A Dynamical Multi-level Scheme for the Burgers Equation: Wavelet and Hierarchical Finite Element

The RLW equation is solved by a least-squares technique using linear space-time finite elements. In simulations of the migration of a single solitary wave this algorithm is shown to have higher accuracy and better conservation than a recent difference scheme based on cubic spline interpolation funct

This paper proposes and analyzes a multi-level stabilized finite element method for the two-dimensional stationary Navier-Stokes equations approximated by the lowest equal-order finite element pairs. The method combines the new stabilized finite element method with the multi-level discretization und

The main purpose of this Letter is to construct a non-standard "nite di!erence scheme and study its associated properties for the Burgers}Fisher partial di!erential equation [1]

We describe an a posteriori finite element procedure for the efficient computation of lower and upper estimators for linear-functional outputs of noncoercive linear and semilinear elliptic second-order partial differential equations. Under a relatively weak hypothesis related 10 the relat ive magn i