Convergence of the immersed-boundary finite-element method for the Stokes problem

Abstract

Convergence results for the immersed boundary method applied to a model Stokes problem with the homogeneous Dirichlet boundary condition are presented. As a discretization method, we deal with the finite element method. First, the immersed force field is approximated using a regularized delta function and its error in the W-1,p norm is examined for 1 p<n/(n-1), n being the space dimension. Then, we consider the immersed boundary discretization of the Stokes problem and study the regularization and discretization errors separately. Consequently, error estimate of order h1-α in the W1,1× L1 norm for the velocity and pressure is derived, where α is an arbitrarily small positive number. Error estimate of order h1-α in the Lr norm for the velocity is also derived with r=n/(n-1-α). The validity of those theoretical results are confirmed by numerical examples.