Multilevel numerical solutions of convection-dominated diffusion problems by spline wavelets

A multilevel Petrov-Galerkin (PG) finite element method to accurately solve the one-dimensional convection-diffusion equation is presented. In this method, the weight functions are different from the basis functions and they are calculated from simple algebraic recursion relations. The basis for the

The simple Lanczos process is very efficient for finding a few extreme eigenvalues of a large symmetric matrix. The main task in each iteration step consists in evaluating a matrix-vector product. It is shown how to apply a fast wavelet-based product in order to speed up computations. Some numerical

This paper describes a boundary element scheme for solving steady-state convection-di usion problems at high PÃ eclet numbers. A special treatment of the singular integrals is included which uses discontinuous elements and a regularization procedure. Transformations are performed to avoid directly e

## Abstract The original article to which this Erratum refers was published in Numerical Linear Algebra with Applications 8(2) 2001, 99–110.