A conformal Petrov–Galerkin method for convection-dominated problems

## Abstract In this work, a stable Petrov–Galerkin formulation is combined with an __hp__‐adaptive refinement strategy. The stability engendered by this formulation allows the use of high interpolation element order in regions with steep gradients. The new __hp__‐adaptive strategy, originally propo

In this article we introduce a multilevel method in space and time for the approximation of a convectiondiffusion equation. The spatial discretization is of pseudo-spectral Fourier type, while the time discretization relies on the characteristics method. The approximate solution is obtained as the s

This paper proposes and studies an algorithm for aligning a triangulation with a given convection ÿeld. Approximate solutions of convection-dominated problems on ow-aligned meshes typically have sharper internal layers, less over and undershooting and higher accuracy. The algorithm we present can be

A new approach to derivation of high-order Taylor-Galerkin methods is introduced. Additional time layers are shown to yield temporal accuracy unattainable within a two-layer strategy. Two explicit model schemes are constructed, and the von Neumann stability analysis is conducted. The behaviour of th

We formulate a higher-order (superconvergent) Petrov-Galerkin method by determining, using a finitedifference approximation, the optimal selection of quadratic and cubic modifications to the standard linear test function for bilinear elements. Application of this method to linear elliptic problems r