Global pointwise error estimates for uniformly convergent finite element methods for the elliptic boundary layer problem

This paper continues our discussion for the anisotropic model problem in [1]. There we constructed a bilinear finite element method on a Shishkin type mesh. The method was shown to be convergent, independent of the small parameter ε, in the order of N−2ln2N in the L2-norm, where N2 is the total number of mesh points. In this paper, the method is shown to be convergent, independent of ε, in the order of N−2ln3 N in the L∞-norm in the whole computational domain, which explains the uniform convergence phenomena we found in the numerical results in [1]. Another numerical experiment is presented here, which confirms our theoretical analysis. Published by Elsevier Science Ltd.