A CR-rotated Q1 nonconforming finite element method for Stokes interface problems on local anisotropic fitted mixed meshes

Abstract

We propose a new nonconforming finite element method for solving Stokes interface problems. The method is constructed on local anisotropic mixed meshes, which are generated by fitting the interface through simple connection of intersection points on an interface-unfitted background mesh, as introduced in Hu2021optimal. For triangular elements, we employ the standard CR element; for quadrilateral elements, a new rotated Q1-type element is used. We prove that this rotated Q1 element remains unisolvent and stable even on degenerate quadrilateral elements. Based on these properties, we further show that the space pair of CR-rotated Q1 elements (for velocity) and piecewise P0 spaces (for pressure) satisfies the inf-sup condition without requiring any stabilization terms. As established in our previous work Wang2025nonconforming, the consistency error achieves the optimal convergence order without the need for penalty terms to control it. Finally, several numerical examples are provided to verify our theoretical results.