳定的配方是妥善保存的,并得出速度和压力场的先验误差估计。 我们显示坚固矩阵条件号的上限也存在。 包含支持理论的数字例子。
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