Parallel algebraic hybrid solvers for large 3D convection-diffusion problems

Multigrid is a popular solution method for the set of linear algebraic equations that arise from PDEs discretized with the "nite element method. We discuss a method, that uses many of the same techniques as the "nite element method itself, to apply standard multigrid algorithms to unstructured "nite

Multigrid is a popular solution method for the set of linear algebraic equations that arise from PDEs discretized with the ÿnite element method. The application of multigrid to unstructured grid problems, however, is not well developed. We discuss a method, that uses many of the same techniques as t

This paper presents a 3D mesh-aligning algorithm for convection-dominated convection-diffusion problems. The main difference between this algorithm and the 2D edge-swapping algorithms is that instead of swapping faces it splits the adjacent tetrahedra to obtain a more flowaligned mesh, and thereby,

## Abstract The boundary knot method (BKM) of very recent origin is an inherently meshless, integration‐free, boundary‐type, radial basis function collocation technique for the numerical discretization of general partial differential equation systems. Unlike the method of fundamental solutions, the

In this work an extension is proposed to the Local Hermitian Interpolation (LHI) method; a meshless numerical method based on interpolation with small and heavily overlapping radial basis function (RBF) systems. This extension to the LHI method uses interpolation functions which themselves satisfy t