A boundary element numerical scheme for the two-dimensional convection–diffusion equation

This paper is concerned with the development of the finite element method in simulating scalar transport, governed by the convection-reaction (CR) equation. A feature of the proposed finite element model is its ability to provide nodally exact solutions in the one-dimensional case. Details of the de

## Abstract A class of higher order compact (HOC) schemes has been developed with weighted time discretization for the two‐dimensional unsteady convection–diffusion equation with variable convection coefficients. The schemes are second or lower order accurate in time depending on the choice of the

In this paper we consider a passive scalar transported in two-dimensional flow. The governing equation is that of the convection-diffusion-reaction equation. For purposes of computational efficiency, we apply an alternating-direction implicit scheme akin to that proposed by Polezhaev. Use of this im

A rotated upwind discretization scheme is presented for the discretization of the steady-state two-dimensional anisotropic drift-diffusion equation, taking into account the local characteristic nature of the solution. The notable features of the algorithm lie in the projection of the governing parti