An stability analysis for the finite-difference solution of one-dimensional linear convection–diffusion equations on moving meshes

A stabilized ®nite element method for solving systems of convection±diusion-reaction equations is studied in this paper. The method is based on the subgrid scale approach and an algebraic approximation to the subscales. After presenting the formulation of the method, it is analyzed how it behaves un

Al:mtract--A comprehensive and systematic study is presented to derive stability properties of various two-level, six-point finite difference schemes (in particular, difference schemes of Pad~ type) for the approximation to the constant coefficient convective-ditfusion equation. First, the modified

A new high order FV method is presented for the solution of convection±diusion equations, based on a 4-point approximation of the diusive term and on the de®nition of a quadratic pro®le for the approximation of the convective term, in which coecients are obtained by imposing conditions on the trunca