A penalized φ-FEM scheme for the Poisson Dirichlet problem

Abstract

In this work, we analyze a penalized variant of the φ-FEM scheme for the Poisson equation with Dirichlet boundary conditions. The φ-FEM is a recently introduced unfitted finite element method based on a level-set description of the geometry, which avoids the need for boundary-fitted meshes. Unlike the original φ-FEM formulation, the method proposed here enforces boundary conditions through a penalization term. This approach has the advantage that the level-set function is required only on the cells adjacent to the boundary in the variational formulation. The scheme is stabilized using a ghost penalty technique. We derive a priori error estimates, showing optimal convergence in the H1 semi-norm and quasi-optimal convergence in the L2 norm under suitable regularity assumptions. Numerical experiments are presented to validate the theoretical results and to compare the proposed method with both the original φ-FEM and the standard fitted finite element method.