A family of fourth-order difference schemes on rotated grid for two-dimensional convection–diffusion equation

We present an explicit fourth-order compact ®nite dierence scheme for approximating the threedimensional convection±diusion equation with variable coecients. This 19-point formula is de®ned on a uniform cubic grid. We compare the advantages and implementation costs of the new scheme with the standar

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

Galerkin and Petrov Galerkin linite element mellods are used to obtain new linite difference schemes for the solution of linear twodimensional convection difusion problems. Numerical estimates are made of the rates of convergence of these schemes, uniformly with respect to the perturbation parameter

## 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