New Grid Approach for Solution of Boundary Problems for Convection-Diffusion Equations

The numerical solution of boundary value problems is considered for multidimensional equations of convection-diffusion (CDE). These equations are used for many physical processes in solids, liquids and gases. A new approach to the spatial approximation for such equations is proposed. This approach is based on the integral transformation of second order differential operators. A linear version of CDE was selected to simplify analysis. For this variant, a new exponential finite difference scheme was offered, algorithms of its implementation were developed, and brief analysis of the stability and convergence was fulfilled.