On surface meshes induced by level set functions

Abstract

The zero level set of a piecewise-affine function with respect to a consistent tetrahedral subdivision of a domain in R3 is a piecewise-planar hyper-surface. We prove that if a family of consistent tetrahedral subdivions satisfies the minimum angle condition, then after a simple postprocessing this zero level set becomes a consistent surface triangulation which satisfies the maximum angle condition. We treat an application of this result to the numerical solution of PDEs posed on surfaces, using a P1 finite element space on such a surface triangulation. For this finite element space we derive optimal interpolation error bounds. We prove that the diagonally scaled mass matrix is well-conditioned, uniformly with respect to h. Furthermore, the issue of conditioning of the stiffness matrix is addressed.