Modified High-order Upwing Method for Convection Diffusion Equation

The method of lines provides a ¯exible and general approach for solving time-dependent PDEs. However, the numerical solution of the resulting ODE system can present certain diculties depending on the method used. In particular, oscillations may appear in the solution when standard methods are applie

Some modi®ed AGE methods for the convection±diusion equation are developed in this paper. Firstly, there is a treatment on the convection term in the equation which is dierent from that in the AGE method by Evans and Abdullah (1985). Secondly, upwind-type schemes are used for the convection dominate

A proof of high-order convergence of three deterministic particle methods for the convectiondiffusion equation in two dimensions is presented. The methods are based on discretizations of an integro-differential equation in which an integral operator approximates the diffusion operator. The methods d

In this paper, we present hybridizable discontinuous Galerkin methods for the numerical solution of steady and time-dependent nonlinear convection-diffusion equations. The methods are devised by expressing the approximate scalar variable and corresponding flux in terms of an approximate trace of the

In this paper, a high-order upwind method for the convection-diffusion problems is proposed. The scheme satisfies the maximum principle, overcomes numerical oscillation, and has astonishingly high-order computing accuracy. At the same time, the error estimates O(h'~~c'"'~~,,) in d' lscrete L', H1 a